Representations of SL2(F)

Abstract

Let p be a prime number, F a non-archimedean local field with residue characteristic p, and R an algebraically closed field of characteristic different from p. We thoroughly investigate the irreducible smooth R-representations of SL2(F). The components of an irreducible smooth R-representation of GL2(F) restricted to SL2(F) form an L-packet L(). We use the classification of such to determine the cardinality of L(), which is 1,2 or 4. When p=2 we have to use the Langlands correspondence for GL2(F). When is a prime number distinct from p and R= Qac, we establish the behaviour of an integral L-packet under reduction modulo . We prove a Langlands correspondence for SL2(F), and even an enhanced one when the characteristic of R is not 2. Finally, pursuing a theme of HV23, which studied the case of inner forms of GLn(F), we show that near identity an irreducible smooth R-representation of SL2(F) is, up to a finite dimensional representation, isomorphic to a sum of 1,2 or 4 representations in an L-packet of size 4 (when p is odd there is only one such L-packet).

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