Regularity for general functionals with double phase

Abstract

We prove sharp regularity results for a general class of functionals of the type w ∫ F(x, w, Dw) \, dx\;, featuring non-standard growth conditions and non-uniform ellipticity properties. The model case is given by the double phase integral w ∫ b(x,w)(|Dw|p+a(x)|Dw|q) \, dx\;, 1 <p < q\,, a(x)≥ 0\;, with 0< ≤ b(·)≤ L . This changes its ellipticity rate according to the geometry of the level set \a(x)=0\ of the modulating coefficient a(·). We also present new methods and proofs, that are suitable to build regularity theorems for larger classes of non-autonomous functionals. Finally, we disclose some new interpolation type effects that, as we conjecture, should draw a general phenomenon in the setting of non-uniformly elliptic problems. Such effects naturally connect with the Lavrentiev phenomenon.