📚 Volume 33, Issue 7 📋 ID: 3DAg8EZ

Authors

Dmitry Ivanov, Layla Abdurrahman, Mei Ling Tan

Kazakh National University, Almaty, Kazakhstan; University of Khartoum, Khartoum, Sudan; Cheikh Anta Diop University, Dakar, Senegal

Keywords

homotopy invariants topological manifolds algebraic topology cohomology theories spectral sequences homotopy equivalence

Abstract

Topology, as a fundamental area in mathematics, provides essential insights into the properties of space that are preserved under continuous transformations. This paper focuses on the study of homotopy invariants in higher dimensional topological manifolds, particularly aiming to extend classical results to more complex structures. The objective is to explore the nature and behavior of these invariants under various conditions and transformations. We employed advanced algebraic topology techniques, including spectral sequences and cohomology theories, to systematically analyze and derive new results about homotopy equivalence classes. The findings demonstrate significant advancements in understanding the stability of manifold structures up to homotopy equivalence, revealing novel invariants that remain unchanged under certain transformations. Additionally, this research provides a deeper comprehension of the interplay between topological spaces and their algebraic counterparts. In conclusion, our study not only broadens the theoretical framework of topology but also provides practical tools for mathematicians working with complex topological spaces. This opens up new avenues for future research in both pure and applied mathematics, contributing to the field's ongoing development.
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📝 How to Cite

Dmitry Ivanov, Layla Abdurrahman, Mei Ling Tan (2026). "Investigating Homotopy Invariants in Higher Dimensional Topological Manifolds". Wulfenia, 33(7).