EUDML

We give a new proof, based on analytic semigroup methods, of a maximal regularity result concerning the classical Cauchy-Dirichlet's boundary value problem for second order parabolic equations. More specifically, we find necessary and sufficient conditions on the data in order to have a strict solution $u$ which is bounded with values in $C^{2 + θ} (\bar{Ω})$ (0 < < 1), with $\partial_{t} u$ bounded with values in $C^{θ} (\bar{Ω})$ .

Complex interpolation for $2^{N}$ Banach spaces

Giovanni Dore; Davide Guidetti; Alberto Venni — 1986

Rendiconti del Seminario Matematico della Università di Padova

On real interpolation, finite differences, and estimates depending on a parameter for discretizations of elliptic boundary value problems.

Guidetti, Davide; Piskarev, Sergei — 2003

Abstract and Applied Analysis

Page 1

Download Results (CSV)

Advanced Search

Formula preview

Currently displaying 1 – 8 of 8

On interpolation with boundary conditions.

Linear Singular Parabolic Equations in Banach Spaces.

A maximal regularity result with applications to parabolic problems with nonhomogeneous boundary conditions

Volterra integrodifferential equations of parabolic type of higher order in time in $L^{p}$ spaces

Optimal regularity for mixed parabolic problems in spaces of functions which are Hölder continuous with respect to space variables

The parabolic mixed Cauchy-Dirichlet problem in spaces of functions which are hölder continuous with respect to space variables

Complex interpolation for $2^{N}$ Banach spaces

On real interpolation, finite differences, and estimates depending on a parameter for discretizations of elliptic boundary value problems.