A conjecture on the action of Hecke operators
Abstract
Let F be a local non-archimedian field, L be a central division F-algebra of rank n and An(L) be the convolution algebra of smooth compactly supported Ad-invariant complex-valued measures on L*. It is known that for different division F-algebras L of rank n the algebras An(L) are canonically isomorphic. In this paper I propose a conjecture extending these isomorphisms to the algebras generated by Hecke operators on spaces of 1/2-measures on the stacks of L*-bundles on smooth complete curves over F.
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