Closed Formulas for η-Corrections in the Once Punctured Torus

Abstract

We study η-correction terms in the Kauffman bracket skein algebra of the once-punctured torus Kt(Σ1,1). While the Frohman--Gelca product-to-sum rule gives an explicit multiplication formula on the closed torus, the once-punctured torus introduces correction terms in the ideal (η). We give a closed formula for the Chebyshev-threaded family generated by the primitive determinant-two pair \[ Pn=Tn((1,2))·(1,0). \] The correction εn has an explicit Chebyshev expansion whose coefficients factor as geometric sums in t4 and whose terms are governed by a parity pattern arising from the Chebyshev recurrence. We also treat a primitive maximal-thread regime, in which one Frohman--Gelca summand is fully threaded and the other is simple or doubly covered. In this case the discrepancy is an explicit η-linear cascade with Chebyshev S-coefficients, lowering the thread degree by two at each step. These formulas recover the relevant low-determinant behavior and give compact closed multiplication rules for structured threaded families in Kt(Σ1,1).