Counting and Computing Join-Endomorphisms in Lattices (Revisited)

TL;DR

This paper investigates the number of join-endomorphisms in finite lattices, provides formulas for specific cases, and develops efficient algorithms for computing greatest lower bounds of sets of endomorphisms, with applications in logic and distributed systems.

Contribution

It offers a new formula for counting join-endomorphisms in certain lattices and introduces optimized algorithms for computing their greatest lower bounds.

Findings

Exact count of join-endomorphisms for the lattice M_n

Efficient algorithms with O(mn) and O(mn + n^3) complexity

Experimental validation of algorithm improvements

Abstract

Structures involving a lattice and join-endomorphisms on it are ubiquitous in computer science. We study the cardinality of the set $\mathcal{E}(L)$ of all join-endomorphisms of a given finite lattice $L$. In particular, we show for $\mathbf{M}_n$, the discrete order of $n$ elements extended with top and bottom, $| \mathcal{E}(\mathbf{M}_n) | =n!\mathcal{L}_n(-1)+(n+1)^2$ where $\mathcal{L}_n(x)$ is the Laguerre polynomial of degree $n$. We also study the following problem: Given a lattice $L$ of size $n$ and a set $S\subseteq \mathcal{E}(L)$ of size $m$, find the greatest lower bound ${\large\sqcap}_{\mathcal{E}(L)} S$. The join-endomorphism ${\large\sqcap}_{\mathcal{E}(L)} S$ has meaningful interpretations in epistemic logic, distributed systems, and Aumann structures. We show that this problem can be solved with worst-case time complexity in $O(mn)$ for distributive lattices and $O(mn + n^3)$ for arbitrary lattices. In the particular case of modular lattices, we present an adaptation of the latter algorithm that reduces its average time complexity. We provide theoretical and experimental results to support this enhancement. The complexity is expressed in terms of the basic binary lattice operations performed by the algorithm.