On the kernel of the surgery map restricted to the 1-loop part

Abstract

Every homology cylinder is obtained from Jacobi diagrams by clasper surgery. The surgery map s Anc YnICg,1/Yn+1 is surjective for n ≥ 2, and its kernel is closely related to the symmetry of Jacobi diagrams. We determine the kernel of s restricted to the 1-loop part after taking a certain quotient of the target. Also, we introduce refined versions of the AS and STU relations among claspers and study the abelian group YnICg,1/Yn+2 for n ≥ 2.