Abstract
AbstractWe define Hölder classes$$\Lambda _\alpha $$Λαassociated with a Markovian semigroup and prove that, when the semigroup satisfies the$$\Gamma ^2 \ge 0$$Γ2≥0condition, the Riesz transforms are bounded between the Hölder classes. As a consequence, this bound holds in manifolds with nonnegative Ricci curvature. We also show, without the need for extra assumptions on the semigroup, that a version of the Morrey inequalities is equivalent to the ultracontractivity property. This result extends the semigroup approach to the Sobolev inequalities laid by Varopoulos. After that, we study certain families of operators between the homogeneous Hölder classes. One of these families is given by analytic spectral multipliers and includes the imaginary powers of the generator, the other, by smooth multipliers analogous to those in the Marcienkiewicz theorem. Lastly, we explore the connection between the Hölder norm and Campanato’s formula for semigroups.
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