Add to ORKGAbstract. We propose a new approach to the numerical treatment of non(quasi)convex rate-independent evolutionary problems. The main idea is to replace the non(quasi)convex energy density by its polyconvexification. For this problem, first-order optimality conditions are derived and used in finding a discrete solution. The effectiveness of the method is illustrated with some numerical experiments
We study a rate-independent evolution of problems where the energy W is a function of the deformatio...
Gradient plasticity at large strains with kinematic hardening is analyzed as quasistatic rate-indepe...
Gradient plasticity at large strains with kinematic hardening is analyzed as qua-sistatic rate-indep...
Rate-independent problems are considered, where the stored energy density is a function of the grad...
Abstract. Rate-independent problems are considered, where the stored energy density is a function of...
Many problems in continuum mechanics, especially in the theory of elastic materials, lead to nonline...
We propose a general feasible method for nonsmooth, nonconvex constrained optimization problems. Th...
Abstract. We study a quasistatic evolution problem for a nonconvex elastic energy functional. Due to...
This paper is concerned with a space-time discretization of a rate-independent evolution governed by...
We propose a general feasible method for nonsmooth, nonconvex constrained optimization problems. The...
We propose a general algorithmic framework for the minimization of a nonconvex smooth function subje...
We propose a general algorithmic framework for the minimization of a nonconvex smooth function subje...
We propose a general algorithmic framework for the minimization of a nonconvex smooth function subje...
Summarization: The impact and the usefulness of difference convex optimization techniques for the nu...
Summarization: Several extensions of smooth computational mechanics algorithms for the treatment of ...
We study a rate-independent evolution of problems where the energy W is a function of the deformatio...
Gradient plasticity at large strains with kinematic hardening is analyzed as quasistatic rate-indepe...
Gradient plasticity at large strains with kinematic hardening is analyzed as qua-sistatic rate-indep...
Rate-independent problems are considered, where the stored energy density is a function of the grad...
Abstract. Rate-independent problems are considered, where the stored energy density is a function of...
Many problems in continuum mechanics, especially in the theory of elastic materials, lead to nonline...
We propose a general feasible method for nonsmooth, nonconvex constrained optimization problems. Th...
Abstract. We study a quasistatic evolution problem for a nonconvex elastic energy functional. Due to...
This paper is concerned with a space-time discretization of a rate-independent evolution governed by...
We propose a general feasible method for nonsmooth, nonconvex constrained optimization problems. The...
We propose a general algorithmic framework for the minimization of a nonconvex smooth function subje...
We propose a general algorithmic framework for the minimization of a nonconvex smooth function subje...
We propose a general algorithmic framework for the minimization of a nonconvex smooth function subje...
Summarization: The impact and the usefulness of difference convex optimization techniques for the nu...
Summarization: Several extensions of smooth computational mechanics algorithms for the treatment of ...
We study a rate-independent evolution of problems where the energy W is a function of the deformatio...
Gradient plasticity at large strains with kinematic hardening is analyzed as quasistatic rate-indepe...
Gradient plasticity at large strains with kinematic hardening is analyzed as qua-sistatic rate-indep...