Minimal Tori in S3

Abstract

We prove existence results that give information about the space of minimal immersions of 2-tori into S 3 . More specifically, we show that enumerate For every positive integer n , there are countably many real n -dimensional families of minimally immersed 2-tori in S 3 . Every linearly full minimal immersion T 2 S 3 belongs to exactly one of these families. Let A be the space of rectangular 2-tori. There is a countable dense subset B of A such that every torus in B can be minimally immersed into S 3 . enumerate The main content of this manuscript lies in finding minimal immersions that satisfy periodicity conditions and hence obtaining maps of tori, rather than simply immersions of the plane. We make use of a correspondence, established by Hitchin, between minimal tori in S3 and algebraic curve data.

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