The conjugation representation of GL2 and SL2 over finite local rings
Abstract
The conjugation representation of a finite group G is the complex permutation module defined by the action of G on itself by conjugation. Addressing a problem raised by Hain motivated by the study of a Hecke action on iterated Shimura integrals, Tiep proved that for G=SL2(Z/pr), where r≥1 and p≥5 is a prime, any irreducible representation of G that is trivial on the centre of G is contained in the conjugation representation. Moreover, Tiep asked whether this can be generalised to p=2 or 3. We answer the Hain--Tiep question in the affirmative and also prove analogous statements for SL2 and GL2 over any finite local principal ideal ring with residue field of odd characteristic.
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