Lucas atoms

Abstract

Given two variables s and t, the associated sequence of Lucas polynomials is defined inductively by \0\=0, \1\=1, and \n\=s\n-1\+t\n-2\ for n2. An integer (e.g., a Catalan number) defined by an expression of the form Πi ni/Πj kj has a Lucas analogue obtained by replacing each factor with the corresponding Lucas polynomial. There has been interest in deciding when such expressions, which are a priori only rational functions, are actually polynomials in s,t. The approaches so far have been combinatorial. We introduce a powerful algebraic method for answering this question by factoring \n\=Πd|n Pd(s,t), where we call the polynomials Pd(s,t) Lucas atoms. This permits us to show that the Lucas analogues of the Fuss-Catalan and Fuss-Narayana numbers for all irreducible Coxeter groups are polynomials in s,t. Using gamma expansions, a technique which has recently become popular in combinatorics and geometry, one can show that the Lucas atoms have a close relationship with cyclotomic polynomials d(q). Certain results about the d(q) can then be lifted to Lucas atoms. In particular, one can prove analogues of theorems of Gauss and Lucas, deduce reduction formulas, and evaluate the Pd(s,t) at various specific values of the variables.