English

Partial regularity for type two doubly nonlinear parabolic systems

Analysis of PDEs 2018-08-15 v3

Abstract

We study weak solutions v:U×(0,T)Rm{\bf v}:U\times (0,T)\rightarrow \mathbb{R}^m of the nonlinear parabolic system Dψ(vt)=divDF(Dv), D\psi({\bf v}_t)=\text{div}DF(D{\bf v}), where ψ\psi and FF are convex functions. This is a prototype for more general doubly nonlinear evolutions which arise in the study of structural properties of materials. Under the assumption that the second derivatives of FF are H\"older continuous, we show that D2vD^2{\bf v} and vt{\bf v}_t are locally H\"older continuous except for possibly on a lower dimensional subset of U×(0,T)U\times (0,T). Our approach relies on two integral identities, decay of the local space-time energy of solutions, and fractional time derivative estimates for D2vD^2{\bf v} and vt{\bf v}_t.

Keywords

Cite

@article{arxiv.1704.05602,
  title  = {Partial regularity for type two doubly nonlinear parabolic systems},
  author = {Ryan Hynd},
  journal= {arXiv preprint arXiv:1704.05602},
  year   = {2018}
}
R2 v1 2026-06-22T19:20:59.892Z