CONSTRUCTION OF NEW $\Omega$-SPECTRUM AND THEIR APPLICATIONS TO COHOMOLOGY THEORY

  • Dr Pravanjan Kumar Rana Associate Professor and Head, Department of Mathematics, Ramakrishna Mission Vivekananda Centenary College, Rahara,Kolkata
  • Bhaskar Mandal Ph.D., Research Scholar, Department of Mathematics, Ramakrishna Mission Vivekananda Centenary College, Rahara, Kolkata
DOI: https://doi.org/10.53555/m.v9i1.5337
Keywords: $\Omega- spectrum $,Suspecsion spectrum,Sphere spectrum,Eilenberg-MacLane spectrum , Spectrul Homology theory,

Abstract

The aim of this paper is to construct a new $\Omega-spectrum $ associated with infinite symmetric product functor of connected CW-complexes and their application to cohomology theory.\\ In this paper we studies all cohomology operation for the cohomology theory associated with new $\Omega$-spectrum.\\More precisely we prove that:\\i) the abelian group of all cohomology operations of degree k for the cohomology theory $H^*(\hspace{6pt};\underline{A})$ is isomorphic to the group $H^{n+k}(SP^{\infty}(\Sigma^n Y);\underline{A})$ ; and \\ii) the graded abelian group of all stable cohomology operations of degree k for the cohomology theory $H^*(;\underline{A})$ is isomorphic to the group $ \varprojlim H^{n+k}(SP^{\infty}(\Sigma^n Y);

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References

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Published
2023-01-10
How to Cite
Rana, D. K., & Mandal, B. (2023). CONSTRUCTION OF NEW $\Omega$-SPECTRUM AND THEIR APPLICATIONS TO COHOMOLOGY THEORY. IJRDO -JOURNAL OF MATHEMATICS, 9(1), 14-18. https://doi.org/10.53555/m.v9i1.5337
Issue
Vol. 9 No. 1 (2023): IJRDO - JOURNAL OF MATHEMATICS (ISSN: 2455-9210)
Section
Articles

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