Primal Conjecture in Matrix $E_\phi^9$
Paul Marrero, Eduardo Acu\~na
TL;DR
This paper introduces a conjecture related to integer solutions of equations based on Primal algebra, building on the Acuña Theorem, and proposes problems that could be solved if the conjecture holds true.
Contribution
It presents a new conjecture in Primal algebra connected to integer solutions and offers related problems for future exploration.
Findings
Conjecture links integer solutions to Primal algebra.
Proposed problems could be solved if conjecture is validated.
Based on Acuña Theorem.
Abstract
In this paper we propose a conjecture about integer solutions to any equations, based on Primal algebra specifically this conjecture is a corollary of the Acu\~na Theorem in that article. Also some problems are proposed which, if the conjecture is correct, could be solved.
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Taxonomy
TopicsAdvanced Topics in Algebra · Matrix Theory and Algorithms · Advanced Optimization Algorithms Research