Cuspidal edges with the same first fundamental forms along a knot

Abstract

Letting C be a compact Cω-curve embedded in R3 (Cω means real analyticity), we consider a Cω-cuspidal edge f along C. When C is non-closed, in the authors' previous works, the local existence of three distinct cuspidal edges along C whose first fundamental forms coincide with that of f was shown, under a certain reasonable assumption on f. In this paper, if C is closed, that is, C is a knot, we show that there exist infinitely many cuspidal edges along C having the same first fundamental form as that of f such that their images are non-congruent to each other, in general.