On the definition of stable transfer factors

TL;DR

This paper constructs stable transfer factors for reductive groups, linking geometric and spectral transfer, and explores their properties under the local Langlands correspondence, including archimedean cases.

Contribution

It introduces a new definition of stable geometric transfer factors and demonstrates their role in establishing stable transfer conjectures and spectral transfer.

Findings

Stable geometric transfer factors are constructed for general reductive groups.

Stable transfer conjecture for orbital integrals implies transfer of characters.

The work includes establishing archimedean stable geometric transfer.

Abstract

We construct stable geometric and spectral transfer factors for a general reductive group and develop some of their basic properties, assuming the refined local Langlands correspondence. Using our definition of stable geometric transfer factors, we show that the stable transfer conjecture for orbital integrals implies the stable transfer of characters and vice versa. The latter is also implied by local Langlands, and in particular this establishes archimedean stable geometric transfer. Finally, we show how the stable geometric transfer factors can be used to define stable spectral transfer factors.