Special alternating links of minimal unlinking number

Abstract

For any link in the 3-sphere, there is a natural lower bound for the unlinking number in terms of the classical signature. We prove that if this lower bound is sharp for a special alternating link L, then the unlinking number of L is necessarily realized by crossing changes in any alternating diagram for L. As an application, we compute new values of the unknotting numbers for some special alternating knots with crossing number 11 and 12.

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