Using an Infinite Von Mises-Fisher Mixture Model to Cluster Treatment Beam Directions in External Radiation Therapy

We present a method for fully automated selection of treatment beam ensembles for external radiation therapy. We reformulate the beam angle selection problem as a clustering problem of locally ideal beam orientations distributed on the unit sphere. For this purpose we construct an infinite mixture of von Mises-Fisher distributions, which is suited in general for density estimation from data on the D-dimensional sphere. Using a nonparametric Dirichlet process prior, our model infers probability distributions over both the number of clusters and their parameter values. We describe an efficient Markov chain Monte Carlo inference algorithm for posterior inference from experimental data in this model. The performance of the suggested beam angle selection framework is illustrated for one intra-cranial, pancreas, and prostate case each. The infinite von Mises-Fisher mixture model (iMFMM) creates between 18 and 32 clusters, depending on the patient anatomy. This suggests to use the iMFMM directly for beam ensemble selection in robotic radio surgery, or to generate low-dimensional input for both subsequent optimization of trajectories for arc therapy and beam ensemble selection for conventional radiation therapy.

[1]  M. Escobar,et al.  Markov Chain Sampling Methods for Dirichlet Process Mixture Models , 2000 .

[2]  P S Cho,et al.  Automatic selection of non-coplanar beam directions for three-dimensional conformal radiotherapy. , 2005, The British journal of radiology.

[3]  J Dai,et al.  Selection and determination of beam weights based on genetic algorithms for conformal radiotherapy treatment planning. , 2000, Physics in medicine and biology.

[4]  A Pugachev,et al.  Computer-assisted selection of coplanar beam orientations in intensity-modulated radiation therapy. , 2001, Physics in medicine and biology.

[5]  S. Walker Invited comment on the paper "Slice Sampling" by Radford Neal , 2003 .

[6]  Donald Geman,et al.  Stochastic Relaxation, Gibbs Distributions, and the Bayesian Restoration of Images , 1984, IEEE Transactions on Pattern Analysis and Machine Intelligence.

[7]  Radford M. Neal Pattern Recognition and Machine Learning , 2007, Technometrics.

[8]  Thomas L. Griffiths,et al.  Infinite latent feature models and the Indian buffet process , 2005, NIPS.

[9]  Uwe Oelfke,et al.  Spherical cluster analysis for beam angle optimization in intensity-modulated radiation therapy treatment planning , 2010, Physics in medicine and biology.

[10]  T. Bortfeld,et al.  Number and orientations of beams in intensity-modulated radiation treatments. , 1997, Medical physics.

[11]  P. Potrebko,et al.  Improving intensity-modulated radiation therapy using the anatomic beam orientation optimization algorithm. , 2008, Medical physics.

[12]  Carl E. Rasmussen,et al.  The Infinite Gaussian Mixture Model , 1999, NIPS.

[13]  M. Ehrgott,et al.  Beam selection in radiotherapy design , 2008 .

[14]  Radford M. Neal Markov Chain Sampling Methods for Dirichlet Process Mixture Models , 2000 .