Counting the ideals of given codimension of the algebra of Laurent polynomials in two variables
Abstract
We establish an explicit formula for the number Cn(q) of ideals of codimension n of the algebra Fq[x,y,x-1, y-1] of Laurent polynomials in two variables over a finite field of cardinality q. This number is a palindromic polynomial of degree 2n in q. Moreover, Cn(q) = (q-1)2 Pn(q), where Pn(q) is another palindromic polynomial; the latter is a q-analogue of the sum of divisors of n, which happens to be the number of subgroups of Z2 of index n.
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