Growth of root multiplicities along imaginary root strings in Kac--Moody algebras

Abstract

Let g be a symmetrizable Kac--Moody algebra. Given a root α and a real root β of g, it is known that the β-string through α, denoted Rα(β), is finite. Given an imaginary root β, we show that Rα(β)=\β\ or Rα(β) is infinite. If (β,β)<0, we also show that the multiplicity of the root α+nβ grows at least exponentially as n∞. If (β,β)=(α, β) = 0, we show that Rα(β) is bi-infinite and the multiplicities of α+nβ are bounded. If (β,β)=0 and (α, β) ≠ 0, we show that Rα(β) is semi-infinite and the muliplicity of α+nβ or α-nβ grows faster than every polynomial as n∞. We also prove that gα+β ≥ gα + gβ -1 whenever α ≠ β with (α, β)<0.