English

A Borsuk--Ulam theorem for cyclic $p$-groups

Algebraic Topology 2022-11-16 v1

Abstract

We describe a connective KK-theory Borsuk--Ulam/Bourgin--Yang theorem for cyclic groups of order a power of a prime pp. Consider two finite dimensional complex representations UU and VV of the cyclic group Z/pk+1Z /p^{k+1} of order pk+1p^{k+1}, where k0k\geq 0. For 0lk0\leq l\leq k, we write VlV_l for the subspace of VV fixed by the cyclic subgroup of order plp^l, and require that the fixed subspace, Vk+1V_{k+1}, be zero and that VkV_k be non-zero. Put δ(V)=l=0kpldimC(Vl/Vl+1)(pk1)\delta (V)=\sum_{l=0}^k p^l dim_C (V_l/V_{l+1})-(p^k-1). Then the zero-set of any Z/pk+1Z /p^{k+1}-map S(U)VS(U) \to V from the unit sphere in UU (for some invariant inner product) has covering dimension greater than or equal to 2(dimCUδ(V)1)2(dim_C U - \delta (V)-1), if dimCU>δ(V)dim_C U> \delta (V).

Keywords

Cite

@article{arxiv.2211.08087,
  title  = {A Borsuk--Ulam theorem for cyclic $p$-groups},
  author = {M. C. Crabb},
  journal= {arXiv preprint arXiv:2211.08087},
  year   = {2022}
}
R2 v1 2026-06-28T05:56:37.448Z