A Numerical Method for Variational Problems with Convexity Constraints

Adam M. Oberman

Type: Article

Publication Date: 2013-01-01

Citations: 15

DOI: https://doi.org/10.1137/120869973

Abstract

We consider the problem of approximating the solution of variational problems subject to the constraint that the admissible functions must be convex. This problem is at the interface between convex analysis, convex optimization, variational problems, and partial differential equation techniques. The approach is to approximate the (nonpolyhedral) cone of convex functions by a polyhedral cone which can be represented by linear inequalities. This approach leads to an optimization problem with linear constraints which can be computed efficiently, hundreds of times faster than existing methods.

Locations

SIAM Journal on Scientific Computing - View
arXiv (Cornell University) - View - PDF

Similar Works

Action	Title	Year	Authors
+	A numerical method for variational problems with convexity constraints	2011	Adam M. Oberman
+	A numerical method for variational problems with convexity constraints	2011	Adam M. Oberman
+	Convex underestimators for variational and optimal control problems	2001	Adam B. Singer Jin-Kwang Bok Paul I Bartona
+	Convex programming and variational inequalities	1972	O. G. Mancino G. Stampacchia
+ PDF Chat	Numerical Approximation of Optimal Convex Shapes	2020	Sören Bartels Gerd Wachsmuth
+	A new strategy for solving variational inequalities in bounded polytopes<sup>∗</sup>	1995	Ana Friedlander J. M. Martı́nez Sandra A. Santos
+	Numerical approximation of optimal convex shapes	2018	Sören Bartels Gerd Wachsmuth
+	Numerical approximation of optimal convex shapes	2018	Sören Bartels Gerd Wachsmuth
+	A numerical approach to optimization problems with variational inequality constraints	1995	Jiří V. Outrata Jochem Zowe
+	A Tutorial on the CVX System for Modeling and Solving Convex Optimization Problems	2015	Dayan Guimarães Giovanni Henrique Faria Floriano Lucas Silvestre Chaves
+	Handling convexity-like constraints in variational problems	2014	Quentin Mérigot Èdouard Oudet
+	Handling convexity-like constraints in variational problems	2014	Quentin Mérigot Èdouard Oudet
+	Linear-programming approach to nonconvex variational problems	2004	Sören Bartels Tomáš Roubı́ček
+ PDF Chat	Handling Convexity-Like Constraints in Variational Problems	2014	Quentin Mérigot Èdouard Oudet
+	Convex Programming Numerical Tools	1997
+	Variational Methods in Convex Analysis	2006	Jonathan M. Borwein Qiji Jim Zhu
+	A class of convex programming methods	1986	E. A. Nurminskii
+	A tutorial on convex optimization	2004	H. Hindi
+	A Newton-like method for convex functions	2009	Nenad Ujević Nena Jović Mijić Lucija
+	A general system for heuristic minimization of convex functions over non-convex sets	2017	Solomon Diamond Reza Takapoui S. T. P. Boyd

Works That Cite This (13)

Action	Title	Year	Authors
+ PDF Chat	Discretization of functionals involving the Monge–Ampère operator	2015	Jean‐David Benamou Guillaume Carlier Quentin Mérigot Èdouard Oudet
+ PDF Chat	Pointwise rates of convergence for the Oliker–Prussner method for the Monge–Ampère equation	2018	Ricardo H. Nochetto Wujun Zhang
+	Monotone and consistent discretization of the Monge-Ampère operator	2016	Jean‐David Benamou Francis Collino Jean‐Marie Mirebeau
+	Monotone and Consistent discretization of the Monge-Ampere operator	2014	Jean‐David Benamou Francis Collino Jean‐Marie Mirebeau
+	Linear-Time Convexity Test for Low-Order Piecewise Polynomials	2021	Shambhavi Singh Yves Lucet
+ PDF Chat	Handling Convexity-Like Constraints in Variational Problems	2014	Quentin Mérigot Èdouard Oudet
+ PDF Chat	Adaptive, anisotropic and hierarchical cones of discrete convex functions	2015	Jean‐Marie Mirebeau
+	Conforming approximation of convex functions with the finite element method	2017	Gerd Wachsmuth
+	Handling convexity-like constraints in variational problems	2014	Quentin Mérigot Èdouard Oudet
+	The numerical solution of Newton’s problem of least resistance	2014	Gerd Wachsmuth

Works Cited by This (10)

Action	Title	Year	Authors
+	On Newton’s problem of minimal resistance	1993	Giuseppe Buttazzo Bernhard Kawohl
+ PDF Chat	Newton's Problem of the Body of Minimal Resistance in the Class of Convex Developable Functions	2001	Tristan Robert Mark A. Peletier
+ PDF Chat	Minimizing within Convex Bodies Using a Convex Hull Method	2005	Thomas Lachand-Robert Èdouard Oudet
+	Variational Methods on the Space of Functions of Bounded Hessian for Convexification and Denoising	2005	W. Hinterberger Otmar Scherzer
+	COMPUTING THE CONVEX ENVELOPE USING A NONLINEAR PARTIAL DIFFERENTIAL EQUATION	2008	Adam M. Oberman
+ PDF Chat	Approximating optimization problems over convex functions	2008	Néstor E. Aguilera Pedro Morín
+	On the numerical solution of the equation $$\frac{{\partial ^2 z}}{{\partial x^2 }}\frac{{\partial ^2 z}}{{\partial y^2 }} - \left( {\frac{{\partial ^2 z}}{{\partial x\partial y}}} \right)^2 = f$$ and its discretizations, I	1989	Vladimir Oliker L. D. Prussner
+	NON-CONVERGENCE RESULT FOR CONFORMAL APPROXIMATION OF VARIATIONAL PROBLEMS SUBJECT TO A CONVEXITY CONSTRAINT	2001	Philippe Choné Hervé Le Meur
+ PDF Chat	On Convex Functions and the Finite Element Method	2009	Néstor E. Aguilera Pedro Morín
+	Convex Optimization	2004	Stephen Boyd Lieven Vandenberghe