Introduction
The aim of this paper is to study the relationship of the Brouwer degree of a vector field with the dynamics of the induced flow, in particular with the dynamical and topological properties of the isolated invariant sets and their unstable manifolds. Analogous relations are studied for the index of a vector field, obtaining in this way new forms of the Poincaré–Hopf theorem. This classic result has brought a considerable amount of attention in the past 10 years and several results in the same spirit have been obtained in different contexts (see for instance [Reference Crowley and Grant10, Reference King and Trotman16, Reference Li17, Reference Munaò and Vandervorst20, Reference Rau23]).
As consequences of these relations, we also obtain generalizations of Borsuk's and Hirsch's antipodal theorems for domains that are isolating blocks. We calculate the Brouwer degree and the index of vector fields in several situations of dynamical and topological significance. Some applications include the detection of linking orbits in attractor–repeller decompositions of isolated invariant compacta and the calculation of the Brouwer degree of the vector field of the Lorenz equations in isolating blocks of the Lorenz strange set. Furthermore, we present an expression of the shape index, originally defined by Robbin and Salamon [Reference Robbin and Salamon25], in terms of the Euclidean topology. This new expression is quite intuitive and easy to handle.
We consider flows $\varphi :\mathbb {R}^{n}\times \mathbb {R}\longrightarrow \mathbb {R}^{n}$ in the Euclidean space, induced by smooth vector fields $F: \mathbb {R}^{n}\longrightarrow \mathbb {R}^{n}$. We will use through the paper some basic notions of dynamical systems (see [Reference Bhatia and Szegö6]) and the Conley index theory (see [Reference Conley9, Reference Salamon26]).
We shall make use of the concepts of $\omega$-limit and $\omega ^*$-limit of a compactum $X\subset \mathbb {R}^n$ defined as
We recall that a compact invariant set $K\subset \mathbb {R}^n$ is said to be isolated whenever it is the maximal invariant subset of some neighbourhood $N$ of itself. A neighbourhood $N$ satisfying this requirement is known with the name of isolating neighbourhood. We shall make extensive use of a special kind of isolating neighbourhoods called isolating blocks. An isolating block $N$ is an isolating neighbourhood with the property that there exist compact subsets $L,\,L'\subset \partial N$ called the exit and entrance sets such that:
(1) $\partial N=L\cup L'$.
(2) For every $x\in L'$ there exists $\varepsilon >0$ such that $x[-\varepsilon,\,0)\subset \mathbb {R}^n\setminus N$ and for every $x\in L$ there exists $\delta >0$ such that $x[0,\,\delta )\subset \mathbb {R}^n\setminus N$.
(3) For each $x\in L$ there exists $\varepsilon >0$ such that $x[-\varepsilon,\,0)\subset \mathring {N}$ and for every $x\in \partial N\setminus L$ there exists $\delta >0$ such that $x(0,\,\delta ]\subset \mathring {N}$.
It is well known that an isolating invariant set possesses a basis of neighbourhoods comprised of isolating blocks. Moreover, since we are dealing with smooth flows, these blocks can be chosen to be $n$-dimensional manifolds with boundary, satisfying that $L$ and $L'$ are $(n-1)$-dimensional submanifolds of $\partial N$ of with $\partial L=L\cap L'=\partial L'$ (see [Reference Conley and Easton8] or [Reference Sánchez-Gabites33, Apéndice A.2]). In this case, the points of $L\cap L'$ are exactly those where the vector field is tangent to $\partial N$. All the isolating blocks considered in this paper will be assumed to be of this kind without explicitly mention it.
Among isolated invariant sets attractors play a central role. An attractor $K$ is a compact invariant set that is stable and possesses a neighbourhood $U$ such that the omega-limit $\omega (x)$ of each point in $U$ is non-empty and is contained in $K$. The condition on stability means, roughly speaking, that the positive semi-trajectories of nearby points remain nearby. More precisely, if $V$ is any neighbourhood of $K$, there exists a neighbourhood $U$ of $K$ with the property that $U[0,\,+\infty )\subset V$. An attractor is said to be global if the neighbourhood $U$ can be chosen to be the total space. Repellers are defined in an analogous way using the negative omega-limit $\omega ^*$ and negative semi-trajectories. Notice that a repeller is just an attractor for the flow obtained by changing the sign of the time variable.
We are going to use some notions from algebraic topology, including duality theorems. All the material we are going to need is covered in the books by Hatcher [Reference Hatcher13], Munkres [Reference Munkres21] and Spanier [Reference Spanier30]. We use the notation $H_*$ and $H^*$ to denote the singular homology and cohomology functors and $\check {H}^*$ for the Čech cohomology functor, all of them with integer coefficients unless otherwise specified. We recall that Čech and singular cohomology theories coincide on manifolds and, more generally, polyhedra and pairs of such spaces. We say that a pair of spaces $(X,\,A)$ is of finite type whenever $\check {H}^k(X,\,A)$ is finitely generated for every $k$ and non-zero for only a finite number of values of $k$. Pairs of compact manifolds or, more generally, polyhedra are examples of pairs of finite type. While attractors and repellers of flows defined on Euclidean spaces are of finite type [Reference Kapitanski and Rodnianski15, Corollary 4.2], this is not the case for every isolated invariant set. For instance, the author in [Reference Barge1, Remark 9] shows an example of a flow on $\mathbb {R}^3$ which has the Hawaiian earring as an isolated invariant set. In order to make our statements cleaner we shall make the following standing assumption.
Stand 0.1 Whenever $K$ is an isolated invariant set, we shall assume, without further mention, that $K$ is of finite type.
If a pair $(X,\,A)$ is of finite type, its Euler characteristic is defined as follows:
We shall make use of the following property of the Euler characteristic [Reference Spanier30, Exercise B.1, p. 205]: if two of the three $(X,\,A)$, $X$, $A$, are of finite type, then so is the third and
Notice that if $(X,\,A)$ is a pair of manifolds or polyhedra, then the Euler characteristic defined in an analogous way using singular cohomology coincides with the previous one.
The Conley index of an isolated invariant set $K$, denoted $h(K)$, is defined as the pointed homotopy of the quotient space $(N/L,\,[L])$ where $N$ is any isolating block for $K$. Notice that, while different isolating blocks may represent different homotopy types, the Conley index only depends on $K$. The cohomology index $CH^*(K)$ is defined to be the Čech cohomology of the pointed space $(N/L,\,[L])$. Using the strong excision property of Čech cohomology we get that the cohomology index is isomorphic to $\check {H}^*(N,\,L)$.
Given an isolating block $N$ for an isolated invariant set $K$, we shall denote by $\deg (F,\,N)$ to the degree of $F_{|_{\mathring {N}}}$ and, if $K$ has only a finite number of singularities, by $I(F_{|_N})$ to the total index of $F_{|_N}$, that is, the sum of the indices of the singularities. When we refer to $I(F_{|_N})$, we say that the index is defined if $F_{|_N}$ has a finite number of singular points. For a detailed treatment of mapping degree theory, including the index theory of vector fields, see the book by Outerelo and Ruiz [Reference Outerelo and Ruiz22].
We shall make use of the following result, obtained by Srzednicki [Reference Srzednicki32], McCord [Reference McCord19], Fotouhi and Razvan [Reference Razvan and Fotouhi24], in different levels of generality, that relates degree of a vector field near an isolated invariant set, with its Conley index. We present here a slightly different but equivalent version of the one presented by Izydorek and Styborski in [Reference Izydorek and Styborski14, Theorem 4.2].
Theorem 0.2 Let $\varphi :\mathbb {R}^n\times \mathbb {R}\longrightarrow \mathbb {R}^n$ be a flow induced by a smooth vector field $F$ defined on $\mathbb {R}^n$. Suppose that $K$ is an isolated invariant set for $\varphi$ and $N$ an isolating block for $K$. Then,
Moreover, if $K$ contains only a finite number of equilibria then
Notice that the Euler characteristic of the Conley index is well-defined, taking into account that the pair $(N,\,L)$ used to compute it can be chosen to be a pair of compact manifolds. The second part of the statement follows from the fact that the Brouwer degree is, by the additivity property, the sum of the indices of all the singular points of $F$ in $N$.
Finally, we will also use some elementary facts from Borsuk's homotopy theory (named Shape theory by him). This theory was introduced by K. Bosuk in 1968 in order to study homotopy properties of compacta with bad local behaviour for which the classical homotopy theory is not well suited. We are not going to make an extensive use of Borsuk's homotopy theory, in particular we are only interested in the following very simple situation: consider a compact metric space $K$, a closed subspace $K_{0}$ and a sequence of maps $f_{k}:K\longrightarrow K$ such that ${f_{k}}_{|_{K_{0}}}:K_{0} \longrightarrow K_{0}$ (i.e. ${f_{k}}_{|_{K_{0}}}$ maps $K_{0}$ to itself) and the following conditions hold for almost every $k$:
(1) For every neighbourhood $U$ of $K_{0}$ in $K$ we have $\operatorname {Im} f_k\subset U$ and $f_{k}\simeq f_{k+1}$ in $U$.
(2) $f_{k}\simeq \operatorname {id}_{K}.$
(3) ${f_{k}}_{|_{K_{0}}}\simeq \operatorname {id}_{K_{0}}$ in $K_{0}.$
Then $K$ and $K_0$ have the same shape (there is an analogous statement for pointed shape). We shall use the notation $\operatorname {Sh}(K)=\operatorname {Sh}(K_{0})$ to denote that both $K$ and $K_0$ have the same shape. We shall also make use of the following fact from shape theory:
(1) If $X$ and $Y$ have the same homotopy type, then they have the same shape.
(2) If $X$ and $Y$ are polyhedra (or more generally, ANR), $X$ and $Y$ have the same shape if and only if they have the same homotopy type.
(3) If $X$ and $Y$ have the same shape, then they have isomorphic Čech cohomology groups.
More information about the theory of shape can be found in the books by Borsuk [Reference Borsuk7], Mardešić and Segal [Reference Mardešić and Segal18] and Dydak and Segal [Reference Dydak and Segal11]. Some applications of shape theory to dynamics can be seen in [Reference Kapitanski and Rodnianski15, Reference Sanjurjo27].
1. Shape index, initial sections and the degree of a vector field
In [Reference Barge and Sanjurjo3], the authors proved that some parts of the unstable manifold of an isolated invariant set admit sections that carry a considerable amount of information. These sections enable the construction of parallelizable structures which facilitate the study of the flow.
Definition 1.1 Let $K$ be an isolated invariant compactum and let $S$ be a compact section of the truncated unstable manifold $W^{u}(K)\setminus K$. Then $S$ is said to be an initial section provided that $\omega ^{\ast }(S)\subset K.$
If $S$ is an initial section we define
Obviously, $I_{S}^{u}(K)=\{x\in W^{u}(K)\setminus K\mid xt\in S$ with $t\geq 0\}$. In accordance with this terminology, we say that $I_{S}^{u}(K)\cup K$ is an initial part of the unstable manifold of $K$ and we denote it by $W_{S}^{u}(K).$ In [Reference Barge and Sanjurjo3], it was proved that, although $I_{S}^{u}(K)$ depends on $S$, all the initial parts have basically the same structure. More specifically, if $S$ and $T$ are initial sections of $W^u(K)$, the pairs $(W^u_S,\,S)$ and $(W^u_T,\,T)$ are homeomorphic.
Analogous notions known as final section and final part of the stable manifold can be defined and have similar properties.
If $N$ is an isolating block for $K$, we denote by $N^{-}$ the negative asymptotic set, that is, the set $\{x\in N\mid xt\in N$ for every $t\leq 0\}$. Set $n^{-}=N^{-}\cap L$. It is easy to see that $N^{-}$ is an initial part of the unstable manifold with initial section $n^{-}$. The positive asymptotic set $N^+$ is defined in an analogous way and is a final part of the stable manifold with final section $n^+=N^+\cap L'$.
In this paper, we make some use of the shape index of an invariant isolated set $K$. The shape index $S(K)$ was introduced by Robbin and Salamon in [Reference Robbin and Salamon25] as $\operatorname {Sh}(N/L,\,\ast )$, where $\ast =[L].$ The cohomology of the shape index is the classical cohomological (Conley) index. In [Reference Sanjurjo28], the second author showed that the shape index can be represented in terms of compact sections of the unstable manifold endowed with the intrinsic topology (as defined also by Robbin and Salamon). The constraint of the intrinsic topology is substantial, since this topology is not very intuitive and difficult to handle, so we believe that an expression of the shape index in terms of the Euclidean (or extrinsic) topology is much more useful and we find it in the first result of the paper. A crucial element of this expression is the use of the initial sections of truncated manifolds as defined above.
Theorem 1.2 Let $\varphi :\mathbb {R}^{n}\times \mathbb {R}\longrightarrow \mathbb {R}^{n}$ be a flow (not necessarily differentiable) and $K$ an isolated invariant set of $\varphi$. Let $W^{u}(K)$ the unstable manifold of $K$, $S$ an initial section of $W^{u}$ and $W_{S}^{u}(K)$ the corresponding initial part of the unstable manifold of $W^{u}(K)$. Then the shape index $S(K)$ is $\operatorname {Sh}(W_{S}^{u}(K)/S,\,\ast )$, that is, the pointed shape of the quotient set $W_{S}^{u}/S$ where $\ast =[S]$. Furthermore, if $CS$ is the cone over $S$ then $S(K)=\operatorname {Sh}(W_{S}^{u}\cup CS,\,\ast ),$ where $\ast$ is the vertex of the cone.
Proof. Let $N$ be an isolating block of $K$ and $L$ its exit set. Since all the pairs $(W_{S}^{u},\,S),$ where $S$ is an initial section, are homeomorphic, we can limit ourselves to the pair $(N^{-},\,n^{-})$. Let $\alpha :N\setminus N^+\longrightarrow \mathbb {R}$ the map defined by
Then for every $k\in \mathbb {N\cup \{}0\}$ we define the map $f_{k}:N\longrightarrow N$ by
The map $f_{k}$ is continuous and fixes all points in $L$ (this is essentially Wazewski's lemma [Reference Ważewski34, Theorem 2]). Suppose that $U$ is an open neighbourhood of $N^{-}\cup L$ in $N$. We claim that there is a $k_{0}\in \mathbb {N}$ such that $\operatorname {Im} f_{k}\subset U$ and $f_{k}\simeq f_{k+1}$ in $U$ for every $k\geq k_{0}$, and the homotopy leaves al points in $L$ fixed. In order to prove it we show that there is a positive $s_{0}$ such that $N^+[s_{0},\,\infty )\subset U$. Otherwise, there would be sequences $x_{n}\in N^+$ and $s_{n}\longrightarrow \infty$ such that $x_{n}s_{n}\rightarrow y\in N^+-U$. Then, $\gamma ^{-}(y)\subset N$ and, since $y\in N^+$, the whole trajectory $\gamma (y)$ would be contained in $N\setminus K$ in contradiction with the assumption that $N$ is an isolating block of $K$. Furthermore, there is a $s_{1}\geq s_{0}$ with the property that $xt\in U$ for every $x\in N\setminus N^+$ and for every $t$ such that $s_{1}\leq t\leq \alpha (x)$. Otherwise there would be sequences $x_{n}\in N$, $t_{n}\rightarrow \infty$ with $x_{n}t_{n}\notin U$, $x_{n}t_{n}\rightarrow y\in N$ and $x_n[0,\,t_{n}] \subset N$. But this would imply that $y\in N^{-}$, in contradiction with the fact that $y\notin U$, as limit of $x_{n}t_{n}$. We obtain from this that $\operatorname {Im} f_{k}\subset U$ for $k\geq s_{1}$ and select an index $k_{0}\geq s_{1}.$ It is clear that the homotopy $h_{k}:N\times \lbrack 0,\,1]\rightarrow N$ defined by
links $f_{k}$ and $f_{k+1}$ in $U$ leaving all points in $L$ fixed. Furthermore, the map
defines a homotopy $h:N\times \lbrack 0,\,1]\longrightarrow N$ linking $\operatorname {id}_{N}$ with $f_{k}.$ Similarly, it can be seen that $f_{{k}|_{N^{-}\cup L}}$ is a map $N^{-}\cup L\longrightarrow N^{-}\cup L$ homotopic to $\operatorname {id}_{N^{-}\cup L}$, with the homotopy fixing all points in $L$.
Notice that the subspace $(N^{-}\cup L)/L\subset N/L$ can be identified with $N^{-}/n^{-}$. We use the notation $\ast$ to designate both the point $[L]\in N/L$ and the point $[n^{-}]\in N^{-}/n^{-}$. Now consider the composition $\bar {f}_{k}=p\circ f_{k}:N\longrightarrow N/L$, where $p:N\longrightarrow N/L$ is the natural projection. This map induces a map $\hat {f }_{k}:N/L\longrightarrow N/L$ such that $\hat {f}_{k}=p\circ \bar {f}_{k}$. We then have a sequence of maps $\hat {f}_{k}:N/L\longrightarrow N/L$ such that $\hat {f}_{k|_{N^{-}/n^{-}}}:N^{-}/n^{-}\longrightarrow N^{-}/n^{-}$ and the following conditions are satisfied for almost every $k$:
(1) For every neighbourhood $\hat {U}$ of $N^{-}/n^{-}$ in $N/L$ we have $\operatorname {Im} \hat {f}_k\subset \hat {U}$ and $\hat {f }_k\simeq \hat {f}_{k+1}$ in $\hat {U}$.
(2) $\hat {f}_{k}\simeq \operatorname {id}_{N/L}.$
(3) $\hat {f}_{{k}|_{N^{-}/n^{-}}}\simeq \operatorname {id}_{N^{-}/n^{-}}$.
(4) All the homotopies leave the point $\ast$ fixed.
It follows from this that $\operatorname {Sh}(N/L,\,\ast )=\operatorname {Sh}(N^{-}/n^{-},\,\ast )$ and, therefore, $\operatorname {Sh}(W_{S}^{u}/S,\,\ast )=S(K)$ (where $\ast =[S].$)
To finish the proof it remains to observe that by [Reference Mardešić and Segal18, Corollary 3, p. 247], the natural projection $W_{S}^{u}\cup CS\longrightarrow W_{S}^{u}/S$ is a pointed shape equivalence and, therefore $S(K)=\operatorname {Sh}(W_{S}^{u}\cup CS,\,\ast ),$ where $\ast$ is the vertex of the cone.
Remark 1.3 The statement in theorem 1.2 does not hold if the section $S$ is not initial. An example of a compact section $S$ is given in [Reference Barge and Sanjurjo3, Fig 2, pg. 840] which is not initial and such that $\operatorname {Sh}(W_{S}^{u}(K)/S,\,\ast )$ is not the shape index $S(K)$.
By combining theorem 1.2 together with theorem 0.2 we obtain the following corollary that relates the degree of a vector field (or the index when defined) near an isolated invariant set, its Euler characteristic and the Euler characteristic of an initial section.
Corollary 1.4 Let $\varphi :\mathbb {R}^{n}\times \mathbb {R}\longrightarrow \mathbb {R}^{n}$ be a flow induced by the smooth vector field $F:\mathbb {R}^{n}\longrightarrow \mathbb {R}^{n}$and $K$ an isolated invariant set of $\varphi$. Let $W^{u}(K)$ be the unstable manifold of $K$ and $S$ an initial section of $W^{u}(K)$. If $N$ is an isolating block of $K$ then
Moreover, if the index $I(F_{|_N})$ is defined then
Proof. First observe that, if $L$ is the exit set of $N$ we have that $\chi (N,\,L)$ is defined and
As before, we use that $N^-$ is the initial part of the truncated unstable manifold relative to the initial section $n^-$. By an argument similar to that used in the proof of the theorem 1.2, it is easy to see that $\operatorname {Sh}(N^{-})=\operatorname {Sh}(K)$. Then $\check {H}^{r}(N^{-})=\check {H}^{r}(K)$ for every $r$ and, thus, $\chi (N^{-})=\chi (K).$ Moreover, theorem 1.2 ensures that $S(K)=\operatorname {Sh}(N^{-}/n^{-},\,\ast )$. Hence, as a consequence of the strong excision property of Čech cohomology we obtain that
Notice that, since $\chi (N^-,\,n^-)$ and $\chi (N^-)$ are defined so is $\chi (n^-)$ (hence, $\chi (S)$).
This corollary allows in many cases to establish a direct relation of the Brouwer degree and the total index with the topology of the invariant set $K$, as we show in various results of the paper. In other cases we also need some knowledge of the initial section of the unstable manifold, which is often easy to compute. This gives an alternative method to the one provided by theorem 0.2 that has some advantages in certain cases.
A direct consequence of corollary 1.4 is a particular case of a result obtained by Srzednicki [Reference Srzednicki32, Lemma 6.2].
Corollary 1.5 If $K$ is a continuum in $\mathbb {R}^{2}$ then $\deg (F,\,N)\leq \chi (K)$. Also $I(F_{|_N})\leq \chi (K)$ when $I(F_{|_N})$ is defined.
Proof. In [Reference Barge and Sanjurjo3] it was shown that for $n=2$ the section $S$ is a disjoint finite union of circles and (possibly degenerate) topological intervals and, consequently, $\chi (S)\geq 0.$ Then $\deg (F,\,N)=\chi (K)-\chi (S)\leq \chi (K)$.
The following corollary deals with the important particular case of theorem 1.4 when the initial part of the unstable manifold is a genuine manifold whose boundary is the initial section $S$.
Proposition 1.6 Suppose that $W_{S}^{u}$ is an $m$-dimensional manifold with boundary $\partial W_{S}^{u}=S$. Then
In particular, $\deg (F,\,N)$ agrees with $\chi (K)$ if the parities of $n$ and $m$ are the same and with $-\chi (K)$ otherwise. The same statement is valid for $I(F_{|_N})$ when defined.
Proof. Since by corollary 1.4
we only have to compute $\chi (S)$. Taking into account that $W^u_S(K)$ is a genuine $m$-manifold whose boundary is $S$, it follows that $S$ is a closed $(m-1)$-manifold. If $m$ is even, then $m-1$ is odd and Poincaré duality ensures that $\chi (S)=0.$ On the other hand, if $m$ is odd, Lefschetz duality, together with the fact that the $\operatorname {Sh}(W^u_S)=\operatorname {Sh}(K)$ ensure that
As a consequence, $\chi (S)=2\chi (K)$ and the result follows.
The classical Poincaré–Hopf theorem is the most important particular case of proposition 1.6:
Corollary 1.7 If $F$ points outwards in $\partial N$ and $I(F_{|_N})$ is defined then $I(F_{|_N})=\chi (N)$. The same holds for $\deg (F,\,N)$. In this case there is no requirement for $I(F_{|_N})$ to be defined.
Proof. Since $F$ points outwards in $\partial N$ it follows that the maximal invariant set contained in $N$ must be a repeller. Moreover, $N$ is a negatively invariant neighbourhood of $K$ and, as a consequence, we can take $W_{S}^{u}=N$, $S=\partial N$ and $n=m$. Since $\check {H}^*( W_{S}^{u})=\check {H}^*(K)$ the result follows from proposition 1.6.
The following result refers to flows that have a global repeller.
Corollary 1.8 If $\varphi$ has a global repeller $K$ then $\deg (F,\,N)=1$ for every isolating block containing $K$ and $I(F_{|_N})=1$ when defined.
Proof. If $K$ is the global repeller of $\varphi$ then $K$ has the Čech cohomology groups of a point by [Reference Kapitanski and Rodnianski15, Theorem 3.6]. Since the degree does not depend on the choice of the isolating block, we may assume that $N$ is negatively invariant, i.e., such that $N=N^-$. Hence, $\chi (N)=\chi (K)=1$ and the result follows from corollary 1.7.
In dimension 2 we obtain a kind of reciprocal to the Poincaré–Hopf theorem and a nice characterization of the flows such that $I(F_{|_N})=\chi (N)$.
Proposition 1.9 If $K$ is a continuum in $\mathbb {R}^{2}$ and $I(F_{|_N})$ is defined then the vector field $F$ is tangent to $\partial N$ in exactly $2(\chi (N)-I(F_{|_N}))$ points. As a consequence, $I(F_{|_N})=\chi (N)$ if and only if $F$ either points outwards or inwards in every component of $\partial N$.
Proof. The first part of the statement follows from the fact that the points of tangency are exactly the points of $L\cap L'=\partial L$, where $L'$ is the entrance set. Since $L$ is a compact $1$-dimensional manifold, it is a disjoint union of circles and closed intervals. Hence, $\partial L$ consists of the endpoints of each interval component of $L$. Since each interval has exactly two endpoints and $\chi (L)$ is just a count of the number of interval components of $L$, the result follows from theorem 0.2. The second part of the statement is a direct consequence of this discussion.
Example 1.10 Let $\varphi$ be a flow in $\mathbb {R}^2$ induced by a vector field $F$ and suppose that $K$ is an isolated periodic trajectory. Then, it is not difficult to see that $K$ admits an isolating block $N$ that is a closed annulus with two different boundary components, each contained in a different component of $\mathbb {R}^2\setminus K$. Since $K$ does not contain fixed points, then
and, proposition 1.9 ensures that the vector field points either outwards or inwards in every component of $\partial N$. Hence, we have three mutually exclusive possibilities:
(1) $F$ points inwards in both components of $\partial N$ and, hence, $K$ is an attractor.
(2) $F$ points outwards in both components of $\partial N$ and, hence, $K$ is a repeller.
(3) $F$ points inwards in one component of $\partial N$ and outwards in the other. In this case $K$ is neither an attractor nor a repeller.
Although these three possibilities cannot be distinguished only using the index, they can be distinguished by using the Conley index. Indeed, in the first case, $L=\emptyset$ and, hence, the effect of collapsing is equivalent to make the disjoint union of $N$ with a point $\{*\}$ not belonging to $N$. Since $N$ is an annulus, it has de homotopy type of the circle $S^1$ and, hence, the Conley index of $K$ is the pointed homotopy type of $(S^1\cup \{*\},\,*)$ where $*$ is a point that does not belong to $S^1$.
In the second case $L=\partial N$ and $(N/L,\,[L])$ is a pinched torus that is pointed homotopy equivalent to the wedge $(S^2\vee S^1,\,*)$.
Finally, in the third case, $L$ is just one component of $\partial N$. Since $N$ is homeomorphic to the product $S^1\times [0,\,1]$, $(N/L,\,[L])$ is just the cone $(CS^1,\,*)$ that is contractible. It follows that the Conley index of $K$ is trivial.
This shows that the Conley index is a finer invariant than the index of a vector field.
2. Brouwer degree of vector fields near non-saddle sets
In this section we study the Brouwer degree of a vector field in a vicinity of a special class of isolated invariant sets called non-saddle.
We start by recalling that an invariant set $K$ is said to be non-saddle if it satisfies that for every neighbourhood $U$ of $K$ there exists a neighbourhood $V$ of $K$ such that for all $x\in V$ either $x[0,\,+\infty )\subset U$ or $x(-\infty,\,0]\subset U$. Otherwise $K$ is said to be saddle. We shall only consider non-saddle sets that are also isolated. Attractors, repellers and unstable attractors with mild forms of instability are some examples of non-saddle sets. Isolated non-saddle sets are characterized by possessing arbitrarily small isolating blocks of the form $N=N^+\cup N^-$ (see [Reference Barge and Sanjurjo5, Proposition 3]). Moreover, if $K$ is connected, every connected isolating block is, in fact, of this form. Notice that if $N$ is an isolating block of this form, the vector field points either inwards or outwards in each connected component of $\partial N$. Using the homotopies provided by the flow, it easily follows that $\check {H}^*(K)\cong H^*(N)$ and, therefore, $K$ is of finite type. Another property that we shall use in the sequel is that the union of the components of the boundary of an isolating block of the form $N=N^+\cup N^-$ in which the vector field points outwards is an initial section of the unstable manifold of $K$. In an analogous way, the union of those components of $\partial N$ in which the flow points inwards is a final section of the stable manifold. Hence, for isolated non-saddle sets of smooth flows on $\mathbb {R}^n$ initial and final sections of the unstable and stable manifolds are closed manifolds of dimension $n-1$. For more information on isolated non-saddle sets the reader can see [Reference Barge2, Reference Barge and Sanjurjo4, Reference Barge and Sanjurjo5].
In view of this, the following result is a far-reaching generalization of the Poincaré–Hopf theorem. Furthermore, it provides a nice characterization of non-saddle sets for flows in the plane.
Proposition 2.1 Suppose that $K$ is a non-saddle continuum, $N$ is a connected isolating block of $K$ and $S$ and $S^*$ an initial and a final section of the truncated unstable and stable manifolds of $K$ respectively. Suppose also that $I(F_{|_N})$ is defined. Then,
(1) If the dimension $n$ is even then $I(F_{|_N})=\chi (K)=\chi (N)$.
(2) If $n$ is odd then $I(F_{|_N})={1}/{2} (\chi (S^{\ast })-\chi (S))=-\chi (N)+\chi (S^{\ast })$ (note that if $K$ is a repeller then $\chi (S^{\ast })=0$ and, therefore, $I(F_{|_N})=-\chi (N)$).
Moreover, if $n=2$ and $K$ is an arbitrary isolated invariant continuum then $I(F_{|_N})=\chi (K)$ if and only if $K$ is non-saddle.
An analogous statement is valid for $\deg (F,\,N)$. In this case there is no requirement that $I(F_{|_N})$ be defined.
Proof. We may assume without loss of generality that $S=n^-$ and $S^*=n^+$. If $n$ is even, since $S$ is a closed manifold of odd dimension it follows that $\chi (S)=0$ and, hence, $I(F_{|_N})=\chi (K)=\chi (N).$
Suppose now that $n$ is odd. Taking into account that $\partial N=S\cup S^*$, Lefschetz duality applied to the pair $(N,\,\partial N)$ yields
where the homology and the cohomology are taken in dual dimensions relative to $n.$
Since $n$ is odd we deduce from the former expression that
On the other hand,
Summing up,
Since $H^{\ast }(N)\cong \check {H}^{\ast }(K)$ we have that $\chi (N)=\chi (K)$ and, using this fact in the formula from corollary 1.4 we get that
Now suppose that $n=2$ and $K$ is an arbitrary isolated invariant continuum. We only have to see that the equality $I(F_{|_N})=\chi (K)$ ensures the non-saddleness of $K$ since the converse statement is just case (1). By [Reference Barge and Sanjurjo3, Theorem 10], $K$ is non-saddle if and only if all the components of $S$ are circles .The equality $I(F_{|_N})=\chi (K)$ implies that $\chi (S)=0$ and, thus, in this case, no component of $S$ can be a (possibly degenerate) topological interval and, consequently, must be a circle. Therefore, $K$ is non-saddle.
In the following result, we use the Alexandrov (or one-point) compactification of the Euclidean space $\mathbb {R}^{n}\cup \{\infty \}$ to show that under further assumptions more can be said about the degree of $F$ and its index. We recall that $\mathbb {R}^{n}\cup \{\infty \}$ is homeomorphic to the $n$-sphere $S^{n}$.
Proposition 2.2 Suppose that $K$ is a non-saddle continuum, $n$ is even and every component of $(\mathbb {R}^{n}\cup \{\infty \})\setminus K$ is contractible (this always happens for $n=2$). Consider a connected isolating block $N$ of $K.$ Then $\deg (F,\,N)\leq 1$, and $I(F_{|_N})\leq 1$ when defined. Also, if $\deg (F,\,N)=1$ then $K$ is either an attractor or a repeller.
Proof. Let $k$ be the number of components of $(\mathbb {R}^n\cup \{\infty \})\setminus K$ (which is finite and coincides with $1+\operatorname {rk} \check {H}^{n-1}(K)$ by Alexander duality). Since they are contractible, they have Euler characteristic equal to one. By Lefschetz duality [Reference Spanier30, Theorem 19, pg. 297]
Then, proposition 2.1 ensures that $\deg (F,\,N)=\chi (K)\leq 1$. Furthermore, the equality $2-k=1$ holds if and only if $K$ does not disconnect $\mathbb {R}^{n}\cup \{\infty \}$. In such a case, the only component of $\mathbb {R}^{n}\cup \{\infty \}\setminus K$ is locally attracted or locally repelled by $K$ by [Reference Barge and Sanjurjo5, Theorem 25]. In the first case $K$ is an attractor and in the second $K$ is a repeller.
Next we analyse the situation when the dimension $n$ is odd and greater than one.
Proposition 2.3 Suppose that $K$ is a non-saddle continuum, $n>1$ is odd and every component of $(\mathbb {R}^{n}\cup \{\infty \})\setminus K$ is contractible. Consider a connected isolating block $N$ of $K.$ Then $\deg (F,\,N)\leq k$, and $I(F_{|_N})\leq k$ when defined. Furthermore, if $I(F_{|_N})$ is defined,
(1) $I(F_{|_N})=k$ if and only if $K$ is an attractor.
(2) $I(F_{|_N})=-k$ if and only if $K$ is a repeller.
(3) $I(F_{|_N})=0$ if and only if $K$ decomposes $\mathbb {R}^{n}$ in an even number of components, half of them locally attracted by $K$ and half of them locally repelled.
Analogous statements hold for $\deg (F,\,N)$. In this case there is no requirement that $I(F_{|_N})$ be defined.
Proof. By [Reference Barge and Sanjurjo5, Theorem 25] we have that all the components of $(\mathbb {R}^{n}\cup \{\infty \})\setminus K$ are either locally attracted or locally repelled by $K$. We denote by $U$ the union of all the components of $(\mathbb {R}^{n}\cup \{\infty \})\setminus K$ which are locally repelled by $K$ and by $V$ the union of all the components which are locally attracted. Then there is an attractor $A\subset U$ such that $U$ is the basin of attraction of $A$ and analogously, a repeller $R\subset V$ such that $V$ is the basin of repulsion of $R$. Let $k$ be the number of components of $\mathbb {R}^{n}\setminus K$ and $u$ the number of components of $U$. Then, by [Reference Kapitanski and Rodnianski15, Theorem 3.6] $H^{\ast }(U)=\check {H}^{\ast }(A)$ and, by the duality theorem [Reference Spanier30, Theorem 17, pg. 296], $\check {H}^{\ast }(A)=H_{n-\ast }(U,\,U\setminus A)$. So, since $n$ is odd, we have
For the last equality, we use the facts that all the components of $U$ are contractible and that $S$ is a strong deformation retract of $U\setminus A$. Since $\chi (A)=\chi (U)=u$ we obtain that $\chi (S)=2u.$
By an analogous argument applied to $R$ and $V$ we obtain that $\chi (S^{\ast })=2(k-u).$ So, by proposition 2.1 we get
and, since $u\geq 0$, we obtain that $I(F_{|_N})\leq k$.
Also, $I(F_{|_N})=k$ if and only if $u=0,$ which happens if and only if $K$ is an attractor. On the other hand, the equality $I (F_{|_N})=-k$ holds if and only if $u=k,$ which occurs if and only if $K$ is a repeller. Finally $I(F_{|_N})=0$ if and only if $k=2u$, i.e., if and only if the number of components of $\mathbb {R}^{n}-K$ that are locally repelled by $K$ matches the number of components that are locally attracted by $K$.
3. Brouwer degree and connecting orbits in attractor–repeller decompositions
In this section we show how to use the Brouwer degree to detect the existence of connecting orbits in attractor–repeller decompositions. We also give an estimate of the Euler characteristics of the set of connecting orbits. Finally, we present an application of these results in order to calculate the Brouwer degree of the Lorenz vector field in an isolating block of the Lorenz strange set.
We recall that if $K$ is an isolated invariant set and $A\subsetneq K$ is an attractor for the restriction flow $\varphi _{|_K}$, then the set
is non-empty and is a repeller for $\varphi _{|_K}$. The pair $\{A,\,R\}$ is called attractor–repeller decomposition of $K$. Notice that if $K\neq A\cup R$ the orbit of any point $x\notin A\cup R$ satisfies that $\omega (x)\subset A$ and $\omega ^*(x)\subset R$. These kinds of orbits are the so-called connecting orbits between $A$ and $R$.
Proposition 3.1 Let $\{A,\,R\}$ be an attractor–repeller decomposition of the isolated invariant set $K$ and $N$ an isolating block of $K$. If $\deg (F,\,N)\neq \chi (A)+\chi (R)-\chi (S)$ then there exists an orbit in $K$ connecting $A$ and $R$. Moreover, if $C$ is the union of all connecting orbits then
Proof. We argue by contradiction. Suppose that there is no orbit in $K$ connecting $A$ and $R$. Then $K$ is the disjoiunt union of $A$ and $R$. As a consequence,
Thus, corollary 1.4 ensures that
contradicting the hypothesis.
Let us compute the Euler characteristic of the set $C$ of connecting orbits. Since $C$ is parallelizable we can find a section $C_{0}$ of $C$. Define $K_{1}=A\cup C_{0}\lbrack 0,\,\infty )$ and $K_{2}=R\cup C_0(-\infty,\,0].$ Then $K=K_{1}\cup K_{2}$ and $K_{1}\cap K_{2}=C_{0}$. By using the Mayer–Vietoris sequence
we readily get that
However, $C_{0}$ is a strong deformation retract of $C$ and so $\chi (C)=\chi (C_{0}).$ Moreover, arguing in the same way as in the proof of theorem 1.2 we obtain that $\operatorname {Sh}(K_{1})=\operatorname {Sh}(A)$ and $\operatorname {Sh}(K_{2})=\operatorname {Sh}(R)$ and therefore $\chi (K_{1})=\chi (A)$ and $\chi (K_{2})=\chi (R)$. Hence, the result follows.
The Lorenz vector field $F:\mathbb {R}^{3}\longrightarrow \mathbb {R}^{3}$ provides a simplified model of fluid convection dynamics in the atmosphere, and is given by
where $\sigma,\,r$ and $b$ are three real positive parameters corresponding respectively to the Prandtl number, the Rayleigh number and an adimensional magnitude. We consider the so-called classical values $\sigma =10,\,b=8/3.$ In [Reference Sparrow31] it is shown that for values of $r$ between $13.926\ldots$ (which corresponds to the homoclinic bifurcation) and $24.06$ (where another type of bifurcation occurs involving the two branches of the unstable manifold of the origin) a ‘strange set’ $\mathcal {L}$ originates that exhibits sensitive dependence on initial conditions. For these values of the parameter $r$, the global attractor $\Omega$ of the Lorenz system has an attractor–repeller decomposition $\{A,\,\mathcal {L}\}$ where $\mathcal {L}$ is the Lorenz strange set and $A$ consists of two points. It follows from [Reference Giraldo and Sanjurjo12, Corollary 5.3] and [Reference Sanjurjo29, Theorem 7] that the Lorenz strange set has the shape of a wedge of two circles. Therefore, $\chi (\mathcal {L})=-1$. We shall also make use of the fact that, since $\Omega$ is the global attractor, $\chi (\Omega )=1$.
Proposition 3.2 Let $F:\mathbb {R}^{3}\longrightarrow \mathbb {R}^{3}$ be the Lorenz vector field and let $N$ be an isolating block of the Lorenz strange set $L.$ Then $\deg (F,\,N)=1.$ Moreover, if $\hat {N}$ is an isolating block of the global attractor $\Omega$, then $\deg (F,\,\hat {N})=-1$.
Proof. Let $C$ be the set of connecting orbits between $A$ and $\mathcal {L}$. Then, proposition 3.1 together with the considerations made before the statement of the proposition ensure that
Since $\Omega$ is an attractor, the unstable manifold of $\mathcal {L}$ is contained in $\Omega$ and, thus, agrees with $C.$ Now, let $N$ be an isolating block of $\mathcal {L}$. By corollary 1.4, we get
This contrasts with the situation for the global attractor: if $\hat {N}$ is an isolating block of $\Omega$ then $\deg (F,\,\hat {N})=(-1)^{3}\chi ( \Omega )=-1$.
Remark 3.3 For values of the parameter $r>24.06$ the strange set $\mathcal {L}$ becomes an attractor (the Lorenz attractor) and its Čech cohomology (even its shape) remains that of a wedge of two circles. Since $\mathcal {L}$ is now an attractor, $S=\emptyset$ and
4. A generalization of Borsuk's and Hirsch's antipodal theorems
We now present a result that is a form of Borsuk's [Reference Outerelo and Ruiz22, Theorem 5.2, pg. 163] and Hirsch's [Reference Outerelo and Ruiz22, Theorem 5.3, pg. 166] antipodal theorems for domains which are isolating blocks, involving the dynamics of the flow induced by $F$ rather than the Brouwer degree of $F$. Using this result it is possible to conclude from inspection of $K$ and $S$ the existence of a point $x$ in the boundary $\partial N$ such that the vector field $F$ points in the same (or opposite) direction at $x$ and $-x$.
We say that an isolating block $N\subset \mathbb {R}^n$ is symmetric if $x\in N$ if and only if $-x\in N$, i.e., $N$ is invariant for the antipodal action.
Proposition 4.1 Suppose that the isolating block $N$ is symmetric and $0\in N$. Then
(i) If $\chi (K)$ and $\chi (S)$ have the same parity then there is some $x\in \partial N$ such that $F(x)$ and $F(-x)$ point in the same direction. In particular, if $N$ is the unit ball $B^{n}$ (and thus $\partial N=S^{n-1})$ and $F_{|_{S^{n-1}}}$ maps $S^{n-1}$ into $S^{n-1}$ then there is some $x\in S^{n-1}$ such that $F(x)=F(-x)$.
(ii) If $\chi (K)$ and $\chi (S)$ have different parity then there is some $x\in \partial N$ such that $F(x)$ and $F(-x)$ point in opposite directions. In particular, if $N$ is the unit ball $B^{n}$ (and thus $\partial N=S^{n-1})$ and $F_{|_{S^{n-1}}}$ maps $S^{n-1}$ into $S^{n-1}$ then there is some $x\in S^{n-1}$ such that $F(x)=-F(-x)$.
Proof. If $\chi (K)$ and $\chi (S)$ have the same parity then by theorem 1.4 the degree of $F_{|_{\mathring {N}}}$ is even and (i) is a consequence of the Hirsch theorem. If $\chi (K)$ and $\chi (S)$ have a different parity then by corollary 1.4 the degree of $F_{|_{\mathring {N}}}$ is odd and (i) is a consequence of the Borsuk antipodal theorem.
Acknowledgements
The authors would like to express their gratitude to the anonymous referees for their useful suggestions that had helped to improve the quality of the manuscript.