The determination of the potential of a heterogeneous sphere upon itself, with an extension of Helmholtz's theory of the heat of the sun

We study the well-posedness and describe the asymptotic behavior of solutions of the heat equation with inverse-square potentials for the Cauchy Dirichlet problem in a bounded domain and also for the Cauchy problem in R N . In the case of the bounded domain we use an improved form of the so-called H

## Abstract A pseudocyst of the pancreas with mediastinal extension was demonstrated by ultrasound as a cystic structure dissecting between the aorta and inferior vena cava.

## Abstract This paper explores the potential for documenting regional fields of surface energy fluxes over the Tibetan plateau using published algorithms and previously calibrated empirical formulae with data from NOAA‐14 AVHRR and atmospheric data collected during the GAME‐Tibet field experiment.

## Abstract Let 1 ≤ __p__ < ∞ and let __T__ be an ergodic measure‐preserving transformation of the finite measure space (__X__, __μ__). The classical __L^p^__ ergodic theorem of von Neumann asserts that for any __f__ ϵ __L^p^__ (__X__, __μ__), equation image When __X__ = 𝕊^__n__^ (the unit spher