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Elementary proofs of some basic subtemperature theorems

Neil A. Watson — 2002

Colloquium Mathematicae

We present simple elementary proofs of several theorems about temperatures and subtemperatures. Most of these are concerned with mean values over heat spheres, heat balls, and modified heat balls, with applications to proving Harnack theorems and the monotone approximation of subtemperatures by smooth subtemperatures.

Inequalities involving heat potentials and Green functions

Neil A. Watson — 2015

Mathematica Bohemica

We take some well-known inequalities for Green functions relative to Laplace’s equation, and prove not only analogues of them relative to the heat equation, but generalizations of those analogues to the heat potentials of nonnegative measures on an arbitrary open set E whose supports are compact polar subsets of E . We then use the special case where the measure associated to the potential has point support, in the following situation. Given a nonnegative supertemperature on an open set E , we prove...

A Nevanlinna theorem for superharmonic functions on Dirichlet regular Greenian sets

Neil A. Watson — 2005

Mathematica Bohemica

A generalization of Nevanlinna’s First Fundamental Theorem to superharmonic functions on Green balls is proved. This enables us to generalize many other theorems, on the behaviour of mean values of superharmonic functions over Green spheres, on the Hausdorff measures of certain sets, on the Riesz measures of superharmonic functions, and on differences of positive superharmonic functions.

Mean values and associated measures of δ -subharmonic functions

Neil A. Watson — 2002

Mathematica Bohemica

Let u be a δ -subharmonic function with associated measure μ , and let v be a superharmonic function with associated measure ν , on an open set E . For any closed ball B ( x , r ) , of centre x and radius r , contained in E , let ( u , x , r ) denote the mean value of u over the surface of the ball. We prove that the upper and lower limits as s , t 0 with 0 < s < t of the quotient ( ( u , x , s ) - ( u , x , t ) ) / ( ( v , x , s ) - ( v , x , t ) ) , lie between the upper and lower limits as r 0 + of the quotient μ ( B ( x , r ) ) / ν ( B ( x , r ) ) . This enables us to use some well-known measure-theoretic results to prove new variants and generalizations...

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