Parabolic maximal functions and potentials of distributions in Hp

The results of R. H. Latter on atomic decomposition are extended to distributions in parabolic HP spaces with diagonalizable dilation groups. The method employed uses a decomposition of the function F(x, t) = f \* qr associated with the distribution f, which also yields real and complex interpolati

Analytical solutions are presented for two kinds of problem in the convection of heat by a fluid. The llrat problem is tbat of the unifom and constant generation of heat wltbin the fluid ; the second is that of temperature equalization when the inlet temperature has one

A и g C 0, T , L L D A 0 , X and construct the corresponding evolution family on the underlying Banach space X. Our proofs are based on the operator sum method and the use of evolution semigroups. The results are applied to parabolic partial differential equations with continuous coefficients.

## Abstract **Summary:** An explicit expression is derived for the distribution function of end‐to‐end vectors for a flexible self‐avoiding chain. Based on this relation, analytical formulas are developed for the free and internal energies of a chain with excluded‐volume interactions. Force–stretch