Morrey estimates for the gradient in non-linear variational transmission problems
Abstract
We study a class of variational transmission problems driven by nonlinear energies with discontinuous coefficients across a prescribed interface. The model setting consists of integral functionals of the form where the coefficient takes two constant values on complementary regions separated by a hypersurface, and the integrand satisfies standard -growth and monotonicity conditions with . In this nonlinear variational framework, we establish local Morrey-space regularity for the gradient of local minimizers, proving that for every , provided . The proof is based on quantitative decay estimates for the energy near the interface, first obtained in a flat configuration and then extended to the general case by a suitable approximation argument.
Cite
@article{arxiv.2602.14658,
title = {Morrey estimates for the gradient in non-linear variational transmission problems},
author = {Luca Esposito and Lorenzo Lamberti},
journal= {arXiv preprint arXiv:2602.14658},
year = {2026}
}