Local boundedness for solutions to parabolic $p,q$-problems with degenerate coefficients

TL;DR

This paper proves local boundedness of solutions to certain degenerate parabolic equations with p,q-growth conditions, extending regularity results to equations with unbounded coefficients.

Contribution

It establishes local boundedness of solutions under p,q-growth conditions with degenerate coefficients, and proves existence of bounded variational solutions.

Findings

Subsolutions are locally bounded from above.

Existence of locally bounded variational solutions.

Results hold under specific p,q-gap assumptions.

Abstract

We investigate the local boundedness of solutions $u:\Omega_T\to\mathbb{R}$ to parabolic equations of the form \begin{equation*} \partial_tu-\mathrm{div}\,\mathcal{A}(x,t,Du)=0 \qquad\mbox{in }\Omega_T=\Omega\times(0,T) \end{equation*} that satisfy $p,q$-growth conditions and have degenerate coefficients. More precisely, we assume structure conditions of the type \begin{align*} |\mathcal{A}(x,t,\xi)|&\le b(x,t)(\mu^2+|\xi|^2)^{\frac{q-1}{2}},\\ \langle \mathcal{A}(x,t,\xi),\xi\rangle&\ge a(x,t)(\mu^2+|\xi|^2)^{\frac {p-2}{2}}|\xi|^2, \end{align*} for $2\le p\le q$ and $\mu\in[0,1]$, where the functions $a^{-1}, b:\Omega_T\to\mathbb{R}$ are possibly unbounded and only satisfy some integrability condition. Under a certain assumption on the gap between $p$ and $q$, we prove two main results. First, we show that subsolutions that are contained in the natural energy space are locally bounded from above. Second, for parabolic equations with a variational structure, we use these bounds to show the existence of locally bounded variational solutions.