Measures of Dirichlet type on regular polygons and their moments

The eigenvalue problem is considered for the Laplacian on regular polygons, with either Dirichlet or Neumann boundary conditions, which will be related to the unit circle by a conformal mapping. The polygonal problem is then equivalent to a weighted eigenvalue problem on the circle with the same bou

In the following pages, based on the linear functional over a Banach space E and on the definition of fractional integrals of real-valued functions, we define the fractional Pettisintegrals of E-valued functions and the corresponding fractional derivatives. Also, we show that the well-known properti

Let G be the adjoint group of a real semi-simple Lie algebra g and let K be a maximal compact subgroup of G. K C , the complexification of K, acts on p\* C , the complexified cotangent space of GÂK at eK. If O is a nilpotent K C orbit in p\* C , we study the asymptotic behavior of the multiplicities