A new coding theory, for normal surfaces, and ADE singularities, I
Abstract
In this article we extend the theory of the binary codes (the strict code and the extended code ), associated to a projective nodal surface, to a coding theory for normal surfaces, with special consideration of the surfaces with ADE (Rational Double Points) singularities. We define a new theory of generalized labeled codes, establish in the geometric case basic restrictions for the weights of these codes, and some basic inequality. A crucial method that we establish is the extension of the concept of `code shortening' to the case of generalized codes: this is the algebraic counterpart of the geometric notion of a partial smoothing of the singular points, and leads to the concept of ancestors, which we illustrate through several examples.
Cite
@article{arxiv.2508.16369,
title = {A new coding theory, for normal surfaces, and ADE singularities, I},
author = {Fabrizio Catanese},
journal= {arXiv preprint arXiv:2508.16369},
year = {2025}
}
Comments
38 pages, dedicated to the memory of Wolfgang Ebeling. Submitted to the Journal of Singularities