Peter--Weyl Iwahori algebras

Abstract

The Peter-Weyl idempotent eP of a parahoric subgroup P is the sum of the idempotents of irreducible representations of P which have a nonzero Iwahori fixed vector. The convolution algebra associated to eP is called a Peter-Weyl Iwahori algebra. We show any Peter-Weyl Iwahori algebra is Morita equivalent to the Iwahori-Hecke algebra. Both the Iwahori-Hecke algebra and a Peter-Weyl Iwahori algbera have a natural C-algebra structure, and the Morita equivalence preserves irreducible hermitian and unitary modules. Both algebras have another anti-involution denoted as , and the Morita equivalence preserves irreducible and unitary modules for the -involution.