TL;DR
This paper reflects on Solomon Marcus's diverse contributions to mathematical linguistics and related fields, highlighting personal interactions and collaborative work across various mathematical topics.
Contribution
It presents a personal account of Solomon Marcus's interdisciplinary work and discusses specific mathematical conjectures and results he was involved with.
Findings
Discussion of topology conjectures and a self-dual theorem in geometry
Results about Boolean algebras and a B-ring Euler formula
Insights into Yang-Baxter maps and sequences and series
Abstract
I was interested in the work of Solomon Marcus in Mathematical Linguistics as a high-school student. Later, I had the opportunity to discuss with him about many topics. He was a polymath. We wrote a paper together, and I refereed an editorial paper about his work in 2021. Samples of (possible) discussions are presented: some topology conjectures, a self-dual theorem in geometry, results about Boolean algebras, a B-ring Euler formula, Yang-Baxter maps and a discussion on sequences and series. A short appendix on poetry is also included.
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