A Borsuk--Ulam theorem for cyclic p-groups

Abstract

We describe a connective K-theory Borsuk--Ulam/Bourgin--Yang theorem for cyclic groups of order a power of a prime p. Consider two finite dimensional complex representations U and V of the cyclic group Z /pk+1 of order pk+1, where k≥ 0. For 0≤ l≤ k, we write Vl for the subspace of V fixed by the cyclic subgroup of order pl, and require that the fixed subspace, Vk+1, be zero and that Vk be non-zero. Put δ (V)=Σl=0k pl dimC (Vl/Vl+1)-(pk-1). Then the zero-set of any Z /pk+1-map S(U) V from the unit sphere in U (for some invariant inner product) has covering dimension greater than or equal to 2(dimC U - δ (V)-1), if dimC U> δ (V).

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