On Periodic Approximate Solutions of Dynamical Systems with Quadratic Right-Hand Side

Abstract

Difference schemes are considered for dynamical systems $ \dot x = f (x) $ with a quadratic right-hand side, which have $t$-symmetry and are reversible. Reversibility is interpreted in the sense that the Cremona transformation is performed at each step in the calculations using a difference scheme. The inheritance of periodicity and the Painleve property by the approximate solution is investigated. In the computer algebra system Sage, such values are found for the step $ \Delta t $, for which the approximate solution is a sequence of points with the period $ n \in \mathbb N $. Examples are given and hypotheses about the structure of the sets of initial data generating sequences with the period $ n $ are formulated.