Solvable Initial Value Problems Ruled by Discontinuous Ordinary Differential Equations
Uploaded to arXiv, 2024
We study initial value problems having dynamics ruled by discontinuous ordinary differential equations with the property of possessing a unique solution. We identify a precise class of such systems that we call solvable intitial value problems and we prove that for this class of problems the unique solution can always be obtained analytically via transfinite recursion. We present several examples including a nontrivial one whose solution yields, at an integer time, a real encoding of the halting set for Turing machines; therefore showcasing that the behavior of solvable systems is related to ordinal Turing computations.
Recommended citation: Bournez Olivier, and Gozzi Riccardo. "Solvable Initial Value Problems Ruled by Discontinuous Ordinary Differential Equations." arXiv preprint arXiv:2405.00165 (2024). https://doi.org/10.48550/arXiv.2405.00165