Boolean-Algebraic Framework for Maximal-Degree U-k-Seminets: Theoretical Foundations and Computational Advances
DOI:
https://doi.org/10.47363/JAICC/ICAIC2025/2025(4)23Keywords:
U-k-Seminets, Maximal Degree, T-OrderAbstract
A Boolean-algebraic framework for maximal-degree U-k-seminets is presented, unifying combinatorial and algebraic properties. This work ex
tends Aczel’s quasigroup theory and Belousov’s k-net constructions by in traducing a computational framework for U-k-seminets of maximal
degree µ. Key results include: (1) explicit bounds for µ in terms of set cardinality t and t-order d (µ = t−d+2), (2) existence conditions for no
equipotent sets, and (3) inequalities governing µ and t ((t+2)/2 < µ ≤ t). Theorems are validated via tabulated solutions for m = t − d, demonstrating scal able applications in finite geometry and network design. The framework bridges partial quasigroups and block designs, offering algorithmic tools for seminets with maximal degree constraints.
Downloads
Published
Issue
Section
License
Copyright (c) 2025 Journal of Artificial Intelligence & Cloud Computing
This work is licensed under a Creative Commons Attribution 4.0 International License.