Combinatorics and invariant differential operators on multiplicity free spaces

## In troduc tiori Let ( M , g) be a pseudo-RIEMANNian C" manifold of dimension n ( n z 4 ) and D(g) a polynomial conformally invariant linear differential operator, i.e. a linear operator with the following properties: (i) D(g) acts on a C" tensor field 5 of any type which is defined in an open

We consider the two-body problem with central interaction on two-point homogeneous spaces from the point of view of the invariant differential operators theory. The representation of the two-particle Hamiltonian in terms of the radial differential operator and invariant operators on the symmetry gro

Invariant subspaces and eigenfunctions of regular Hecke operators acting on spaces spanned by products of even number of Igusa theta constants with rational characteristics are constructed. For some of the eigenfunctions of genuses g = 1 and g = 2, corresponding zeta functions of Hecke and Andrianov

In this paper, we mainly deal with two problems in integral geometry, the range characterizations and construction of inversion formulas for Radon transforms on higher rank Grassmann manifolds. The results will be described explicitly in terms of invariant differential operators. We will also study