Integral Representation of Invariant Functionals

Semiclassical linear functionals are characterized by the distributional equation D(,L)+ L=0 where , and are arbitrary polynomials with the condition deg( ) 1. Two cases are considered: (A) deg(,)>deg( ) (B) deg(,) deg( ). In an earlier work by the authors (J. Comput. Appl. Math. 57 (1995), 239 249

Let W be a Weyl group and let V be the natural ‫ރ‬W-module, i.e., the reflection representation. For a complex irreducible character of W, we consider the invariant Ý wgW Ž . introduced by N. Kawanaka. We determine I ; q explicitly. Looking over these Ž . results, we observe a relation between Kawa

Invariants of approximate transformation groups are studied. It turns out that the infinitesimal criterion for them is similar to that of Lie's theory. Namely, the problem of invariants of approximate groups reduces to solving first-order partial differential equations with a small parameter. The pr

Motivated by the theories of Hecke algebras and Schur algebras, we consider in this paper the algebra ‫ރ‬ M G of G-invariants of a finite monoid M with unit group G. If M is a regular ''balanced'' monoid, we show that ‫ރ‬ M G is a quasi-hereditary algebra. In such a case, we find the blocks of ‫ރ‬ M