Papers

Topics

Authors

Recent

View all

AI Research Assistant

Well-researched responses based on relevant abstracts and paper content.

Custom Instructions Pro

Preferences or requirements that you'd like Emergent Mind to consider when generating responses.

Gemini 2.5 Flash

Gemini 2.5 Flash 75 tok/s

Gemini 2.5 Pro 46 tok/s Pro

GPT-5 Medium 26 tok/s Pro

GPT-5 High 27 tok/s Pro

GPT-4o 104 tok/s Pro

Kimi K2 170 tok/s Pro

GPT OSS 120B 468 tok/s Pro

Claude Sonnet 4 37 tok/s Pro

2000 character limit reached

Representing finite distributive lattices as congruence lattices of lattices (1309.7511v1)

Published 28 Sep 2013 in math.RA

Abstract: Dilworth's theorem. Every finite distributive lattice $D$ can be represented as the congruence lattice of a finite lattice $L$. We want: Every finite distributive lattice $D$ can be represented as the congruence lattice of a nice finite lattice $L$. nice = sectionally complemented, uniform, semimodular, given automorphism group, regular, uniform, isoform