C0-semigroups of m-isometries on Hilbert spaces

Abstract

Let \T(t)\t 0 be a C0-semigroup on a separable Hilbert space H. We characterize that T(t) is an m-isometry for every t in terms that the mapping t∈ R+ → \|T(t)x\|2 is a polynomial of degree less than m for each x∈ H. This fact is used to study m-isometric right translation semigroup on weighted Lp-spaces. We characterize the above property in terms of conditions on the infinitesimal generator operator or in terms of the cogenerator operator of \ T(t)\t≥ 0. Moreover, we prove that a non-unitary 2-isometry on a Hilbert space satisfying the kernel condition, that is, T*T(KerT*)⊂ KerT*\;, then T can be embedded into a C0-semigroup if and only if dim (KerT*)=∞.