Index Function and Minimal Cycles

Abstract

Let P be a closed triangulated manifold, dim P=n. We consider the group of simplicial 1-chains C1(P) and the homology group H1(P). We also use some nonnegative weighting function L on C1(P). For any homological class from H1(P) method proposed in article builds a cycle z with minimal weight L(z). The main idea is in using a simplicial scheme of space of the regular covering with automorphism group H1(P). We construct this covering applying index function relative to any basis of group Hn-1(P).

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