English

Form Inequalities for Symmetric Contraction Semigroups

Functional Analysis 2015-09-01 v2 Probability Spectral Theory

Abstract

Consider --- for the generator A{-}A of a symmetric contraction semigroup over some measure space X\mathrm{X}, 1p<1\le p < \infty, qq the dual exponent and given measurable functions Fj,Gj:CdCF_j,\: G_j : \mathbb{C}^d \to \mathbb{C} --- the statement: Rej=1mXAFj(f)Gj(f)0 \mathrm{Re}\, \sum_{j=1}^m \int_{\mathrm{X}} A F_j(\mathbf{f}) \cdot G_j(\mathbf{f}) \,\,\ge \,\,0 {\em for all Cd\mathbb{C}^d-valued measurable functions f\mathbf{f} on X\mathrm{X} such that Fj(f)dom(Ap)F_j(\mathbf{f}) \in \mathrm{dom}(A_p) and Gj(f)Lq(X)G_j(\mathbf{f}) \in \mathrm{L}^q(\mathrm{X}) for all jj.} It is shown that this statement is valid in general if it is valid for X\mathrm{X} being a two-point Bernoulli (12,12)(\frac{1}{2}, \frac{1}{2})-space and AA being of a special form. As a consequence we obtain a new proof for the optimal angle of Lp\mathrm{L}^{p}-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)\mathrm{C}(K)-spaces. One focus of the paper lies on presenting these auxiliary techniques and results in great detail.

Keywords

Cite

@article{arxiv.1503.02895,
  title  = {Form Inequalities for Symmetric Contraction Semigroups},
  author = {Markus Haase},
  journal= {arXiv preprint arXiv:1503.02895},
  year   = {2015}
}

Comments

29 pages; submitted to: Proceedings of the IWOTA, Amsterdam, July 2014. For this updated version, the term "complete contraction" has been exchanged for "absolute contraction" in order to avoid confusion with terminology used in operator space theory. Some small misprints and errors have been corrected, and a reference has been added. The proof of Theorem 4.11 was incomplete and has been amended

R2 v1 2026-06-22T08:48:43.631Z