One-dimensional representation, inversion, and certain properties of the Riesz potentials of radial functions

## Computersenerated thermophysxal properties from an amsotrop~c potential energy function were inverted to obtain effectne potent& of spherrcal symmetry. These were very simdar when obtained from both transport properties and gas imperfectron data Thus suggests that it may be possiile to define e

Influence of the thermal annealing atmosphere and the ZnO layer thickness on the photoluminescence properties of ZnS-core/ZnO-shell one-dimensional (1D) radial heterostructures was investigated. ZnS nanowires were synthesized by thermal evaporation of ZnS powders and then coated with ZnO by using th

We first generalize the results in Tan and Zhou (2005) [2] that a Lauricella function variables can be written as a finite sum of rational functions and logarithm functions of one variable, for a, b 1 , . . . , b n , c positive integers with c ≥ a + 1, and for distinct x 1 , . . . , x n , to all x

In this study we define the continuous height function to investigate the approximation of an interface line and its geometrical properties with the height function method. We show that in each mixed cell the piecewise linear interface reconstruction and the approximation of the derivatives and curv