Genus, Fiberedness, τ and ε of Satellite Knots with n-Twisted Generalized Mazur patterns

Abstract

We study a family of (1,1)-pattern knots that generalize the Mazur pattern, and compute the concordance invariants τ and ε of n-twisted satellites formed from these patterns. We show that none of the n-twisted patterns from this family act surjectively on the smooth or rational concordance group. We also determine when the n-twisted generalized Mazur patterns are fibered in the solid torus, compute their genus in S1 × D2, and show that n-twisted satellites with generalized Mazur patterns and non-trivial companions are not Floer thin.

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