Crosscap number and epimorphisms of two-bridge knot groups

Abstract

We consider the relationship between the crosscap number γ of knots and a partial order on the set of all prime knots, which is defined as follows. For two knots K and J, we say K ≥ J if there exists an epimorphism f:π1(S3-K) π1(S3-J). We prove that if K and J are 2-bridge knots and K> J, then γ(K) ≥ 3γ(J) -4. We also classify all pairs (K,J) for which the inequality is sharp. A similar result relating the genera of two knots has been proven by Suzuki and Tran. Namely, if K and J are 2-bridge knots and K >J, then g(K) ≥ 3 g(J)-1, where g(K) denotes the genus of the knot K.