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Introducing a New 3D Dynamical Model for Barred Galaxies

Published online by Cambridge University Press:  03 November 2015

Christof Jung
Affiliation:
Instituto de Ciencias Físicas, Universidad Nacional Autónoma de México, Av. Universidad s/n, 62251 Cuernavaca, Mexico
Euaggelos E. Zotos*
Affiliation:
Department of Physics, School of Science, Aristotle University of Thessaloniki, GR-541 24, Thessaloniki, Greece
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Abstract

The regular or chaotic dynamics of an analytical realistic three dimensional model composed of a spherically symmetric central nucleus, a bar and a flat disk is investigated. For describing the properties of the bar, we introduce a new simple dynamical model and we explore the influence on the character of orbits of all the involved parameters of it, such as the mass and the scale length of the bar, the major semi-axis and the angular velocity of the bar, as well as the energy. Regions of phase space with ordered and chaotic motion are identified in dependence on these parameters and for breaking the rotational symmetry. First, we study in detail the dynamics in the invariant plane z = pz = 0 using the Poincaré map as a basic tool and then study the full three-dimensional case using the Smaller Alignment index method as principal tool for distinguishing between order and chaos. We also present strong evidence obtained through the numerical simulations that our new bar model can realistically describe the formation and the evolution of the observed twin spiral structure in barred galaxies.

Type
Research Article
Copyright
Copyright © Astronomical Society of Australia 2015 

1 INTRODUCTION

It is well known that the axial symmetry in galaxies is only a first approach. In essence, galaxies exhibit deviation from the axial symmetry which can be very small or more extended. In the latter category, we may include the case of barred galaxies. Observations indicate that a large percentage of disk galaxies, about 70%, shows bar-like formations (e.g., Eskridge et al. Reference Eskridge2000; Sheth et al. Reference Sheth, Regan, Scoville and Strubbe2003). Bars are linear extended structures located in the central regions of galaxies. Usually bars are formed either from angular momentum redistribution within the disk or from disk instabilities (e.g., Athanassoula Reference Athanassoula2003; Berentzen et al. Reference Berentzen, Shlosman, Martinez-Valpuesta and Heller2007; Foyle, Courteau, & Thacker Reference Foyle, Courteau and Thacker2008).

Kormendy (Reference Kormendy1979) conducted the first systematic investigation regarding the sizes of the galactic bars. He found that the size of the bar is actually correlated with the luminosity of the galaxy. In the same vein, Elmegreen & Elmegreen (Reference Elmegreen and Elmegreen1985) showed that bars in early-type disk galaxies tended to be larger than bars in later Hubble types (Regan & Elmegreen Reference Regan and Elmegreen1997). Recent observations using charge-coupled devices (CCDs) or near-infrared images supported the initial findings of Kormendy and Elmegreen (e.g., Chapelon, Contini, & Davoust Reference Chapelon, Contini and Davoust1999; Laine et al. Reference Laine, Shlosman, Knapen and Peletier2002; Laurikainen & Salo Reference Laurikainen and Salo2002; Laurikainen, Salo, & Rautiainen Reference Laurikainen, Salo and Rautiainen2002). Moreover, it is observed that barred galaxies may display different characteristics regarding the size of the bar. There are galaxies with a prominent barred structure (Elmegreen & Elmegreen Reference Elmegreen and Elmegreen1985) and also galaxies with faint weak bars (Wada & Koda Reference Wada and Koda2001).

Galactic bars are very efficient at driving gas inwards and thus may help to frow central bulge components in galaxy disks (e.g., Dalcanton, Yoachim, & Bernstein Reference Dalcanton, Yoachim and Bernstein2004; Debattista et al. Reference Debattista, Mayer, Carollo, Moore, Wadsley and Quinn2006; Gadotti Reference Gadotti2011). Galaxies with earlier-type morphologies, which have more prominent bulges, tend to have more extended bars (e.g., Barazza, Jogee, & Marinova Reference Barazza, Jogee and Marinova2008; Hoyle et al. Reference Hoyle2011; Masters et al. Reference Masters2011; Weinzirl et al. Reference Weinzirl, Jogee, Khochfar, Burkert and Kormendy2009). Furthermore, in some galaxies, the central bulges and the bars seem to contain similar stellar populations (Sánchez-Blázquez et al. Reference Sánchez-Blázquez, Ocvirk, Gibson, Pérez and Peletier2011). However, there are some barred galaxies that lack completely bulges and many bulge-dominated galaxies which lack bars (e.g., Laurikainen et al. Reference Laurikainen, Salo, Buta and Knapen2007; Pérez & Sánchez-Blázquez Reference Pérez and Sánchez-Blázquez2011). It should also be noted that in some cases, the formation of the central bulges is the result caused by disk dynamical instabilities (Kormendy & Kennicutt Reference Kormendy and Kennicutt2004).

An important and striking phenomenon in barred galaxies is associated with nuclear rings which are active sites of new star formation (e.g., Knapen et al. Reference Knapen, Beckman, Heller, Shlosman and de Jong1995; Mazzuca et al. Reference Mazzuca, Knapen, Veilleux and Regan2008; Sandstrom et al. Reference Sandstrom2010; Hsieh et al. Reference Hsieh, Matsushita, Liu, Ho, Oi and Wu2011). It is believed that the formation of nuclear rings is due to the effect of a non-axially symmetric potential of the bar in a large supply of interstellar gas. A key role in this mechanism is played by the torque of the bar, which causes the gas to form the nuclear rings (Kim et al. Reference Kim, Seo, Stone, Yoon and Teuben2012b). Observations show that the rate of star formation in the nuclear rings not only is different in several types of barred galaxies but also varies significantly with time (e.g., Buta et al. Reference Buta, Treuthardt, Byrd and Crocker2000; Benedict et al. Reference Benedict, Howell, Jørgensen, Kenney and Smith2002; Comerón et al. Reference Comerón, Knapen, Beckman, Laurikainen, Salo, Martínez-Valpuesta and Buta2010).

The formation and evolution of dust lanes and nuclear rings have been extensively studied using numerical simulations (e.g., Piner, Stone, & Teuben Reference Piner, Stone and Teuben1995; Englmaier & Gerhard Reference Englmaier and Gerhard1997; Maciejewski et al. Reference Maciejewski, Teuben, Sparke and Stone2002; Regan & Teuben Reference Regan and Teuben2003; Thakur, Ann, & Jiang Reference Thakur, Ann and Jiang2009). The formation of nuclear rings from the resonant interaction of the gas with the potential of the bar appears not to be consistent with recent studies, suggesting the action of a different mechanism (e.g., Kim, Seo, & Kim Reference Kim, Seo and Kim2012a). According to this mechanism, there is a centrifugal barrier which cannot be overcome by the inflowing gas. This barrier is responsible for the formation of the nuclear rings. Finally, recent research reveals that more massive bars cause smaller nuclear rings, for supporting observational data see Comerón et al. (Reference Comerón, Knapen, Beckman, Laurikainen, Salo, Martínez-Valpuesta and Buta2010).

Over the last decades, a huge amount of research work has been devoted to understand the orbital structure in barred galaxy models (e.g., Athanassoula et al. Reference Athanassoula, Bienayme, Martinet and Pfenniger1983; Pfenniger Reference Pfenniger1984; Combes et al. Reference Combes, Debbasch, Friedli and Pfenniger1990; Athanassoula Reference Athanassoula1992; Pfenniger Reference Pfenniger, Buta, Crocker and Elmegreen1996; Kaufmann & Contopoulos Reference Kaufmann and Contopoulos1996; Ollé & Pfenniger Reference Ollé and Pfenniger1998; Pichardo, Martos, & Moreno Reference Pichardo, Martos and Moreno2004). The reader can find more information about the dynamics of barred galaxies in the reviews by Athanassoula (Reference Athanassoula1984); Contopoulos & Grosbøl (Reference Contopoulos and Grosbøol1989); Sellwood & Wilkinson (Reference Sellwood and Wilkinson1993). We would like to point out, that all the above-mentioned references on the dynamics of barred galaxies are exemplary rather than exhaustive. However, we should like to discuss briefly some of the recent papers on this subject. Skokos, Patsis, & Athanassoula (Reference Skokos, Patsis and Athanassoula2002a) conducted an extensive investigation regarding the stability and morphology of both 2D and 3D periodic orbits in a fiducial model representative of a barred galaxy. The work was continued in the same vein in Skokos, Patsis, & Athanassoula (Reference Skokos, Patsis and Athanassoula2002b), where the influence of the system’s parameters on the 3D periodic orbits was revealed. Moreover, Kaufmann & Patsis (Reference Kaufmann and Patsis2005) presented evidence that in two-dimensional models with sufficiently large bar axial ratios, stable orbits having propeller shapes play a dominant role to the bar structure. Manos & Athanassoula (Reference Manos and Athansssoula2011) estimated the fraction of chaotic and regular orbits in both two- and three-dimensional (3D) potentials by computing several sets of initial conditions and studying how these fractions evolve when the energy and also basic parameters of the model, such as the mass, size, and pattern speed of the bar vary. Computing the statistical distributions of sums of position coordinates Bountis, Manos, & Antonopoulos (Reference Bountis, Manos and Antonopoulos2012) quantified weak and strong chaotic orbits in 2D and 3D barred galaxy models. A time-dependent barred galaxy model was utilised in Manos, Bountis, & Skokos (Reference Manos, Bountis and Skokos2013) in order to explore the interplay between chaotic and regular behaviour of star orbits when the parameters of the model evolve.

So far, many publications use the Ferrer’s triaxial model (Ferrers Reference Ferrers1877) to describe the bar. The corresponding potential however is too complicated and it is not known in a closed form. On this basis, we decided to construct a new simpler but none the less realistic potential with a clear advantage on the performance speed of the numerical calculations in comparison with the Ferrer’s potential.

The paper is organised as follows: in Section 2, we present the structure and the properties of the new barred galaxy model. In Section 3, we construct Poincaré maps in order to investigate how all the parameters entering the bar model influence the orbital properties in the invariant surface z = pz = 0. In Section 4, we use the Smaller Alignment index (SALI) method (Skokos Reference Skokos2001) to reveal the influence of the parameters on the full 3D properties. In the following section, we present numerical evidence that our dynamical model can realistically simulate the creation as well as the evolution of twin spiral arms of a real barred galaxy. The paper ends with Section 6, where the discussion and the main conclusions of our work are presented.

2 THE NEW DYNAMICAL MODEL

Our total analytical gravitational 3D potential Φ(x, y, z) consists of three main components: a central spherical component Φn, a flat disk Φd, and a bar potential Φb. We decided to include only these three components, so as to be able to directly relate our results with those of the corresponding three component model presented in Pfenniger (Reference Pfenniger1984).

For the description of the spherically symmetric nucleus, we use a Plummer potential (Binney & Tremaine Reference Binney and Tremaine2008)

(1) $$\begin{equation} \Phi _{\rm n}(x,y,z) = - \frac{G M_{\rm n}}{\sqrt{x^2 + y^2 + z^ 2 + c_{\rm n}^2}}, \end{equation}$$

where G is the gravitational constant, while M n and c n are the mass and the scale length of the nucleus, respectively. At this point, we must point out that potential (1) is not intended to represent a black hole nor any other compact object, but a dense and massive bulge (nucleus). Therefore, we do not include any relativistic effects.

The flat disk is modelled by a Miyamoto-Nagai potential (Miyamoto & Nagai Reference Miyamoto and Nagai1975)

(2) $$\begin{equation} \Phi _{\rm d}(x,y,z) = - \frac{G M_{\rm d}}{\sqrt{x^2 + y^2 + \left(k + \sqrt{h^2 + z^ 2}\right)^2}}, \end{equation}$$

where M d is the mass of the disk, while k and h are the horizontal and vertical scale lengths of the disk, respectively.

In order to model the properties of the galactic bar, we decided to develop a new dynamical model. The basic idea is to construct a bar from a mass distribution of length 2a which lies along the x-axis and has a continuum of centres going from x = −a to x = +a. We call this interval lying in the 3D position space IB. The total mass of the bar is M b. We imagine that in a first step, we have a mass distribution along IB with a constant linear mass density m = M b/2a. To avoid all problems with singularities of point densities and in order to include the transverse width c b of the bar, we imagine that in a second step the linear density m belonging to a single point of IB is smeared out over the effective width c b. Thereby each point s from the interval IB becomes the centre of the regularised monopole potential of the form

(3) $$\begin{equation} v(x-s,y,z) = - \frac{G m}{ \sqrt{(x-s)^2 + d^2}}, \end{equation}$$

where

(4) $$\begin{equation} d^2 = y^2 + z^2 + c_b^2 \end{equation}$$

and the total potential Φb(x, y, z) becomes the integral of these contributions over the interval IB, i.e.,

(5) $$\begin{eqnarray} \Phi _{\rm b}(x,y,z) &=& \int ^{+a}_{-a} ds \; \; v(x-s,y,z)\nonumber\\ &=& \frac{G M_{\rm b}}{2a}\left[ \text{arcsin}h \left( \frac{x-a}{d} \right) - \text{arcsin}h \left( \frac{x+a}{d} \right) \right]\nonumber\\ &=& \frac{G M_{\rm b}}{2a} \ln \left( \frac{x-a+\sqrt{(x-a)^2 + d^2}}{x+a+\sqrt{(x+a)^2 + d^2}} \right). \end{eqnarray}$$

As always, we recover the corresponding mass density ρ(x, y, z) from the Poisson’s equation

(6) $$\begin{eqnarray} \rho (x,y,z) &=& \frac{1}{4 \pi G} \nabla ^2 \Phi _{\rm b}(x,y,z)\nonumber\\ &=& \frac{M_{\rm b} c_{\rm b}^2}{8 \pi a} \int ^{+a}_{-a} ds ((x-s)^2 + d^2)^{-5/2}\nonumber\\ &=& \frac{M_{\rm b} c_{\rm b}^2}{8 \pi a} (g(x+a,y,z) - g(x-a,y,z)), \end{eqnarray}$$

where

(7) $$\begin{equation} g(x,y,z) = x(2x^2 + 3d^2)d^{-2}(x^2 + d^2)^{-3/2}. \end{equation}$$

Note that the integral of ρ over all space gives correctly M b. The rotationally symmetric limit a → 0 gives correctly

(8) $$\begin{equation} \Phi _{\rm b}(x,y,z) = - \frac{G M_{\rm b}}{ \sqrt{x^2 + d^2}}, \end{equation}$$
(9) $$\begin{equation} \rho (x,y,z) = \frac{3 M_{\rm b} c_{\rm b}^2}{4 \pi } (x^2 + d^2)^{-5/2}. \end{equation}$$

The bar rotates clockwise around its z-axis at a constant angular velocity Ωb. The major axis of the bar points into the x direction while its intermediate axis points into the y direction. Therefore, the effective potential is

(10) $$\begin{equation} \Phi _{\rm eff}(x,y,z) = \Phi (x,y,z) - \frac{1}{2}\Omega _{\rm b}^2 \left(x^2 + y^2 \right). \end{equation}$$

We use a system of galactic units, where the unit of length is 1 kpc, the unit of mass is 2.325 × 107M (solar masses) and the unit of time is 0.9778 × 108 yr (about 100 Myr). The velocity unit is 10 km s−1, the unit of angular momentum (per unit mass) is 10 km kpc s−1, while G is equal to unity. The energy unit (per unit mass) is 100 km2s−2, while the angle unit is 1 radian. In these units, the values of the involved parameters are: M n = 400 (corresponding to 9.3 × 109 M), c n = 0.25, M d = 7000 (corresponding to 1.6275 × 1011 M), k = 3, h = 0.175, M b = 3500 (corresponding to 8.13 × 1010 M), a = 10, c b = 1, and Ωb = 1.25. This set of the values of the parameters defines the Standard Model (SM).

The isoline contours of constant effective potential on the (x, y)-plane for z = 0 as well as the position of the five Lagrangian points Li,i = 1, 5 are shown in Figure 1. Three of them, L 1, L 2, and L 3, known as the collinear points, are located on the x-axis. The central stationary point L 1 at (x, y) = (0, 0) is a local minimum of Φeff. At the other four Lagrangian points, it is possible for the test particle to move in a circular orbit, while appearing to be stationary in the rotating frame. For this circular orbit, the centrifugal and the gravitational forces precisely balance. The stationary points L 2 and L 3 are saddle points, while points L 4 and L 5 on the other hand, are local maxima of the effective potential, enclosed by the banana-shaped isolines. The annulus bounded by the circles through L 2, L 3, and L 4, L 5 is known as the ‘region of co-rotation’. The numerical value of the effective potential at the two Lagrangian points L 2 and L 3 results in a critical Jacobi constant CL = −869.70514693. Similarly, in Figure 2, we observe the isoline contours of the mass density on the (x, y)-plane for z = 0 of the total gravitational potential. The barred structure is clearly visible in the region − 10 ⩽ x ⩽ +10 kpc. Here, we should emphasise that the shape of the equidensity curves is very similar to that of the Ferrer’s ellipsoid [see e.g., Figure 1 in Pfenniger (Reference Pfenniger1984)].

Figure 1. The isoline contours of the effective potential in the (x, y)-plane for z = 0 for the standard model. Included are the five Lagrangian points.

Figure 2. The isoline contours of the mass density on the (x, y)-plane for z = 0 of the total gravitational potential Φ(x, y, z) for the standard model.

The motion of a test particle with a unit mass (m = 1) in our rotating barred galaxy model is governed by the Hamiltonian

(11) $$\begin{equation} H = \frac{1}{2} \left(p_x^2 + p_y^2 + p_z^2 \right) + \Phi (x,y,z) - \Omega _{\rm b} \left( x p_y - y p_x\right) = E, \end{equation}$$

where px, py, and pz are the momenta per unit mass, conjugate to x, y, and z respectively, while E is the numerical value of the Jacobi integral, which is conserved.

(12) $$\begin{eqnarray} \dot{x} &=& p_x + \Omega _{\rm b} y, \nonumber \\ \dot{y} &=& p_y - \Omega _{\rm b} x, \nonumber \\ \dot{z} &=& p_z, \nonumber \\ \dot{p_x} &=& - \frac{\partial \Phi }{\partial x} + \Omega _{\rm b} p_y, \nonumber \\ \dot{p_y} &=& - \frac{\partial \Phi }{\partial y} - \Omega _{\rm b} p_x, \nonumber \\ \dot{p_z} &=& - \frac{\partial \Phi }{\partial z}, \end{eqnarray}$$

where the dot indicates derivative with respect to the time.

In the same vein, the variational equations which govern the evolution of a deviation vector w = (δx, δy, δz, δpx, δpy, δpz) are

(13) $$\begin{eqnarray} \dot{(\delta x)} &=& \delta p_x + \Omega _{\rm b} \delta y, \nonumber \\ \dot{(\delta y)} &=& \delta p_y - \Omega _{\rm b} \delta x, \nonumber \\ \dot{(\delta z)} &=& \delta p_z, \nonumber \\ (\dot{\delta p_x}) &=& - \frac{\partial ^2 \Phi }{\partial x^2} \ \delta x - \frac{\partial ^2 \Phi }{\partial x \partial y} \delta y - \frac{\partial ^2 \Phi }{\partial x \partial z} \delta z + \Omega _{\rm b} \delta p_y, \nonumber \\ (\dot{\delta p_y}) &=& - \frac{\partial ^2 \Phi }{\partial y \partial x} \delta x - \frac{\partial ^2 \Phi }{\partial y^2} \delta y - \frac{\partial ^2 \Phi }{\partial y \partial z} \delta z - \Omega _{\rm b} \delta p_x, \nonumber \\ (\dot{\delta p_z}) &=& - \frac{\partial ^2 \Phi }{\partial z \partial x} \delta x - \frac{\partial ^2 \Phi }{\partial z \partial y} \delta y - \frac{\partial ^2 \Phi }{\partial z^2} \delta z. \end{eqnarray}$$

3 NUMERICAL RESULTS FOR THE 2-DOF SYSTEM

The subspace Sz of the phase space defined by z = 0 and pz = 0 is invariant, i.e., initial conditions in Sz lead to orbits lying entirely in Sz. The restriction of the dynamics to Sz will be the restricted system with two degrees of freedom. We frequently use the standard polar coordinates R and ϕ in the (x, y)-plane and their conjugate momenta pR and L.

The restricted system has several integrable limit cases. The most important ones are the limits a = 0 and M b = 0. Both of these cases are rotationally symmetric and therefore the intersection condition of the Poincaré map and the variables used in the domain of the map should be chosen with these limit cases in mind to describe well these limit cases, where the angular degree of freedom is decoupled from the rest of the system (this also holds for the full 3-DOF system). Ideally, the symmetric limit cases should be described by pure twist maps and their corresponding twist curves. We study the restriction of the Poincaré map to the invariant subset z = pz = 0 which will be called Pr in the following and it is a pure twist map in the rotationally symmetric limit cases. Therefore, the variables used in the full dimensional Poincaré map should contain the action-angle variables of this degree of freedom, i.e., L and ϕ and for the restricted map, the domain is simply the cylindrical domain of these two coordinates. Then, naturally the intersection condition must be a condition in the variables R and pR. At the moment, we are only interested in bound motion and then the most simple and natural intersection condition is the condition that R runs through a relative maximum and pR changes from positive to negative values. Almost all bound orbits run an infinite number of times through this intersection condition in the limits t → ±∞. The only exceptions might be orbits with R = constant, e.g., the orbit in the 3-DOF system which oscillates up and down the z-axis. And in the symmetric limit case, there is the circular orbit around the origin with constant R. Fortunately, such orbits do not appear in the restricted system as soon as the rotational symmetry is broken. Therefore, this intersection condition is the best one possible for our purposes.

To understand the dynamics of the restricted system, we first pick a case which we use as standard case and then study the development of Pr under the change of the various parameters in the potential of the bar, i.e., the parameters M b, a, c b, Ωb and finally, we are also interested in the dependence on the value E of the Hamiltonian in the rotating frame. As standard case, we use E = −900, M b = 3500, a = 10, c b = 1, and Ωb = 1.25. The corresponding plot of the restricted Poincaré map Pr is presented in Figure 3a. In this figure and in the following ones, we restrict the plot to the interval L ∈ (−150, 150) since this is the most relevant interval for the real galaxy. However, when useful for the understanding of the dynamics we will mention structures outside of this interval. Figure 3b shows the corresponding final SALI values obtained from the selected grid of initial conditions, in which each point is coloured according to its SALI value at the end of the numerical integration (Please see Section 4 for a description of our use of the SALI method). In this SALI plot, light-reddish colours indicate ordered orbits, dark blue/purple colours correspond to chaotic orbits, while all the intermediate colours represent initial conditions of orbits whose chaotic nature is revealed only after long times (the so-called ‘sticky orbits’Footnote 1). A comparison of parts (a) and (b) of Figure 3 demonstrates in which form SALI plots identify regions in the plane of initial conditions covered by regular motion. More details on the SALI method will be given in the beginning of the following section.

Figure 3. (a-left): The restricted Poincaré map Pr for the standard model and (b-right): Regions of different values of the SALI in a dense grid of initial conditions on the (ϕ, L)-plane. Light reddish colours correspond to ordered motion, dark blue/purple colours indicate chaotic motion, while all intermediate colours suggest sticky orbits. Note the excellent agreement between the two methods. However, we should point out that the SALI method can easily pick out small stability regions embedded in the chaotic sea which cannot be easily detected by the classical PSS method.

In the standard case, the major part of the domain of the map is covered by a large scale chaotic sea, only the part for large negative values of L shows mainly regular motion. The centre of the regular motion is an orbit of period 2 at ϕ = ±π/2, L ≈ −170. The corresponding orbit in position space encircles the origin in an almost circular orbit in negative (clockwise) orientation where the maximal values of R lie along the y-axis (i.e., ϕ = ±π/2) creating the two corresponding points of period 2 in the map. As seen in the figure, from the secondary structures around this basic stable periodic orbit the one of coupling ratio 1:3 is the most prominent one.

As usual for bound systems with a smooth Hamiltonian, the large chaotic sea contains an infinity of small stable islands. However, the size of such islands and even the sum of all their sizes are so small that they do not have any significant influence on the global dynamical behaviour of the system. For all practical purposes, we can treat the large chaotic sea as if it would be completely chaotic. This consideration also holds for all large scale chaotic seas which we encounter in the following Poincaré plots.

3.1. Dependence on the mass of the bar

In the case M b = 0, the bar has zero mass and therefore does not have any effect on the dynamics, i.e., the dynamics does not have any bar at all. Accordingly, the dynamics is rotationally symmetric, L is conserved, and Pr becomes a pure twist map. It is characterised by the rotation angle ω as function of L. In the position space of the rotating frame, the twist angle ω gives the angular advance of the orbit between two consecutive relative maxima of the radial coordinate. This twist curve is plotted in Figure 4. Note that for the integrable case M b = 0, the values of a and c b are irrelevant whereas these values matter for the details of the perturbation scenario away from the symmetric case. Under perturbations, i.e., here for M b becoming different from zero, we expect k: n resonances to become important whenever the twist angle has the value 2πk/n for some small integer n. From the Figure 4, we expect a 1:4 resonance for L ≈ −70, a 1:3 resonance for L ≈ 0, and a 1:2 resonance for L ≈ 90. In Figure 5a–d, we show the perturbed map for four different non-zero values of M b. For the small value M b = 100 in part (a), we clearly see the large secondary 1:2 structure at a L interval around the expected value of approximately 90. We observe secondary KAM islands centred around the period 2 elliptic points at angle values ϕ = 0 and ϕ = π and a chaos strip organised by the hyperbolic period 2 points sitting at angle values ϕ = ±π/2. We also see clearly the 1:4 secondary structure around the L value − 70. Here, the fine chaos strips organised by the hyperbolic points still come very close to a separatrix curve. The expected 1:3 resonance structure has already decayed into a chaos strip even for the small value M b = 100. As seen from Figure 4, the twist curve has a very large slope when it passes the value 2π/3 and therefore the corresponding resonance structure is extremely unstable and turns into a large scale chaos strip at very small perturbations. For values of M b < 50, we see two different chains of very small secondary islands of period 3. Because of the discrete symmetry ϕ → ϕ + π in our system, the periodic points of odd period come in two different copies in general.

Figure 4. The rotation angle ω as a function of the angular momentum L for M b = 0.

Figure 5. Examples of the perturbed map Pr for various values of the mass of the bar M b when E = −900. (a-upper left): M b = 100; (b-upper right): M b = 500; (c-lower left): M b = 1000; (d-lower right): M b = 5000.

For the value M b = 500 in part (b) of the figure, we still see the secondary KAM islands of the 1:2 resonance and also of the 1:4 resonance. The corresponding chaos strips have already merged to one global chaotic sea. For this value of M b, we still find primary KAM curves for large positive and large negative values of L. As seen in part (c) of the figure, the secondary islands of the 1:2 resonance have disappeared for M b = 1000 whereas the secondary 1:4 islands still exist on a very small scale. For this perturbation value also the primary KAM curves for large values of L have decayed. For the case of the very large value M b = 5000 shown in part (d), there is little difference compared to the standard case. Only the secondary structures at large negative values of L have changed.

3.2. Dependence on the major axis of the bar

For a = 0, the bar is rotationally symmetric and therefore we have again a case where L is conserved and Pr is again a pure twist map which is characterised by its twist curve. The twist curve of this limiting case is presented in Figure 6. The most important resonances are a 1:2 resonance at L ≈ 120, a 2:5 resonance at L ≈ 40, a 3:8 resonance at L ≈ 20, a 1:3 resonance at L ≈ 0, a 1:4 resonance at L ≈ −25, and a 1:6 resonance at L ≈ −80. The perturbation of this twist map under a change of the parameter a is presented in Figure 7. For the small value a = 1 in part (a), we see the secondary structures expected from the twist curve of Figure 6. Remember that again the odd period structures of the 2:5 resonance and the 1:3 resonance come in two distinct copies. For this small value of the perturbation, all fine chaos strips are still very small and appear in the plots like separatrix curves.

Figure 6. The rotation angle ω as a function of the angular momentum L for a = 0.

Figure 7. Examples of the perturbed map Pr for various values of the major axis of the bar a when E = −900. (a): a = 1; (b): a = 2; (c): a = 3; (d): a = 5; (e) a = 7; (f): a = 9.

For a = 2 plotted in part (b), the L interval (−60, 80) is already dominated by a large scale chaotic sea in which many of the previously seen secondary structures are dissolved. For a = 3 shown in part (c), we see small remnants of the secondary 1:2 and 1:6 islands. Otherwise the only regular structures on a visible scale in the plot are the primary KAM curves for large negative values of L. There is another pair of islands at very large positive values of L ≈ 270 outside of the frame of the figure. For further increasing values of a, we approach the structure of the standard case without any further important changes in the large scale structure.

3.3. Dependence on the scale length of the bar

For c b → ∞, we approach a rotationally symmetric case which is equivalent to the case M b = 0. However, very large values of c b do not describe realistic models of real galaxies. Therefore, we do not describe this limiting case in detail. In Figure 8, we just show the cases c b = 0.1 and c b = 2.5 to demonstrate that for realistic values of c b there is little development of the dynamics at all under changes of c b.

Figure 8. Examples of the perturbed map Pr for various values of the scale length of the bar c b when E = −900. (a-left): c b = 0.1; (b-right): c b = 2.5.

3.4. Dependence on the rotational velocity of the bar

For increasing values of Ωb, the dynamics becomes rather rapidly unstable because of the increasing centrifugal forces. Then, most orbits are scattering orbits which come from infinity and return to infinity. In this paper, our topic is not the chaotic scattering dynamics, we are only interested in bound motion. Therefore, we describe the dependence on Ωb for a smaller value of the energy E where still a large part of the motion is bound also for values of Ωb up to five. For the numerical examples, we choose the value E = −2400. Some examples of the corresponding map Pr are plotted in Figure 9. For Ωb converging to zero, the map becomes upside down symmetric in L because for Ωb = 0 the two orientations of angular motion become equivalent and correspondingly the sign of L becomes irrelevant. For Ωb small and L not too close to zero the motion becomes stable for ϕ values around ± π/2. That is, motion around the origin and mainly perpendicular to the bar becomes dynamically stable.

Figure 9. Examples of the perturbed map Pr for various values of the rotational speed of the bar Ωb when E = −2400. (a-upper left): Ωb = 1; (b-upper right): Ωb = 2; (c-lower left): Ωb = 3; (d-lower right): Ωb = 5.

In part (a) of the figure for Ωb = 1, we see two distinct island chains of period 2 with centres at ϕ = ±π/2, one at positive and one at large negative values of L. Increasing values of Ωb break the symmetry between the two rotational orientations, i.e., between the two signs of L. The motion with positive values of L becomes unstable soon whereas the motion with large negative values of L remains stable up to very large values of Ωb. Note that for intermediate values of Ωb [see parts (b) and (c) of the figure] motion with small values of L and along the direction of the bar becomes stable. See the islands at ϕ = 0 and ϕ = π. The coming and going of these islands indicates that motion along the bar never becomes very unstable and that this type of motion can play the role of an important organisation centre of the dynamics also when it is slightly unstable.

In part (d) of the figure for Ωb = 5, almost all the orbits of the large scale chaotic sea are in reality scattering orbits which go to infinity in the long run. For typical initial conditions in this chaotic sea, the orbit first increases its value of L to values above 500 and then the value of R becomes large monotonically, i.e., the orbit reaches the asymptotic region and does no longer produce any intersections with the surface of section of the Poincaré map. This transition to the asymptotic behaviour is not the topic of the present paper.

3.5. Dependence on the orbital energy

We have already seen a lot of maps for E = −900 and in the Ωb series also some for E = −2400. Finally, let us see two more examples for different values of E. Figure 10(a) and (b) present the examples for E = −1650 and E = −3000, respectively, otherwise the plots are for the standard values of the bar parameters. In Figure 10, we see again the stable islands at ϕ = 0 and ϕ = π which also exist for some other parameter combinations. And for E = −3000, we see the large scale islands of period 2 at ϕ = ±π/2 and for both maximal positive and negative values of L.

Figure 10. Examples of the perturbed map Pr for various values of the total orbital energy E. (a-left): E = −1650; (b-right): E = −3000.

The minimal possible value of the energy for the standard bar parameters is E = E min = −4854. In the limit EE min, the motion converges to completely integrable harmonic motion even in 3-DOF. This is the last integrable limit case encountered in our study.

Certainly, the most persistent type of stable motion in Sz is the motion at the maximal negative values of L and in particular for angles in the neighbourhood of ϕ = ±π/2. We did not find any combination of reasonable realistic parameter values which makes this motion unstable. It is motion in negative orientation around the centre where the maximal values of R occur in the direction perpendicular to the bar. In comparison, motion mainly in direction of the bar is stable for limited parameter regions only. As Figure 7 shows, this last mentioned motion grows out of the 1:2 resonance of the integrable limit case a = 0 and it becomes unstable for a ≈ 4.7.

3.6. The x1 orbital family

As seen in Figure 7 for small values of a, the 1:2 resonance in the Poincaré map gives the largest secondary KAM islands. In this sense, the periodic orbit belonging to the central periodic point of these islands plays a prominent role in the dynamics. From the Poincaré maps, we observe that this orbit stays stable until a ≈ 4.7. And we expect that it still serves as an important organising centre of the dynamics also for larger values of a. Therefore, in this subsection, we study this periodic orbit in more detail.

In Figure 11a, we show the orbit in position space for the value a = 7. It is evident that it is an orbit moving mainly in the direction of the bar (x-axis) making at the same time smaller oscillations perpendicular to the bar directions(i.e., along the y-axis). Between these longitudinal and transverse oscillations in the bar potential, a 1:3 resonant coupling is evident. Orbits that are elongated parallel to the bar within co-rotation are known as x1 orbits and in this sense our main orbit is a 1:3 resonant x1 orbit. Along one complete revolution, this orbits runs through two maxima of R and therefore it appears as period 2 point in our Poincaré sections with the intersection condition that R is maximal.

Figure 11. (a-left): An unstable x1 1:3 periodic orbit for a = 7 when E = −900; (b-right): The two left-right asymmetric x1 1:3 periodic orbits for a = 7 when E = −900. Note that one orbit is the mirror image of the other one.

In the next Figure 12a, we present graphically the stability type of this orbit, we plot the trace Tr of its monodromy matrix as function of a as the black curve. Remember that a periodic orbit is elliptic if − 2 < Tr < 2, it is normal parabolic if Tr = 2, normal hyperbolic if Tr > 2, inverse parabolic if Tr = −2, and inverse hyperbolic if Tr < −2. The eigenvalues λ of the monodromy matrix are obtained from the trace as

(14) $$\begin{equation} \lambda = Tr/2 \pm \sqrt{(Tr/2)^2 - det}. \end{equation}$$

And because the monodromy matrix is symplectic, we always have det = 1 for its determinant. Because of the importance of the values +2 and − 2 for the trace, two horizontal dashed lines (blue in the colour version) at these values are included in the figure.

Figure 12. (a-left): Evolution of the trace of the monodromy matrix of the x1 1:3 family as a function of the major axis of the bar a when E = −900. The blue horizontal dashed lines at –2 and +2 delimit the range of the trace for which the periodic orbits are stable; (b-right): The characteristic curve of the x1 1:3 family.

As we have mentioned before, for a = 0, we have a pure twist map which is globally parabolic and therefore the curve in Figure 12a must start with the value Tr = 2 at a = 0. With increasing value of a, the eigenvalues run along the complex unit circle and when the phase of the eigenvalues reaches π then the trace reaches the value − 2. Because of discrete symmetry, the orbit does not become inverse hyperbolic at this point. It stays elliptic and the eigenvalue continues to run along the unit circle. For a ≈ 4.77, the eigenvalue reaches +1, the trace reaches +2, and here the orbit becomes normal hyperbolic in a pitchfork bifurcation. The trace curve of the original 1:3 x1 orbit passes through this bifurcation as smooth curve. At the moment of the change of stability, the original orbit splits off two descendants where each one breaks the left–right symmetry. But one of them is the mirror image of the other one. Figure 11b shows these two periodic orbits in position space for a = 7.

Figure 12b presents a bifurcation diagram of the pitchfork bifurcation. Here, the maximal value of the x coordinate of each one of the three orbits is plotted as function of a. The curve for a < 4.7 and the middle curve for a > 4.7 belong to the original symmetric 1:3 x1 orbit. The two outer branches for a > 4.7 belong to the two orbits split off in the pitchfork bifurcation. As long as the corresponding orbit is stable, the curve is green and when the orbit is unstable the curve in Figure 12b is red.

Also included in Figure 12a for a > 4.77 is the trace of the monodromy matrix of the asymmetric orbits split off in the pitchfork bifurcation. It is the lower curve in the figure. The split-off orbits are born with Tr = 2 and are stable in a small a interval. At a ≈ 5.04, the trace passes through the value − 2 and the orbits become inverse hyperbolic in a period doubling bifurcation. The orbits do not become very unstable for increasing a. After a first increase, the instability even returns to rather moderate values and around a = 10 the orbits are almost stable. Interestingly, also the instability of the original 1:3 x1 orbit saturates for these values of a. All these orbits become very unstable only for very large values of a outside of the range where the model makes physical sense. For extreme values of a, the split-off orbits change from 1:3 x1 type to 1:2 x1 type, i.e., then they make two transverse oscillations only for each longitudinal oscillation along the bar.

In total, we find the following situation for a ∈ (6, 10): There is a whole chaotic braid of 1:3 x1 orbits, the original left–right symmetric one, the two ones split of in the pitchfork bifurcations breaking the left–right symmetry, and the infinity created in the doubling cascades of the split-off orbits. At least some of them have rather moderate instability which implies that also the instability of the whole braid is moderate. And this in turn implies that this chaotic braid serves as an important organising centre for the whole dynamics.

4 NUMERICAL RESULTS FOR THE 3-DOF SYSTEM

A simple qualitative way for distinguishing between ordered and chaotic motion in a Hamiltonian system is by plotting the successive intersections of the orbits using a Poincaré surface of section (PSS). This method has been extensively applied to 2-DOF models, as in these systems the PSS is a two-dimensional plane (see Section 3). In 3-DOF systems, however, the PSS is four-dimensional and thus the behaviour of the orbits cannot be easily visualised.

One way to solve this problem is to choose a two- dimensional plane in the phase space, cover it with a sufficiently fine grid of points, use these points as initial conditions for orbits and check for each one of these orbits whether its motion is regular or chaotic, following the method used in Manos & Athanassoula (Reference Manos and Athansssoula2011); Zotos & Caranicolas (Reference Zotos and Caranicolas2013); Zotos (Reference Zotos2014). In this way, we are able to identify again regions of order and chaos, which may be visualised, because we choose as domains only planes of dimension-2. For most of our SALI plots, we use as domain the (x, z)-plane, choose for each orbit an initial point (x 0, z 0) in this plane, take three other initial conditions as y 0 = p x0 = p z0 = 0 and obtain the last initial condition p y0 from the value of the energy according to Equation (11), where we use the positive branch of the solution. Thus, we are able to construct again a two-dimensional plot depicting the (x, z)-plane. All the initial conditions of the 3D orbits lie inside the limiting curve defined by

(15) $$\begin{equation} f(x,z) = \Phi _{\text{eff}}(x,y = 0,z) = E. \end{equation}$$

In a few examples, we also show SALI plots on the (y, z)-plane as domain. They can be understood by exchanging the roles of x and y in the above mentioned construction.

For distinguishing between order and chaos in our models, we use the SALI method (Skokos Reference Skokos2001). We chose for each value of the free parameter of the effective potential, a dense uniform grid of 105 initial conditions in the (x, z)-plane, regularly distributed in the area allowed by the value of the energy E. For each initial condition, we integrated the equations of motion (12) as well as the variational equations (13) with a double precision Bulirsch–Stoer algorithm (Press et al. Reference Press, Teukolsky, Vetterling and Flannery1992). In all cases, the value of the Jacobi integral [Equation (11)] was conserved better than one part in 10−11, although for most orbits, it was better than one part in 10−12.

All initial conditions of orbits are numerically integrated for 103 time units which correspond to about 1011 yr or in other words to about 10 Hubble times. This vast time of numerical integration is justified due to the presence of the sticky orbits. Therefore, if the integration time is too short, any chaos indicator will misclassify sticky orbits as regular ones. In our work, we decided to integrate all orbits for a time interval of 103 time units in order to correctly classify sticky orbits with sticky periods of at least of 10 Hubble times. At this point, it should be clarified that sticky orbits with sticky periods larger than 103 time units will be counted as regular ones, since such extremely high sticky periods are completely out of scope of this research.

Now, we use the SALI plots to observe the parameter dependence of the dynamics of the full 3-DOF system. To each Poincaré map from the previous section, we show the corresponding SALI plot. We begin with the SM in Figures 13 and 14, where Figure 13 is the SALI plot in the (x, z)-plane and Figure 14 is the SALI plot in the (y, z)-plane. The corresponding Poincaré plot has already been presented in Figure 3a.

Figure 13. Regions of different values of SALI in a dense grid of initial conditions on the (x, z)-plane for the standard model.

Figure 14. Regions of different values of SALI in a dense grid of initial conditions on the (y, z)-plane for the standard model.

Let us explain the connection between the Poincaré plot in the (ϕ, L)-plane and the SALI plot in the (x, z)-plane. The line z = 0 in the SALI plot belongs to the invariant subset Sz. The part for x positive corresponds to ϕ = 0 and the part for x negative corresponds to ϕ = π. For all points in the domain of the SALI plot, we have y = 0 and also px = 0, therefore automatically we have pR = 0. Remember that the intersection condition of the Poincaré map is pR = 0 with negative intersection orientation, i.e., pR has to change from positive to negative, i.e., R has to run through a relative maximum.

We need to understand which points in the SALI plot corresponds to maxima of R and which ones to minima. When an orbit starts perpendicular to the SALI plane and with small value of the coordinate x then there is very little radial acceleration and the radial distance increases. In contrast, when the orbit starts with a large absolute value of x, then there is a strong acceleration in negative radial direction, the orbit starts with a large value of inward curvature and the initial value of R is a maximum. In this sense, approximately the outer half on both sides of the domain of the SALI plots corresponds to negative orientation with respect to the intersection condition pR = 0 and the inner half on both sides corresponds to positive orientation of this intersection. It is also clear that points with positive x correspond to positive values of L and points with negative values of x correspond to negative values of L.

Accordingly, in total we have the following correspondence: Points on the outer half of the line segment z = 0, x > 0 in the SALI plot can be identified with points in the Poincaré plot along the line ϕ = 0 and positive values of L and points on the outer half of the line segment z = 0, x < 0 in the SALI plot can be identified with points in the Poincaré plot along the line ϕ = π and negative values of L. Analogous considerations hold for SALI plots in the (y, z)-plane where the corresponding values of ϕ are ± π/2. Here, we have only to remember that orbits start with positive values of px and therefore positive values of y in the SALI plot correspond to negative values of L and negative values of y in the SALI plot correspond to positive values of L. The outermost values of either x or y always correspond to L = 0.

Now, let us check this correspondence for the plots of the SM presented in Figures 3a–b, 13 and 14. In the Poincaré plot of Figure 3a, we see large scale regular structures for ϕ = ±π/2 and negative values of L only. Accordingly in Figure 13, we see no large scale regular structures at all for large absolute values of x and for z = 0 and in Figure 14, we see a small strip of regular behaviour along the line z = 0 for positive values of y.

In the next figures, we show SALI plots in the (x, z)-plane for all cases for which we have given Poincaré plots in the invariant plane Sz in Section 3. Figure 15 shows the plots in dependence on M b, Figure 16 contains the plots in dependence on a, Figure 17 shows the plots in dependence on cb, Figure 18 gives the plots for various values of Ωb, and finally Figure 19 shows the plots for two values of the total orbital energy E. In all cases, we can confirm the correspondence between SALI plots and Poincaré plots which we have explained above for the SM. In the Figures 20a–c, we show the relative fraction of chaotic orbits found in the SALI plots as function of M b, a and Ωb, respectively. Looking carefully at Figure 20a–c, it becomes evident that the percentage of the chaotic orbits in the (x, z)-plane increases in the following three cases: (i) when the bar becomes more massive, (ii) when the major semi-axis of the bar increases, and (iii) when the rotational velocity of the bar increases. In all three cases, for large enough values of the parameters (M b > 3500, a > 9, Ωb > 2.3) initial conditions of chaotic orbits dominate covering more than 85% of the (x, z)-plane.

Figure 15. Regions of different values of SALI in a dense grid of initial conditions on the (x, z)-plane when E = −900. (a-upper left): M b = 100; (b-upper right): M b = 500; (c-lower left): M b = 1000; (d-lower right): M b = 5000.

Figure 16. Regions of different values of SALI in a dense grid of initial conditions on the (x, z)-plane when E = −900. (a): a = 1; (b): a = 2; (c): a = 3; (d): a = 5; (e) a = 7; (f): a = 9.

Figure 17. Regions of different values of SALI in a dense grid of initial conditions on the (x, z)-plane when E = −900. (a-left): c b = 0.1; (b-right): c b = 2.5.

Figure 18. Regions of different values of SALI in a dense grid of initial conditions on the (x, z)-plane when E = −2400. (a-upper left): Ωb = 1; (b-upper right): Ωb = 2; (c-lower left): Ωb = 3; (d-lower right): Ωb = 5.

Figure 19. Regions of different values of SALI in a dense grid of initial conditions on the (x, z)-plane. (a-left): E = −1650; (b-right): E = −3000.

Figure 20. Evolution of the relative fraction of chaotic orbits found in the SALI plots on the (x, z)-planes as function of (a): M b, (b): a and (c): Ωb.

The great value of all these SALI plots lies in the following: By the comparison with the Poincaré plots, we obtain the information to which extent the regular structures found in the Poincaré plots are stable against perturbations in z direction. For the example of the SM, a comparison between Figures 3a and 14 shows that the regular structure at ϕ = ±π/2 and negative values of L in the Poincaré plot corresponds to a rather narrow stable strip around z = 0 and large values of y in the SALI plot of Figure 14. Accordingly, this stable structure is rather sensitive against out of plane perturbations and can be destroyed by moderate out of plane perturbations. In contrast, the stable structure along the line z = 0 in SALI plot of Figure 19b, the case for E = −3000, is very wide in z direction and therefore we conclude that the stable structure seen in the Poincaré plot of Figure 10b is rather stable against out of plane perturbations. Analogous considerations hold for all other parameter cases.

For most of the SALI plots, we see a large stable structure at small negative values of x and at large values of z. They correspond to tilted loop orbits which encircle the bar along a large loop, where the radial coordinate R is much larger than the width cb of the bar, and tilted at an angle of approximately π/4 relative to the axis of the bar. This class of stable orbits seems to be the most persistent class of stable 3D orbits in our model. Figure 21 shows an example of such an orbit in position space with initial conditions: x 0 = −3.3, y = 0, z 0 = 4.45, p x0 = 0, p y0 > 0, p z0 = 0. The existence of this class of orbits in triaxial rotating models of galaxies is known for a long time, see e.g., (Heisler, Merritt, & Schwarzchild Reference Heisler, Merritt and Schwarzchild1982).

Figure 21. A characteristic example of an inclined 3D loop orbit along with its projections on the three primary planes.

5 THE SPIRAL STRUCTURE

It is well known that when stars escape from star clusters through the Lagrangian points, they form complicated structures known as tidal tails or tidal arms [e.g., (Capuzzo Dolcetta, Di Matteo, & Miocchi Reference Capuzzo Dolcetta, Di Matteo and Miocchi2005; Di Matteo, Capuzzo Dolcetta, & Miocchi Reference Di Matteo, Capuzzo Dolcetta and Miocchi2005; Just et al. Reference Just, Berczik, Petrov and Ernst2009; Küpper, Macleod, & Heggie Reference Küpper, Macleod and Heggie2008; Küpper et al. Reference Küpper, Kroupa, Baumgardt and Heggie2010)]. In the same vein, in the case of barred spiral galaxies, we observe the formation of spiral arms [e.g., (Ernst & Peters Reference Ernst and Peters2014; Grand, Kawata, & Cropper Reference Grand, Kawata and Cropper2012; Masset & Tagger Reference Masset and Tagger1997; Minchev & Quillen Reference Minchev and Quillen2006; Quillen et al. Reference Quillen, Dougherty, Bagley, Minchev and Comparetta2011; Roškar et al. Reference Roškar, Debattista, Quinn, Stinson and Wadsley2008; Sellwood & Kahn Reference Sellwood and Kahn1991)]. Usually, a star cluster rotates around its parent galaxy in a circular orbit. Thus, the tidal tails follow the curvature defined by the circular orbit and they are nearly straight for orbits moving in large galactocentric distances. The spiral arms of barred galaxies on the other hand, are formed by the non-axisymmetric perturbation of the bar. In particular, in barred spiral galaxies with prominent spiral-like shape, the two arms start from the two ends of the bar and then they wind up around the banana-shaped forbidden regions which enclose the Lagrangian points L 4 and L 5.

It would be very challenging to investigate if our simple gravitational model has the ability to realistically simulate the formation of spiral arms. We shall try to replicate the spiral structure of the SBb galaxy NGC 1300. According to Binney & Tremaine (Reference Binney and Tremaine2008) (plate 10) the semi-major axis of the bar is about 10 kpc. This means that we have to choose such values of the parameters so that the position of the Lagrangian points L 1 and L 2 to be at the two ends of the bar. For this purpose, we choose Ωb = −3.5, while the values of all the other parameters remain as in SM.

In order to test this, we reconfigured our integration numerical routine so as to yield output of all orbits for a 3D grid of size $N_x \times N_y \times N_{\dot{x}} = 100 \times 100 \times 100$, when z 0 = p z0 = 0. This dense grid of initial conditions is centred at the origin of the physical (x, y) space and we allow for all orbits both signs of $\dot{y}$. Our purpose is to monitor the time-evolution of the path of the orbits and simulate the spiral arm formation. At t = 0, all orbits are regularly distributed within the Lagrangian radius inside the interior galactic region. In Figure 22, we present four time snapshots of the position of the 106 stars in the physical (x, y)-plane. We observe that at t = 1 time units, which corresponds to 100 Myr the majority of stars are still inside the interior galactic region. However, a small portion of stars has already escaped passing through either L 1 or L 2. At t = 1.5 time units (150 Myr), we have the first indication of the formation of spiral arms, where with green and red colour we depict stars that escaped through Lagrangian points L 1 and L 2, respectively, while stars that remain inside the Lagrangian radius are shown in cyan. As time goes by, we see that the two symmetrical spiral arms grow in size and at t = 2 time units (200 Myr) the barred galaxy has obtained its complete spiral structure, while the interior galactic region is uniformly filled. In Figure 22a–d, the density of points along one star orbit is taken to be proportional to the velocity of the star according to Ernst & Peters (Reference Ernst and Peters2014). Being more specific, a point is plotted (showing the position of a star), if an integer counter variable which is increased by one at every integration step, exceeds the velocity of the star. Following this technique, we can simulate, in a way, a real N-body simulation of the spiral evolution of the barred galaxy, where the density of stars will be highest where the corresponding velocity is lowest. Therefore, we proved that for E = −1860 and Ωb = −3.5 the scenario of evolution of spiral arms in our new barred galaxy model is indeed viable. Additional numerical simulations reveal that this is also true for other (lower or higher) values of energy. In fact, the particular energy level mainly controls how tight the spiral arms wind up around the forbidden regions of motion.

Figure 22. The four parts of the figure show for four different values of the time the distribution of the position of 106 stars in the physical (x, y)-plane initiated (t = 0) within the Lagrangian radius, for E = −1860 and Ωb = −3.5. We see that as time evolves two symmetrical spiral arms are formed. The green arm contains stars that escaped through L 1, while the red arm contains stars that escaped through L 2. The bound stars inside the interior galactic region are shown in cyan, while the forbidden regions around L 4 and L 5 are filled with gray.

6 DISCUSSION AND CONCLUSIONS

The main topic of the paper is a rather simple analytic gravitational model for the potential of a rotating bar in a disk galaxy with an additional spherical dense nucleus. We claim that our new model has some advantages over older models treated in the literature. Our model has intentionally only three components (nucleus, bar, disk) so as to be able to compare the results with the previous model used in Pfenniger (Reference Pfenniger1984).

Advantages of our model of the bar compared to the model with the Ferrer’s triaxial bar: We have a relatively simple functional form with a moderate number of parameters. The parameters a and cb control the shape of the bar and these parameters have a simple physical meaning: cb is the width in y and z directions, while a is the length in x direction. If one wants to have different widths in y and z direction then one can replace in Equation (3)z by γz and in analogy in the following equations by inserting this modified function $\upsilon$. In addition, we have the parameters M b and Ωb which are mass and angular velocity of the bar. Fortunately, the function Φb(x, y, z) is an elementary function and therefore it is trivial to include a closed form of the forces into a computer programme to construct orbits. In addition, we have the same functional form globally. We do not need any cuts at large distance nor any switch to other functional forms. Interestingly, the mass density resulting from our model and as plotted in Figure 2 is very similar in shape to the one resulting from the more complicated traditional models and as plotted in Figure 1 of Pfenniger (Reference Pfenniger1984). This may be taken as a first hint that our model gives realistic density distributions with moderate effort.

In contrast to simple logarithmic models, our new model of the bar has the correct asymptotic behaviour for large distance. As seen in Equation (5) also our new model is basically a logarithmic model. However, the argument of the logarithm in Equation (5) is constructed such that we obtain the correct asymptotic form − M b/r of the potential for the limit of large distance r from the centre. This correct asymptotic behaviour will become relevant when we want to study scattering behaviour, i.e., when we want to study how outside objects become trapped by the galaxy (for most initial conditions only temporarily) and escape again to infinity. Of course, before starting to investigate scattering behaviour one should add to the total potential an additional term describing the halo of the galaxy.

As a further justification of our model serves, the behaviour of the most important periodic orbit families of the dynamics. As seen in the Poincaré sections plotted in Section 3, one of the stable types of motion in the plane Sz is clockwise (negative orientation) motion around the centre with maximal negative angular momentum. Such orbits have their largest distance from the centre for ϕ = ±π/2 but they are rather close to circular. For our typical parameter values, the average distance from the centre for such orbits is around 6 kpc. Another class of important periodic orbits are the ones of x1 type, as described in detail in Subsection 3.6. They are mainly oscillations along the bar. Such orbits are stable for some parameter regions, in particular for small values of a. But interestingly, when they become unstable for more interesting larger values of a then they form a whole infinity of similar descendants forming a braid of such orbits of very moderate global instability. The persistence of this braid of x1 orbits may be taken as a dynamical explanation of the formation and stability of the bar structure.

These two most prominent types of motion would also be of highest importance for the 3-DOF dynamics if they would be stable under perturbations out of the invariant plane, i.e., under perturbations in z or pz direction. We have made some fast preliminary calculations of the behaviour of the periodic orbit for large negative values of L and also for the 1:3 x1 orbit including small perturbations in pz. We have done it for values of a where the respective in plane orbit is still stable. The numerical results indicate that also the orbits with out of plane perturbations remain stable. This numerical behaviour can be taken as evidence that the corresponding types of motion also serve as organising centres of the dynamics in the full 3-DOF dynamics. The most persistent stable orbits for all parameter values of the bar are the inclined 3D loop orbits where a typical example has been shown in Figure 21.

The results from Section 5 suggest a stellar dynamical explanation of the formation of spirals which start at the ends of the bar and consist of stars leaking out from the interior part of the effective potential via the Lagrangian points L 1 and L 2. Also this behaviour is consistent with the results of Ernst & Peters (Reference Ernst and Peters2014). Thus, we may claim that our new galactic potential has the ability to model the formation and also the evolution of twin spiral structures observed in all barred galaxies.

ACKNOWLEDGEMENTS

One of the authors (CJ) thanks DGAPA for financial support under grant number IG-101113. The authors would like to express their warmest thanks to the anonymous referee for the careful reading of the manuscript and for all the apt suggestions and comments which allowed us to improve both the quality and the clarity of our paper.

Footnotes

1 A sticky orbit is a chaotic orbit which behaves as a regular one for a long time period before revealing its true chaotic nature.

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Figure 0

Figure 1. The isoline contours of the effective potential in the (x, y)-plane for z = 0 for the standard model. Included are the five Lagrangian points.

Figure 1

Figure 2. The isoline contours of the mass density on the (x, y)-plane for z = 0 of the total gravitational potential Φ(x, y, z) for the standard model.

Figure 2

Figure 3. (a-left): The restricted Poincaré map Pr for the standard model and (b-right): Regions of different values of the SALI in a dense grid of initial conditions on the (ϕ, L)-plane. Light reddish colours correspond to ordered motion, dark blue/purple colours indicate chaotic motion, while all intermediate colours suggest sticky orbits. Note the excellent agreement between the two methods. However, we should point out that the SALI method can easily pick out small stability regions embedded in the chaotic sea which cannot be easily detected by the classical PSS method.

Figure 3

Figure 4. The rotation angle ω as a function of the angular momentum L for Mb = 0.

Figure 4

Figure 5. Examples of the perturbed map Pr for various values of the mass of the bar Mb when E = −900. (a-upper left): Mb = 100; (b-upper right): Mb = 500; (c-lower left): Mb = 1000; (d-lower right): Mb = 5000.

Figure 5

Figure 6. The rotation angle ω as a function of the angular momentum L for a = 0.

Figure 6

Figure 7. Examples of the perturbed map Pr for various values of the major axis of the bar a when E = −900. (a): a = 1; (b): a = 2; (c): a = 3; (d): a = 5; (e) a = 7; (f): a = 9.

Figure 7

Figure 8. Examples of the perturbed map Pr for various values of the scale length of the bar cb when E = −900. (a-left): cb = 0.1; (b-right): cb = 2.5.

Figure 8

Figure 9. Examples of the perturbed map Pr for various values of the rotational speed of the bar Ωb when E = −2400. (a-upper left): Ωb = 1; (b-upper right): Ωb = 2; (c-lower left): Ωb = 3; (d-lower right): Ωb = 5.

Figure 9

Figure 10. Examples of the perturbed map Pr for various values of the total orbital energy E. (a-left): E = −1650; (b-right): E = −3000.

Figure 10

Figure 11. (a-left): An unstable x1 1:3 periodic orbit for a = 7 when E = −900; (b-right): The two left-right asymmetric x1 1:3 periodic orbits for a = 7 when E = −900. Note that one orbit is the mirror image of the other one.

Figure 11

Figure 12. (a-left): Evolution of the trace of the monodromy matrix of the x1 1:3 family as a function of the major axis of the bar a when E = −900. The blue horizontal dashed lines at –2 and +2 delimit the range of the trace for which the periodic orbits are stable; (b-right): The characteristic curve of the x1 1:3 family.

Figure 12

Figure 13. Regions of different values of SALI in a dense grid of initial conditions on the (x, z)-plane for the standard model.

Figure 13

Figure 14. Regions of different values of SALI in a dense grid of initial conditions on the (y, z)-plane for the standard model.

Figure 14

Figure 15. Regions of different values of SALI in a dense grid of initial conditions on the (x, z)-plane when E = −900. (a-upper left): Mb = 100; (b-upper right): Mb = 500; (c-lower left): Mb = 1000; (d-lower right): Mb = 5000.

Figure 15

Figure 16. Regions of different values of SALI in a dense grid of initial conditions on the (x, z)-plane when E = −900. (a): a = 1; (b): a = 2; (c): a = 3; (d): a = 5; (e) a = 7; (f): a = 9.

Figure 16

Figure 17. Regions of different values of SALI in a dense grid of initial conditions on the (x, z)-plane when E = −900. (a-left): cb = 0.1; (b-right): cb = 2.5.

Figure 17

Figure 18. Regions of different values of SALI in a dense grid of initial conditions on the (x, z)-plane when E = −2400. (a-upper left): Ωb = 1; (b-upper right): Ωb = 2; (c-lower left): Ωb = 3; (d-lower right): Ωb = 5.

Figure 18

Figure 19. Regions of different values of SALI in a dense grid of initial conditions on the (x, z)-plane. (a-left): E = −1650; (b-right): E = −3000.

Figure 19

Figure 20. Evolution of the relative fraction of chaotic orbits found in the SALI plots on the (x, z)-planes as function of (a): Mb, (b): a and (c): Ωb.

Figure 20

Figure 21. A characteristic example of an inclined 3D loop orbit along with its projections on the three primary planes.

Figure 21

Figure 22. The four parts of the figure show for four different values of the time the distribution of the position of 106 stars in the physical (x, y)-plane initiated (t = 0) within the Lagrangian radius, for E = −1860 and Ωb = −3.5. We see that as time evolves two symmetrical spiral arms are formed. The green arm contains stars that escaped through L1, while the red arm contains stars that escaped through L2. The bound stars inside the interior galactic region are shown in cyan, while the forbidden regions around L4 and L5 are filled with gray.