A CLT Plancherel representations of the infinite-dimensional unitary group

The proofs are obtained in the equivalent setting of isometries of Lobachevsky spaces and use kernels of hyperbolic type, in analogy with the classical concepts of kernels of

In this context, we say that ρ is modular if it is isomorphic to the p-adic Galois representation ρΠ attached to a cuspidal automorphic Galois representation Π of GL2 AF which

Milicic description of the topology of the dual spaces of C*-algebras with bounded trace in [18] gives that irreducible subquotients of ends of complementary series of a reductive

For instance, by what we saw above, the left (or right) regular representation of a connected solvable Lie group always has this property. Our results imply, that an « overwhelming

we get unitarity at any point on such a diagonal whenever the horizontal and vertical coordinates correspond to unitary points in subgroups that are essentially

proved in Section 2, where it is also shown that the slice property of infinite dimensional group action implies the countability of the set of orbit types.. Thus

Every irreducible representation of the Virasoro algebra with finite-dimensional weight spaces is either highest or lowest weight, or has all.. its weight spaces of

Let M be a connected, smooth, orientable, paracompact, n dimensional manifold. But that paper is severely flawed.. volume and non-compact seem to be enough) for