Model Theory of Generic Vector Space Endomorphisms
Abstract
This paper deals with the model companion of an endomorphism acting on a vector space, possibly with extra structure. Given a theory that -defines an infinite -vector space in every model, we set T_\theta := T \cup \{\text{``\thetaK\mathbb{V}"}\}. We then consider extensions of the form where all sums and intersections are finite, and all the 's and 's are polynomials over with plugged in. Notice that properties such as or can be expressed in such a manner. We then parametrize the consistent extensions of this form by a family and characterize the existentially closed models of each . We also present a sufficient criterion, which only depends on , for when these characterizations are first-order expressible, i.e., for when a model companion of each exists.
Cite
@article{arxiv.2502.13667,
title = {Model Theory of Generic Vector Space Endomorphisms},
author = {Leon Chini},
journal= {arXiv preprint arXiv:2502.13667},
year = {2025}
}
Comments
40 pages