# Maximal regularity for local minimizers of non-autonomous functionals

**Authors:** Peter H\"ast\"o, Jihoon Ok

arXiv: 1902.00261 · 2022-02-18

## TL;DR

This paper proves new regularity results for local minimizers of non-autonomous functionals with $(p,q)$-growth, using a unified condition that encompasses many known cases and extends the theory to more general settings.

## Contribution

It introduces a single continuity condition for the integrand that ensures regularity, removing the need for the gap between growth bounds to be close to 1.

## Key findings

- Established $C^{1,eta}$-regularity for minimizers under general conditions.
- Unified the regularity theory for various growth conditions including $p$-, Orlicz-, and double phase.
- Extended regularity results to cases with larger gaps between growth bounds.

## Abstract

We establish local $C^{1,\alpha}$-regularity for some $\alpha\in(0,1)$ and $C^{\alpha}$-regularity for any $\alpha\in(0,1)$ of local minimizers of the functional \[ v\ \mapsto\ \int_\Omega \phi(x,|Dv|)\,dx, \] where $\phi$ satisfies a $(p,q)$-growth condition. Establishing such a regularity theory with sharp, general conditions has been an open problem since the 1980s. In contrast to previous results, we formulate the continuity requirement on $\phi$ in terms of a single condition for the map $(x,t)\mapsto \phi(x,t)$, rather than separately in the $x$- and $t$-directions. Thus we can obtain regularity results for functionals without assuming that the gap $\frac qp$ between the upper and lower growth bounds is close to $1$. Moreover, for $\phi(x,t)$ with particular structure, including $p$-, Orlicz-, $p(x)$- and double phase-growth, our single condition implies known, essentially optimal, regularity conditions. Hence, we handle regularity theory for the above functional in a universal way.

## Full text

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## References

86 references — full list in the complete paper: https://tomesphere.com/paper/1902.00261/full.md

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Source: https://tomesphere.com/paper/1902.00261