Explicit positive type-uniform formula for all equivariant structure constants of Peterson Schubert calculus derived using only the Cartan matrix, solving the Harada-Tymoczko open problem for arbitrary Lie types and yielding a formula for mixed Φ-Eulerian numbers.
On the characteristic polynomial of Cartan matrices and Chebyshev polynomials
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abstract
We explore some interesting features of the characteristic polynomial of the Cartan matrix of a simple Lie algebra. The characteristic polynomial is closely related with the Chebyshev polynomials of first and second kind. In addition, we give explicit formulas for the characteristic polynomial of the Coxeter adjacency matrix, we compute the associated polynomials and use them to derive the Coxeter polynomial of the underlying graph. We determine the expression of the Coxeter and associated polynomials as a product of cyclotomic factors. We use this data to propose an algorithm for factoring Chebyshev polynomials over the integers. Finally, we prove an interesting formula which involves products of sines, the exponents, the Coxeter number and the determinant of the Cartan matrix.
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Structure constants of Peterson Schubert calculus
Explicit positive type-uniform formula for all equivariant structure constants of Peterson Schubert calculus derived using only the Cartan matrix, solving the Harada-Tymoczko open problem for arbitrary Lie types and yielding a formula for mixed Φ-Eulerian numbers.