Maximal regularity of multistep fully discrete finite element methods for parabolic equations

Abstract

This article extends the semidiscrete maximal Lp-regularity results in [27] to multistep fully discrete finite element methods for parabolic equations with more general diffusion coefficients in W1,d+β, where d is the dimension of space and β>0. The maximal angles of R-boundedness are characterized for the analytic semigroup ezAh and the resolvent operator z(z-Ah)-1, respectively, associated to an elliptic finite element operator Ah. Maximal Lp-regularity, optimal p(Lq) error estimate, and p(W1,q) estimate are established for fully discrete finite element methods with multistep backward differentiation formula.