The asphericity of locally finite infinite configuration spaces and Weierstrass entire coverings

Abstract

Let Conflf∞() and Clf∞() denote the locally finite infinite ordered and unordered configuration spaces of the complex plane. We prove that both Conflf∞() and Clf∞() are aspherical. We further obtain a locally finite analogue of the braid exact sequence, \[ 1 Hlf(∞) Blf(∞) () 1, \] where Hlf(∞)=π1(Conflf∞()) and Blf(∞)=π1(Conflf∞()//()), the fundamental group of the homotopy quotient of Conflf∞() by (). Building on this, we classify connected countably infinite--sheeted covering spaces and give a criterion for when such a covering can be realized from the zero set of a family of entire functions F:X×. In particular, if π1(X) is free and H2(X;)=0, then every countably infinite--sheeted covering space over X is realizable.

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