Discrete maximal regularity of time-stepping schemes for fractional evolution equations

Abstract

In this work, we establish the maximal p-regularity for several time stepping schemes for a fractional evolution model, which involves a fractional derivative of order α∈(0,2), α≠ 1, in time. These schemes include convolution quadratures generated by backward Euler method and second-order backward difference formula, the L1 scheme, explicit Euler method and a fractional variant of the Crank-Nicolson method. The main tools for the analysis include operator-valued Fourier multiplier theorem due to Weis [48] and its discrete analogue due to Blunck [10]. These results generalize the corresponding results for parabolic problems.