Appell Type Transformation for the Kolmogorov Operator

In a curvilinear coordinate system with metric tensor G, the Laplace-Beltrami operator V 2 expresses the Laplacian in terms of partial derivatives with respect to the coordinates. This paper describes a simplifying transformation, useful in curvilinear coordinate systems with a nondiagonal G, where

Let T ∈ B(H) be an invertible operator with polar decomposition T = UP and B ∈ B(H) commute with T . In this paper we prove that |||P λ BUP 1-λ ||| |||BT |||, where ||| • ||| is a weakly unitarily invariant norm on B(H) and 0 λ 1. As the consequence of this result, we have |||f (P λ UP 1-λ )||| |||f

In this paper, we derive a Liouville type theorem on a complete Riemannian manifold without boundary and with nonnegative Ricci curvature for the equation \(\Delta u(x)+h(x) u(x)=0\), where the conditions \(\lim _{r \rightarrow x} r^{-1} \cdot \sup _{x \in B_{p}(r)}|\nabla h(x)|=0\) and \(h \geqslan