A Borsuk-Ulam theorem for ( Zp)k-actions on products of (mod p) homology spheres
Abstract
It is proved that for a product action of ( Zp)k on a product of (mod p) homology spheres Nn1×...× Nnk, where all ni's are assumed to be odd if p is odd, and any continuous map f Nn1×...× Nnk Rm the set A(f)=\x∈ Nn1×...× Nnk| f(x)=f(gx) ∀ g∈( Zp)k\ has dimension at least n1+...+nk-m(pk-1), provided ni mpi-1(p-1) for all i (1 i k). Moreover, if ni mpk-1(p-1) for all i(1 i k) then the free action μ can be assumed arbitrary.
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