Monte Carlo simulations

The MC simulations were conducted using the egs_brachy Monte Carlo code. ^{Reference Chamberland, Taylor and Rogers5} The egs_brachy is based on the Electron Gamma Shower National Research Council of Canada (EGSnrc) code and can simulate photons and electrons. ^{Reference Chamberland, Taylor and Rogers5} EGSnrc can easily model complex structures using the C++ library, and many sealed small source therapy sources and applicators have been modeled. ^{Reference Buchapudi, Manickam and Chandaraj16} To perform the simulations, the MicroSelectron mHDR-v2r (Elekta AB, Stockholm, Sweden) used for treatment was modeled. The MicroSelectron mHDR-v2r geometric design and material details were adapted from a previous report, ^{Reference Granero, Vijande and Ballester17} and the spectrum of the ¹⁹²Ir source was obtained from the National Nuclear Data Center. ¹⁸ Since the absorbed dose can be approximated by collision kerma, track length estimation was employed. In all simulations, the photon and electron cut-off energies were set to 10 keV, and the statistical uncertainty was within 1% for all voxels. The absorbed dose in egs_brachy was calculated as the dose per simulated history, and Equation (1) was used to calculate the absolute dose for a given voxel x:

(1) $$D_{absolute}^x = {S_K}_{max}{{{D_x}} \over {S_K^{hist}}}\Delta {t_{max}}$$

where ${S_K}_{max}$ is the air kerma intensity of the source at the beginning of treatment, D_x is the dose per history for a voxel x, $S_K^{hist}$ is the air kerma intensity per history calculated for the mHDR-v2r source model and is the the maximum value at each stop time. $S_K^{hist}$ for the MicroSelectron mHDR-v2r used in this study was 1.1909 × 10⁻¹³ Gy cm²/history, as calculated based on the report by Rogers et al. ^{Reference Yasumoto, Shibuya and Hoshina1,Reference Rogers19} For commissioning the egs_brachy used in this study, the dose rate constant, radial dose function and anisotropic function reported by Granero et al. were compared with our simulation results in a water medium. They were found to be in good agreement (<2% at 0°and 180° in anisotropy function, <1% in the others). ^{Reference Granero, Vijande and Ballester17}

Comparing dose profiles using slab phantoms

The resins of mold were denture base materials, including Bruxism Sprint (BS) and GC OSTRON II (GC Inc., Tokyo, Japan). BS is thermoplastic resin, and OSTRON is polymerised resin. The elemental composition and relative electron density of the two materials are listed in Table 1.

Table 1. Elemental composition, relative electron density and physical density of material used in molds

In MC simulation, slab phantoms were prepared with the resin compositions mentioned in Table 1. Resin density varies depending on the manufacturer, ambient temperature and other environmental factors. Omnexus provides maximum and minimum density values for different types of resins. ²⁰ Since the maximum and minimum densities of BS and OSTRON are unclear, dose calculations were performed for worst case scenarios of 1·5 g/cm³ and 1·0 g/cm³ as the maximum and minimum densities. Figure 1 shows the setup geometry of the slab phantom used in dose calculations. The calculated dose profiles were compared with TG-43 to investigate dose differences due to variation in the density of mold resins.

Figure 1. Geometry for calculating dose profiles using MC simulation. The source was placed in the center of a water sphere with a radius of 40 cm. The slab phantom was 1 cm thick. Dose profiles were obtained in the direction of the short axis of the source.

Dose Verification in Mold Irradiation of Soft Palate Tumours

Dose verification was performed in mold irradiation of soft palate tumours using molds made from BS and OSTRON. A patient with soft palate cancer cT2N0M0, stage II, was modelled in the validation of mold irradiation. This patient was treated with mold irradiation alone. The patient was irradiated four times with a large irradiation field, including the uvula, and three times with a reduced field (less dose to the uvula). The tumour size was 2·5 cm in the anterior–posterior direction, 2 cm in the lateral direction and 1 cm deep. The study was conducted at the authors’ institutions with approval from their respective ethics committees. The mold used is shown in Fig. 2. This mold has five tubes inserted at equal intervals to create a dose distribution that fits the shape of the tumour. Three-dimensional (3D) computed tomography (CT)-based planning was performed using thin CT slices with a thickness of 1 mm in Somatom go. Open.pro (Siemens Medical Systems, Erlangen, Germany). To appropriately visualise the target, metal markers or thin copper wires were placed inside the tube. A planning scan confirmed that the mold material fitted properly. The scan was repeated performed when there was an inappropriate fit due to an intervening air gap. An oncentra brachytherapy treatment planning system (TPS) version 4·5·2 (Nucletron, Elekta AB, Stockholm, Sweden) was used for the treatment planning. Figure 3 shows the ROIs (region of intrests) of the high-risk clinical target volume (HR-CTV) and organ-at-risk (OAR) setups. The dose distribution was obtained by setting the dose point 120 mm from the source. The target was visualised for each slice, and the treatment plan was evaluated. Doses were prescribed based on 6 Gy per fraction and a 100% dose curve; HR-CTV was set at 3 Gy.

Figure 2. The images of mold applicator used for brachytherapy of soft palate cancer with A) cranial, B) right lateral, C) caudal, and D) posterior views. The clear resin is BS and the pink resin is OSTRON.

Figure 3. Three cross-sections (axial, sagittal and coronal) of the high-risk clinical target volume (HR-CTV; light blue) and organ-at-risk (OAR; purple) ROIs. The red arrows indicate the mold. High computed tomography values in the mold indicate catheters for transporting ¹⁹²Ir sources.

Patient and mold modeling in MC simulation

Anonymised patient digital imaging and communications in medicine (DICOM) data (CT data, contour data) were transferred to egs_brachy, and a voxel phantom was created in the egsphant format with a voxel size of 1 mm × 1 mm × 1 mm. The density of each voxel was determined using a CT value – density calibration curve. Then, using the density of each voxel and contour information, air, fat, soft tissue and dense bone based on ICRU44 ²¹ were assigned to the patient body, and OSTRON II and BS compositions were applied to the mold. To investigate the change in dose distribution due to mold density changes in dose verification, the density was overridden to 1·0 g/cm³ and 1·5 g/cm³ without changing the composition. In this study, the MC simulation with mold density determined from CT value is defined as MC_reference. MC_dmin and MC_dmax were defined as the values calculated with MC simulation overriding the mold density to 1·0 g/cm³ and 1·5 g/cm³, respectively. The dose distributions of these MCs were calculated and compared with TPS. Since the available evidence in TG-186 does not directly support D _w,m, it is preferable to report D _m,m, a conceptually well-defined quantity, as opposed to D _w,m, a theoretical quantity with no physical realisation in nonaqueous media. ^{Reference Beaulieu, Carlsson Tedgren and Carrier22} Therefore, tissue-absorbed doses were calculated in this study.

Dosimetric evaluation

DVH parameters were obtained for the TPS and all simulations using 3D Slicer. ^{Reference Pinter, Lasso, Wang, Jaffray and Fichtinger23} To evaluate dose changes caused by the differences in the molds and dose calculation algorithms, D _98%, D _90%, V _100%, V _150% V _200%, and dose homogeneity index (DHI) were calculated for HR-CTV and gross tumour volume (GTV). The D _2cc of tongue, OAR, was also calculated. DHI, a measure of the percentage of the high-dose regions within the target, was calculated using Equation (2).

(2) $$DHI = {{{V_{100\% }} - {V_{150\% }}} \over {{V_{100\% }}}}$$