Symmetrization of functions in Sobolev spaces and the isoperimetric inequality

## Abstract We investigate the spaces of functions on ℝ^__n__^ for which the generalized partial derivatives __D____~k~f__ exist and belong to different Lorentz spaces __L__ . For the functions in these spaces, the sharp estimates of the Besov type norms are found. The methods used in the paper are

Function spaces of Hardy Sobolev Besov type on symmetric spaces of noncompact type and unimodular Lie groups are investigated. The spaces were originally defined by uniform localization. In the paper we give a characterization of the space F s p, q (X ) and B s p, q (X ) in terms of heat and Poisson

## Abstract Let __D__⊂ℝ^3^ be a bounded domain with connected boundary __δD__ of class __C__^2^. It is shown that Herglotz wave functions are dense in the space of solutions to the Helmholtz equation with respect to the norm in __H__^1^(__D__) and that the electric fields of electromagnetic Herglot