# Energy dissipative solutions to the Kobayashi-Warren-Carter system

**Authors:** Salvador Moll, Ken Shirakawa, Hiroshi Watanabe

arXiv: 1702.04033 · 2017-06-28

## TL;DR

This paper establishes the existence and properties of energy-dissipative solutions to the Kobayashi-Warren-Carter system, a model for grain boundary motion in polycrystals, using variational and regularization techniques.

## Contribution

It introduces a novel approximation method for the energy functional and proves existence, regularity, and convergence results for solutions to the system.

## Key findings

- Existence of energy-dissipative solutions established.
- Gamma-convergence results for weighted total variations proved.
- Complete characterization of the omega-limit set of solutions.

## Abstract

In this paper we study a variational system of two parabolic PDEs, called the Kobayashi-Warren-Carter system, which models the grain boundary motion in a polycrystal. The focus of the study is the existence of solutions to this system which dissipate the associated energy functional. We obtain existence of this type of solutions via a suitable approximation of the energy functional with Laplacians and an extra regularization of the weighted total variation term of the energy. As a byproduct of this result, we also prove some $\Gamma$-convergence results concerning weighted total variations and the corresponding time-dependent cases. Finally, the regularity obtained for the solutions together with the energy dissipation property, permits us to completely characterize the $\omega$-limit set of the solutions.

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Source: https://tomesphere.com/paper/1702.04033