Computing the q-Multiplicity of the Positive Roots of slr+1(C) and Products of Fibonacci Numbers
Abstract
Using Kostant's weight multiplicity formula, we describe and enumerate the terms contributing a nonzero value to the multiplicity of a positive root μ in the adjoint representation of slr+1(C), which we denote L(α), where α is the highest root of slr+1(C). We prove that the number of terms contributing a nonzero value in the multiplicity of the positive root μ=αi+αi+1+·s+αj with 1≤ i≤ j≤ r in L(α) is given by the product Fi· Fr-j+1, where Fn is the nth Fibonacci number. Using this result, we show that the q-multiplicity of the positive root μ=αi+αi+1+·s+αj with 1≤ i≤ j≤ r in the representation L(α) is precisely qr-h(μ), where h(μ)=j-i+1 is the height of the positive root μ. Setting q=1 recovers the known result that the multiplicity of a positive root in the adjoint representation of slr+1(C) is one.
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