2-torsion in the grope and solvable filtrations of knots

Abstract

We study knots of order 2 in the grope filtration \h\ and the solvable filtration \h\ of the knot concordance group. We show that, for any integer n4, there are knots generating a 2∞ subgroup of n/n.5. Considering the solvable filtration, our knots generate a 2∞ subgroup of n/n.5 (n2) distinct from the subgroup generated by the previously known 2-torsion knots of Cochran, Harvey, and Leidy. We also present a result on the 2-torsion part in the Cochran, Harvey, and Leidy's primary decomposition of the solvable filtration.