PRIMO Monte Carlo simulation

PRIMO is free, non-open source software based on MC general purpose radiation transport code PENELOPE 2011 Salvat et al. for calculation of absorbed dose distribution. ^{Reference Salvat, Fernandez-Varea and Sempau18} PRIMO uses the PENEASY/PENEOPE MC code to simulate Electro-Magnetic (EM) showers in segment-1. PENNELOPE simulates the combined transport of photons, electrons, positrons and their interaction scheme categorized into soft and hard collisions. PENELOPE needs a definite set of simulation parameters under the transport parameter configuration. ^{Reference Brualla, Rodríguez and Sempau19} The default set of parameters used in PRIMO are C1: average angular deflection between consecutive hard collisions, C2: maximum average fractional energy loss between hard collisions, WCC: energy cut-off between hard and soft collisions, WCR: bremsstrahlung energy cut-off, dsMax: maximum allowed step length for charged particles; and E_Abs: terminal absorption energies. The transport parameters used during the simulation were as, C1 = C2 = 0·1, WCC = 200 KeV, WCR = 50 KeV. The cut-off energies for electron, positron and photon were set at E_abs(e⁻) = E_abs(e⁺) = 200 KeV and E_abs (ph) = 50 KeV. PRIMO simulates the patient’s independent and dependent parts of linac performed under segments S1, S2 and S3. Segment S1 allows tallying or producing phase-space file (PSF) at the downstream end of the upper part of linac. Similarly, segment S2 includes PSF tallied or produced at the downstream end of the lower part of linac. At the end, the estimation of absorbed dose distribution in water phantom or CT is included in segment S3. The PSF generated at the end of segment S1 for the upper part of linac during the previous study was used for geometrical source modelling of 6 MV FFF beam from Varian Truebeam linac. ^{Reference Shende, Dhoble and Gupta16} Subsequently the simulation of eclipse cones was performed in segment S2. The total numbers of 5 x 10⁸ primary particle histories were simulated in S1, which produced a PSF file of 100 gigabytes in size. The simulations of each cone were performed individually during the simulation of segments (S2 + S3) attached at the downstream end of the linac. The initial beam parameters used in modelling of 6 MV FFF beam were initial beam energy, full-width half maxima (FWHM) of energy, FWHM of the focal spot and beam divergence given as 5·85 MeV, 0·05 MeV, 0·8 mm and 0·05 degree, respectively. Absorbed dose distributions were tallied within a slab water phantom of dimension 25 cm × 25 cm × 25 cm with a dose scoring voxel of size x = 0·1 cm, y = 0·1 cm, z = 0·1 cm. The measure of performance of calculations is nothing but computational efficiency (η), which depends on calculation time (T) and variance (σ²). PRIMO introduced the variance reduction technique (VRT) and interaction-forcing factor to increase calculation efficiency. PRIMO recommends Russian roulette splitting as a VRT technique. A higher interaction-forcing factor increases simulation time which consequently reduces the computational efficiency chosen close to 16. The computed tomography (CT) factor recognized as particle splitting in phantom was kept at 100 during MC simulation.

SRS cone simulation

The SRS cone is a cylindrical tertiary collimator accessory hooked below the secondary collimator. PRIMO allows us to simulate the physical properties of the cone in the segment S2. The distance between the source to bottom of the CCC in a Truebeam linac is fixed at 74 cm. The MC simulations were carried out for a source to CCC distance of 63 cm, physical length of CCC 11 cm and its nominal aperture size at the isocentre. The cones of various diameters ranging from 5 mm to 17·5 mm with an increment of 2·5 mm were simulated. The corresponding PSF generated at the end of the cone was restored in segment S2. PRIMO uses this PSF in its next subsequent segment S3 for final dose computation in water phantom or CT of interest. Table 1 shows the PENELOPE radiation transport parameter used in PRIMO.

Table 1. Final initial beam parameters used for MC simulation of 6MVFFF nominal beam energy with conical cone collimator for Truebeam linac in PRIMO

PDD and LDP

PDD is defined as the absorbed dose at any depth d to absorbed dose at the reference depth of dose maxima. ^{Reference Khan21} The mathematical expression for PDD is written as follows.

(1) $$PDD = {{{D_d}} \over {{D_{ref}}}}*100{\mkern 1mu} \% $$

where D_d is the dose at any depth and D_ref is the dose at reference depth. D_ref can be the depth of dose maxima. MC simulations of all the cones were performed to obtain simulated PDDs and LDPs in PRIMO. The LDPs are also referred to as off-axis ratios (OARs). Likewise, both sets of PDDs and profiles were measured experimentally using a computer-controlled Radiation 3D-SunScan Field Analyzer (RFA) from Sun Nuclear. These measurements are sensitive to detector position and require detector centring. Therefore, before acquiring the actual depth dose scan centring of the radiation beam axis, the vertical alignment of the cone and detector positioning was verified by using the ray-trace method. This ensures the detector follows the beam centre, which is essential in a small-field depth dose scan. The diameter of a 15 mm cone was used during ray tracing, where LDPs were acquired at depths of 5 cm and 20 cm to determine central beam alignment. The beam central alignment correction was applied for all depth dose scans. In addition, the centring of both profiles was done by central axis correction. The PDD curves were obtained in step-by-step scanning mode with an increment of 1 mm, whereas continuous mode was used to measure dose profiles. All the cone PDDs were simulated and measured at 100 cm SSD and normalized to 100 % at the depth of dose maxima (D _max ). Similarly, profiles were measured and simulated at a depth of 5 cm for three different source-to-surface distances (SSD) 80 cm, 90 cm and 100 cm normalized to 100% at the central axis. To analyse the measured PDD and profile curves, they were converted to.dat* files and imported into the PRIMO workstation. Those sets of data were analysed using the gamma index evaluation tool incorporated in PRIMO as presented by Low et al. ^{Reference Low, Harms, Mutic and Purdy20} Both simulated and measured PDDs and profiles were evaluated based on the gamma analysis index (ϒ) that quantifies the level of agreement or disagreement between measured and MC-simulated curves using gamma-passing criteria of ϒ_2%/1mm where, (2 % dose difference (% DD) and 1 mm distance to agreement (DTA)) with a minimum passing rate of 95 %. The gamma analysis of dose distribution was performed globally for absolute dose verification. The estimated ϒ_2%/1mm ≤ 1 and ϒ_2%/1mm > 1 are considered criteria for passing and failing, respectively.

Tissue maximum ratio (TMR)

The TMR is defined as the ratio of the dose rate at a given point in the phantom to the dose rate at the same point for reference depth of dose maxima. ^{Reference Khan21} The mathematical expression for TMR can be written as,

(2) $$TMR = {{{{({D_d})}_p}} \over {{{({D_{\max }})}_p}}}*100{\mkern 1mu} \% $$

where (D _d ) _p is dose at depth d at point p and (D _max ) _p dose at depth of dose maxima at same point p. TMR and PPD are interrelated by a classical equation derived by Khan et al. ^{Reference Khan21}

(3) $$TMR(d,rd) = {{P{{(d,r,SSD)}_{}}} \over {100}}*{\left( {{{SSD + d} \over {SSD + {d_{\max }}}}} \right)^2}*\left( {{{{S_p}({r_{d\max }})} \over {{S_p}({r_d})}}} \right)$$

where P is PDD, d is depth, d _max is the reference depth of dose maxima, r is the cone field size and S _p is the phantom scatter. The commissioning of cone beam planning needs TMR is a basic requisite for the commissioning of the CDC algorithm in TPS. TMRs were measured directly using a computer-controlled SunScan 3D water phantom (RFA). TMRs were acquired for the range of all cone sizes at a source-detector distance of 100 cm. To reduce spikes in the measurements, TMRs were measured in water-draining mode instead of water-filling mode. However, MC-simulated TMRs were indirectly determined by converting MC-simulated PDDs. ^{Reference Battum, Essers and Storchi22} All the TMR curves were normalized to 100 at Dmax, and simulated TMR curves were compared against the measured TMR.

Cone OFs

The OF is defined as the ratio of output for a given field size to the reference field size at a specific point in the water phantom under maximum scatter conditions. ^{Reference Khan21} The mathematical expression for the relative OF can be given as,

(4) $$OF = {{D{{(r,{\mkern 1mu} {\mkern 1mu} {d_{}})}_{}}} \over {D({r_{ref}},d)}}$$

where D(r, d) is dose for a field at depth d and D(r _ref , d) is dose for reference field at same depth d. The OFs were measured at a depth of 5 cm for source-to-phantom distance (SPD) at 95 cm and source-to-axis distance (SAD) at 100 cm in an isocentric setup. Similarly, OFs were estimated for the same field geometry arrangement using the MC simulation approach in PRIMO. All the measured OFs were corrected for their limitations in small-field dosimetry. For this, the small-field detector (SFD) was cross-calibrated using the cylindrical chamber SNC0125c at an intermediate open field of 3 × 3 cm² known as intermediate daisy-chain method. ²³ OFs were normalized for an open reference field size of 10 × 10 cm². The corrected OFs were determined as follows,

(5) $$O{F_{Corr.}} = {{SF{D_{(Cone)}}} \over {SF{D_{(3x3)}}}}*{{CC{{0125}_{c(3x3)}}} \over {CC{{0125}_{c(10x10)}}}}$$

where SFD _(Cone) is EDGE diode reading for various cone sizes. SFD _(3 × 3) is for diode open field reading. Similarly, CC0125 _c(3 × 3) and CC0125 _{c(10 × 10)} are the reading for open fields using SNC0125c. The dose output for all the cones and the reference field size were determined using MC simulation. PRIMO-simulated OFs were validated against experimentally measured OFs.

CDC algorithm and absolute dose measurement

The CDC algorithm has been employed in eclipse cone planning to calculate the dose for stereotactic cone collimator in the treatment of SRS. CDC uses TMR, OAR and cone OFs to determine dose at any point within the volume. CDC calculates the dose at any arbitrary point is given by,

(6) $$\eqalign{ & D(r,d,SSD,S) = MU*D{R_{ref}}*O{F_{TMR}}(s)*TMR(d,s) \cr & \quad \quad \;\quad \quad \quad \;\quad \;\;*{\left( {{{SAD} \over {SSD + d}}} \right)^2}*OAR(r,s) \cr} $$

where

D(r, d, SSD, S) = Dose at location of interest, MU = Delivered monitor unit,

DR _ref  = Reference Dose rate, OF = Output Factors,

TMR(d, s) = Tissue Maximum Ratio, OAR(r, s) = Off-Axis Ratio,

r is off-axis distance, d is the depth of point of interest along the central axis, and S is nominal diameter of the conical collimator. However, the CDC has its limitations such as the approximation of an arc beam as a static beam, the absence of backscatter near the cavities and exit of the beam, ignoring tissue inhomogeneity and obliquity of beam entry. CDC requires absolute dose measurement in beam configurations measured at a depth of 5 cm for a reference field size of 10 × 10 cm² and SPD 95 cm. The absolute dose measurement was simulated under the same reference geometry setting in PRIMO.