Title of article
Fast numerical algorithms for fitting multiresolution hybrid shape models to brain MRI
Author/Authors
Baba C. Vemuri، نويسنده , , Yanlin Guo، نويسنده , , Christiana M. Leonard، نويسنده , , Shang-Hong Lai، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 1997
Pages
20
From page
343
To page
362
Abstract
In this paper, we present new and fast numerical algorithms for shape recovery from brain MRI using multiresolution hybrid shape models. In this modeling framework, shapes are represented by a core rigid shape characterized by a superquadric function and a superimposed displacement function which is characterized by a membrane spline discretized using the finite-element method. Fitting the model to brain MRI data is cast as an energy minimization problem which is solved numerically. We present three new computational methods for model fitting to data. These methods involve novel mathematical derivations that lead to efficient numerical solutions of the model fitting problem. The first method involves using the nonlinear conjugate gradient technique with a diagonal Hessian preconditioner. The second method involves the nonlinear conjugate gradient in the outer loop for solving global parameters of the model and a preconditioned conjugate gradient scheme for solving the local parameters of the model. The third method involves the nonlinear conjugate gradient in the outer loop for solving the global parameters and a combination of the Schur complement formula and the alternating direction-implicit method for solving the local parameters of the model. We demonstrate the efficiency of our model fitting methods via experiments on several MR brain scans.
Keywords
Shape models , Schur complement , superquadrics , ADI , Brain images , deformable superquadrics , Conjugate gradient , MRI , Preconditioning
Journal title
Medical Image Analysis
Serial Year
1997
Journal title
Medical Image Analysis
Record number
449647
Link To Document