Positive 2-bridge knots and chirally cosmetic surgeries

Abstract

In this paper we verify that with the exception of the (2, 2n+1) torus knots, positive 2-bridge knots up to 31 crossings do not admit chirally cosmetic surgeries. A knot K admits chirally cosmetic surgeries if there exist surgeries S3r and S3r' with distinct slopes r and r' such that S3r(K) -S3r'(K), where the negative represents an orientation reversal. To verify this, we use the obstruction formula from arXiv:2112.03144 which relates classical knot invariants to the existence of chirally cosmetic surgeries. To check the formula, we develop a Python program that computes the classical knot invariants a2, a4, v3, , and g of a positive 2-bridge knot.