Stability in the category of smooth mod-p representations of SL2(Qp)

Abstract

Let p ≥ 5 be a prime number and let G = SL2(Qp). Let = Spec(Z) denote the spectrum of the centre Z of the pro-p Iwahori Hecke algebra of G with coefficients in a field k of characteristic p. Let R ⊂ × denote the support of the pro-p Iwahori Ext-algebra of G, viewed as a (Z,Z)-bimodule. We show that the locally ringed space /R is a projective algebraic curve over Spec(k) with two connected components, and that each connected component is a chain of projective lines. For each Zariski open subset U of /R, we construct a stable localising subcategory LU of the category of smooth k-linear representations of G.