Delta-Unknotting Number for Pretzel Knots

Abstract

The Δ-unknotting number for a knot is defined as the minimum number of Δ-moves needed to deform the knot into the trivial knot. It is known that, for positive pretzel knots, the Δ-unknotting number coincides with the second coefficient of their Conway polynomial. In this paper, we compute the Δ-unknotting number for positive pretzel knots. As a consequence of the above result, among positive pretzel knots of odd type with a fixed crossing number n, where n is odd, the Δ-unknotting number is maximized by P(1, 1, ... , 1) ( T(2,n) ), and the maximum value is 18(n2 - 1). We also obtain a similar result for torus knots. We further determine the Δ-unknotting number for pretzel knots of type P(-1, p2, ..., pn), where pi is a positive odd integer for 2 ≤ i ≤ n and n is odd.