Antieau, B. (2024). Spectral sequences, décalage, and the Beilinson t-structure. arXiv preprint arXiv:2411.09115v1.
This paper aims to elucidate the theory of spectral sequences through the lens of the Beilinson t-structure, demonstrating how the concept of décalage can be used to understand the relationship between different pages of a spectral sequence.
The author employs methods from stable homotopy theory, particularly utilizing the Beilinson t-structure on the ∞-category of filtered objects in a stable ∞-category. The paper defines and explores the properties of the décalage functor within this framework.
The Beilinson t-structure and the décalage functor provide a powerful and homotopy-coherent framework for understanding and working with spectral sequences. This approach offers a more intuitive understanding of the relationship between different pages of a spectral sequence and simplifies the construction of spectral sequences from filtered objects.
This research provides a deeper understanding of spectral sequences, which are fundamental tools in algebraic topology and homological algebra. The connection to the Beilinson t-structure offers new insights and potential applications in these fields.
The paper focuses on the theoretical aspects of spectral sequences and their connection to the Beilinson t-structure. Further research could explore specific applications of this framework in areas like algebraic topology, homological algebra, and algebraic geometry. Additionally, investigating the implications of this approach for the convergence of spectral sequences could be a fruitful avenue for future work.
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