Atoms of Compacta on Closed Surfaces

Abstract

For any compact set K lying on a closed surface S we introduce a closed equivalence relation , called the Sch\"onflies equivalence on K. We show that every class [x] of is a continuum and that the resulting quotient space K\!/\! is a Peano compactum. By definition, all components of a Peano compactum are locally connected and for any >0 only finitely many of them have diameter greater than . The decomposition DK=\[x]: x∈ K\ refines every other upper semicontinuous decomposition of K into subcontinua that has a Peano compactum as its quotient space. In other words, DK is the core decomposition of K with Peano quotient. The elements of DK are called atoms of K. We also show that for any branched covering f: S*→ S from a closed surface S* to S, every atom of f-1(K) is sent into an atom of K. If f is even a covering, it sends every atom of f-1(K) onto an atom of K. We illustrate our theory with examples and show that it cannot be generalized to n-manifolds with n 3 by providing a detailed counterexample in~R3.

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