End point gradient estimates for quasilinear parabolic equations with variable exponent growth on nonsmooth domains

Abstract: In this paper, we study quasilinear parabolic equations with the nonlinearity structure modeled after the p(x, t)-Laplacian on nonsmooth domains. The main goal is to obtain end point Calderón-Zygmund type estimates in the variable exponent setting. In a recent work [15], the estimates obtained were strictly above the natural exponent p(x, t) and hence there was a gap between the natural energy estimates and the estimates above p(x, t) (see (1.3) and (1.2)). Here, we bridge this gap to obtain the end point case… Show more

“…The right hand side of Theorem 3.3 has ¨Q(ρ,θ) v p+ε dz which holds for any ε ∈ (0, 1). It is well known from higher integrability results proved first in [10] (see [2,Theorem 6.1] where a unified proof without having to differentiate the singular and degenerate regimes was given based on the ideas from [1])…”

Unified approach to $C^{1,α}$ regularity for quasilinear parabolic equations

“…The right hand side of Theorem 3.3 has ¨Q(ρ,θ) v p+ε dz which holds for any ε ∈ (0, 1). It is well known from higher integrability results proved first in [10] (see [2,Theorem 6.1] where a unified proof without having to differentiate the singular and degenerate regimes was given based on the ideas from [1])…”

Unified approach to $C^{1,α}$ regularity for quasilinear parabolic equations