The Localized Skein Algebra is Frobenius

Abstract

When A in the Kauffman bracket skein relation is a primitive 2Nth root of unity, where N≥ 3 is odd, the Kauffman bracket skein algebra KN(F) of a finite type surface F is a ring extension of the SL2C-characters (F) of the fundamental group of F. We localize by inverting the nonzero characters to get an algebra S-1KN(F) over the function field of the character variety. We prove that if F is noncompact, the algebra S-1KN(F) is a symmetric Frobenius algebra. Along the way we prove K(F) is finitely generated, KN(F) is a finite rank module over (F), and the simple closed curves that make up any simple diagram on F generate a finite field extension of S-1(F) inside S-1KN(F).