Regularity for Orlicz phase problems

We provide comprehensive regularity results and optimal conditions for a general class of functionals involving Orlicz multi-phase of the type \begin{align} \label{abst:1} v\mapsto \int_{\Omega} F(x,v,Dv)\,dx, \end{align} exhibiting non-standard growth conditions and non-uniformly elliptic properties. The model functional under consideration is given by the Orlicz multi-phase integral \begin{align} \label{abst:2} v\mapsto \int_{\Omega} f(x,v)\left[ G(|Dv|) + \sum\limits_{k=1}^{N}a_k(x)H_{k}(|Dv|) \right]\,dx,\quad N\geqslant 1, \end{align} where $G,H_{k}$ are $N$-functions and $ 0\leqslant a_{k}(\cdot)\in L^{\infty}(\Omega) $ with $0 < \nu \leqslant f(\cdot) \leqslant L$. Its ellipticity ratio varies according to the geometry of the level sets $\{a_{k}(x)=0\}$ of the modulating coefficient functions $a_{k}(\cdot)$ for every $k\in \{1,\ldots,N\}$. We give a unified treatment to show various regularity results for such multi-phase problems with the coefficient functions $\{a_{k}(\cdot)\}_{k=1}^{N}$ not necessarily Holder continuous even for a lower level of the regularity. Moreover, assuming that minima of the functional above belong to better spaces such as $C^{0,\gamma}(\Omega)$ or $L^{\kappa}(\Omega)$ for some $\gamma\in (0,1)$ and $\kappa\in (1,\infty]$, we address optimal conditions on nonlinearity for each variant under which we build comprehensive regularity results. On the other hand, since there is a lack of homogeneity properties in the nonlinearity, we consider an appropriate scaling with keeping the structures of the problems under which we apply Harmonic type approximation in the setting varying on the a priori assumption on minima. We believe that the methods and proofs developed in this paper are suitable to build regularity theorems for a larger class of non-autonomous functionals.