TL;DR
This paper proves the Lefschetz cohomologicity of the cone operator in the context of cone construction, extending the theoretical framework established in the first part.
Contribution
It provides a rigorous proof of the Lefschetz cohomologicity of the cone operator, advancing the theoretical understanding of cone construction methods.
Findings
Established Lefschetz cohomologicity of the cone operator
Extended the theoretical framework of cone construction
Provided rigorous mathematical proof
Abstract
This is the second part of two parts, titled " cone construction". In this part we prove the Lefschetz cohomologicity of the cone operator .
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Taxonomy
TopicsAlgebraic Geometry and Number Theory · Geometry and complex manifolds · Geometric and Algebraic Topology