On the continuity of solutions of quasilinear parabolic equations with generalized Orlicz growth under non-logarithmic conditions

Abstract

We prove the continuity of bounded solutions for a wide class of parabolic equations with (p,q)-growth ut- div(g(x,t,|∇ u|)\,∇ u|∇ u|)=0, under the generalized non-logarithmic Zhikov's condition g(x,t, v/r)≤slant c(K)\,g(y,τ, v/r), (x,t), (y,τ)∈ Qr,r(x0,t0), 0< v≤slant Kλ(r), r→0λ(r)=0, r→0 λ(r)r=+∞, ∫0 λ(r)\,drr=+∞. In particular, our results cover new cases of double-phase parabolic equations.