Title: Internality of autonomous differential equations

Speaker: Léo Jimenez (The Ohio State University)

Time: 2025/04/17 10:00-11:00

Zoom room: 717 463 6082

Organizer: Kyle Gannon (BICMR)

Abstract：

　　When solving a differential equation, one sometimes finds that solutions can be expressed using a finite number of fixed, particular solutions. As an example, the set of solutions of a linear differential equation is a finite-dimensional complex vector space. This is an incarnation of the model-theoretic phenomenon of internality to the constants in a differentially closed field of characteristic zero. In this talk, I will explain what this means, and discuss some recent progress, joint with Christine Eagles, on finding methods to determine whether the solution set of a differential equation is internal. A corollary of our method also gives a criterion for solutions to be orthogonal to the constants, and in particular not Liouvillian. I will show a concrete application to Lotka-Volterra systems.