Tight and essentially tight modules, generalizations of weakly injective modules, are equivalent under specific conditions, including when the module is uniform, its injective hull is a direct sum of indecomposables, the ring is q.f.d., or the module is nonsingular over a semiprime Goldie ring.
This research paper investigates the concept of extended promotion in partially ordered sets (posets), focusing on the enumeration and properties of tangled labelings and introducing new tools like sorting generating functions to analyze the sorting process.
This paper introduces the concept of QH-visibility domains, which are characterized by the behavior of quasihyperbolic geodesics near the Euclidean boundary, and explores their relationship with Gromov hyperbolicity, providing a comprehensive solution to the problem of equivalence between the Gromov boundary and the Euclidean boundary.
The Beilinson t-structure provides a powerful framework for understanding and working with spectral sequences, showing how the décalage functor connects to the pages of a spectral sequence and offering a more intuitive and homotopy-coherent approach to their construction and properties.
This research paper introduces a novel method for characterizing the Morita equivalence of inverse semigroups, particularly those containing "diamonds," using labelled graphs constructed from their idempotent D-class representatives.
This research paper investigates the concept of λ-pure global dimension in Grothendieck categories, demonstrating its impact on the relationship between ordinary and λ-pure derived categories and its connection to the vanishing of λ-pure singularity categories.
This paper characterizes the structure and topology of simple inverse ω-semigroups with compact maximal subgroups, showing they are topologically isomorphic to specific Bruck-Reilly extensions and examining the topological implications of adjoining a zero element.
This paper characterizes a specific type of vertex coloring called "ordered Szlam colorings" in Euclidean spaces, providing necessary and sufficient conditions for a coloring to be classified as such.
This paper introduces a novel definition of noncrossing partitions for marked surfaces, generalizing Kreweras' classical construction, and explores the properties of the resulting noncrossing partition lattices, including their lattice structure, rank function, and lower intervals.
This research paper generalizes Buchweitz's Theorem, which relates singularity categories and stable categories of modules over Gorenstein rings, to the setting of N-complexes over exact categories.