Bounds for SL2-indecomposables in tensor powers of the natural representation in characteristic 2

Abstract

Let K be an algebraically closed field of characteristic 2, G be the algebraic group SL2 over K, and V be the natural representation of G. Let bkG,V denote the number of G-indecomposable factors of V k, counted with multiplicity, and let δ = 32 - 32 2. Then there exists a smooth multiplicatively periodic function ω(x) such that b2kG,V = b2k+1G,V is asymptotic to ω(k) k-δ4k. We also prove a lower bound of the form cW k-δ( W)k for bkG,W for any tilting representation W of G.

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