English

Model Theory of Generic Vector Space Endomorphisms

Logic 2025-06-12 v2

Abstract

This paper deals with the model companion of an endomorphism acting on a vector space, possibly with extra structure. Given a theory TT that \varnothing-defines an infinite KK-vector space V\mathbb{V} in every model, we set T_\theta := T \cup \{\text{``\thetadefinesa defines a Kendomorphismof-endomorphism of \mathbb{V}"}\}. We then consider extensions of the form Tθ{klKer(ρj,k,l[θ])=klKer(ηj,k,l[θ]):jJ}, T_\theta \cup \left\{\sum\nolimits_{k}\bigcap\nolimits_{l}\operatorname{Ker}(\rho_{j, k, l}[\theta]) = \sum\nolimits_{k}\bigcap\nolimits_{l} \operatorname{Ker}(\eta_{j, k, l}[\theta]) : j \in \mathcal{J}\right\}, where all sums and intersections are finite, and all the ρ[θ]\rho[\theta]'s and η[θ]\eta[\theta]'s are polynomials over KK with θ\theta plugged in. Notice that properties such as θ22Id=0\theta^2 - 2\operatorname{Id} = 0 or Ker(θn)=Ker(θn+1)\operatorname{Ker}(\theta^n) = \operatorname{Ker}(\theta^{n+1}) can be expressed in such a manner. We then parametrize the consistent extensions of this form by a family {TθC:CC}\{T^C_\theta : C \in \mathcal{C}\} and characterize the existentially closed models of each TθCT^C_\theta. We also present a sufficient criterion, which only depends on TT, for when these characterizations are first-order expressible, i.e., for when a model companion of each TθCT^C_\theta exists.

Keywords

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

R2 v1 2026-06-28T21:49:58.729Z