Form Inequalities for Symmetric Contraction Semigroups

Abstract

Consider --- for the generator \(-A\) of a symmetric contraction semigroup over some measure space X, 1 p < ∞, q the dual exponent and given measurable functions Fj,\: Gj : Cd C --- the statement: Re\, Σj=1m ∫X A Fj(f) · Gj(f) \,\, \,\,0 for all Cd-valued measurable functions f on X such that Fj(f) ∈ dom(Ap) and Gj(f) ∈ Lq(X) for all j. It is shown that this statement is valid in general if it is valid for X being a two-point Bernoulli (12, 12)-space and A being of a special form. As a consequence we obtain a new proof for the optimal angle of Lp-analyticity for such semigroups, which is essentially the same as in the well-known sub-Markovian case. The proof of the main theorem is a combination of well-known reduction techniques and some representation results about operators on C(K)-spaces. One focus of the paper lies on presenting these auxiliary techniques and results in great detail.