Over the last decades, several disciplines have begun reexamining foundational concepts such as zero, value, and symbol—particularly through the lenses of logic, semiotics, and theoretical physics.

In alignment with these trends, I have developed a conceptual model called the Theorem of Latent Conservation of Numerical Value (CLVN–LRR™). It aims to explore how certain symbolic structures might preserve “compressed value” even in apparently null states.

While this proposal has not yet been peer-reviewed or published in academic journals, it seeks to resonate theoretically with previously published work, including:

• Burgin, M. (2003). Non-Diophantine Arithmetics and their Applications in Mathematics and Science

• Baez, J. (2006). The Structural Foundations of Logic

• Recent research on non-monotonic logic and symbolic representation in categorical mathematics

I invite suggestions, questions, and references from fellow researchers who are also exploring alternative frameworks for understanding symbolic value, latent structures, or the foundations of mathematical logic.

📎 Additional exploratory content can be accessed here (optional link): [e.g., https://clvn-lrr.com or https://doi.org/10.5281/zenodo.15438331