• Title of article

    Fast finite difference solvers for singular solutions of the elliptic Monge–Ampère equation

  • Author/Authors

    Froese، نويسنده , , B.D. and Oberman، نويسنده , , A.M.، نويسنده ,

  • Issue Information
    روزنامه با شماره پیاپی سال 2011
  • Pages
    17
  • From page
    818
  • To page
    834
  • Abstract
    The elliptic Monge–Ampère equation is a fully nonlinear Partial Differential Equation which originated in geometric surface theory, and has been applied in dynamic meteorology, elasticity, geometric optics, image processing and image registration. Solutions can be singular, in which case standard numerical approaches fail. s article we build a finite difference solver for the Monge–Ampère equation, which converges even for singular solutions. Regularity results are used to select a priori between a stable, provably convergent monotone discretization and an accurate finite difference discretization in different regions of the computational domain. This allows singular solutions to be computed using a stable method, and regular solutions to be computed more accurately. The resulting nonlinear equations are then solved by Newton’s method. ational results in two and three-dimensions validate the claims of accuracy and solution speed. A computational example is presented which demonstrates the necessity of the use of the monotone scheme near singularities.
  • Keywords
    Monge–Ampère equations , Fully nonlinear elliptic Partial Differential Equations , Nonlinear finite difference methods , viscosity solutions , Monotone schemes , Convexity constraints
  • Journal title
    Journal of Computational Physics
  • Serial Year
    2011
  • Journal title
    Journal of Computational Physics
  • Record number

    1483080