Jiang-type theorems for coincidences of maps into homogeneous spaces

Abstract

Let f,g: X G/K be maps from a closed connected orientable manifold X to an orientable coset space M=G/K where G is a compact connected Lie group, K a closed subgroup and X= M. In this paper, we show that if L(f,g)=0 then N(f,g)=0; if L(f,g) 0 then N(f,g)=R(f,g) where L(f,g), N(f,g), and R(f,g) denote the Lefschetz, Nielsen, and Reidemeister coincidence numbers of f and g, respectively. When X> M, we give conditions under which N(f,g)=0 implies f and g are deformable to be coincidence free.

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