The Journal of the Indian Mathematical Society

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On the Existence of Free Action of S3 on Certain Finitistic Mod P Cohomology Spaces


Affiliations
1 Department of Mathematics, University of Delhi, Delhi - 110007, India
     

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In this paper we investigate the possibility of free actions of G = S3 on a finitistic mod p cohomology (sphere, real projective space or lens space) X. If X is a mod 2 cohomology k-sphere, then it is observed that G can act freely on X only if k = 4n − 1. In this case, with the canonical free G-action on S4m−1, we prove that there exist no equivariant map from S4n−1 to X if m > n. If X is a mod 2 cohomology real projective space or mod p cohomology lens space, p an odd prime then we prove that G can not act freely on X.

Keywords

Free Action, Finitistic Space, Leray-Serre Spectral Sequence, Mod p Cohomology Algebra.
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  • On the Existence of Free Action of S3 on Certain Finitistic Mod P Cohomology Spaces

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Authors

Jaspreet Kaur
Department of Mathematics, University of Delhi, Delhi - 110007, India
Hemant Kumar Singh
Department of Mathematics, University of Delhi, Delhi - 110007, India

Abstract


In this paper we investigate the possibility of free actions of G = S3 on a finitistic mod p cohomology (sphere, real projective space or lens space) X. If X is a mod 2 cohomology k-sphere, then it is observed that G can act freely on X only if k = 4n − 1. In this case, with the canonical free G-action on S4m−1, we prove that there exist no equivariant map from S4n−1 to X if m > n. If X is a mod 2 cohomology real projective space or mod p cohomology lens space, p an odd prime then we prove that G can not act freely on X.

Keywords


Free Action, Finitistic Space, Leray-Serre Spectral Sequence, Mod p Cohomology Algebra.