Joint spectral multipliers for mixed systems of operators

Abstract

We obtain a general Marcinkiewicz-type multiplier theorem for mixed systems of strongly commuting operators L=(L1,...,Ld); where some of the operators in L have only a holomorphic functional calculus, while others have additionally a Marcinkiewicz-type functional calculus. Moreover, we prove that specific Laplace transform type multipliers of the pair (L,A) are of certain weak type (1,1). Here L is the Ornstein-Uhlenbeck operator while A is a non-negative operator having Gaussian bounds for its heat kernel. Our results include the Riesz transforms A(L+A)-1 and L(L+A)-1.