English

Left modularity and extremality for (some) infinite lattices

Rings and Algebras 2026-04-24 v1

Abstract

For some important families of complete infinite lattices, we study some generalizations of two fundamental notions which are mostly treated for finite lattices. Specifically, for well-separated κ\kappa-lattices, and also for weakly atomic completely semidistributive lattices, we generalize the notions of left modularity and extremality. These two families of lattices coincide if restricted to finite lattices, but are distinct when infinite lattices are also included. For both families, we prove that extremality and left modularity imply each other. Furthermore, for weakly atomic completely semidistributive lattices, we give several conceptual characterizations of left modular elements, and show that the set of left modular elements form a complete distributive sublattice. Our results, combined with some recent work on finite lattices, imply that the weakly atomic completely semidistributive lattices that are left modular (or extremal) generalize the semidistributive trim lattices; from finite to infinite lattices. We then apply our results to the lattice of torsion classes of finite dimensional algebras, which are known to fall in the intersection of the two families treated in our work. For an algebra AA, we obtain that the lattice of torsion classes is left modular (equivalently, extremal) if and only if AA is brick-directed. This leads to an abundance of concrete examples and non-examples.

Keywords

Cite

@article{arxiv.2604.20947,
  title  = {Left modularity and extremality for (some) infinite lattices},
  author = {Sota Asai and Osamu Iyama and Kaveh Mousavand and Charles Paquette},
  journal= {arXiv preprint arXiv:2604.20947},
  year   = {2026}
}

Comments

27 pages, Comments are welcome

R2 v1 2026-07-01T12:31:11.389Z