On skein algebras of planar surfaces

Abstract

Let R be a commutative ring with identity and a fixed invertible element q12. Let Sn denote the Kauffman bracket skein algebra of the n-holed disk 0,n+1 over R. When q+q-1 is invertible, in 2000 Przytycki and Sikora found a set of n+n 2+n 3 generators for Sn; we show that the ideal of defining relations among these generators is generated by relations of degree 6 supported by certain subsurfaces diffeomorphic to 0,k+1 with k 6. When q+q-1 is not invertible, a set of 2n-1 generators for Sn was known to Bullock in 1999; we show that the ideal of defining relations is generated by relations of degree 2k+2 supported by certain subsurfaces diffeomorphic to 0,k+1 with k n. These results are substantial progresses towards answering Problem 1.92 (J) in the Kirby's list.