Lyapunov stability under q-dilatation and q-contraction of coordinates

Abstract

This study examines the Lyapunov stability under coordinate q-contraction and q-dilatation in three dynamical systems: the discrete-time dissipative H\'enon map, and the conservative, non-integrable, continuous-time H\'enon-Heiles and diamagnetic Kepler problems. The stability analysis uses the q-deformed Jacobian and q-derivative, with trajectory stability assessed for q > 1 (dilatation) and q < 1 (contraction). Analytical curves in the parameter space mark boundaries of distinct low-periodic motions in the H\'enon map. Numerical simulations compute the maximal Lyapunov exponent across the parameter space, in Poincar\'e surfaces of section, and as a function of total energy in the conservative systems. Simulations show that q-contraction (q-dilatation) generally decreases (increases) positive Lyapunov exponents relative to the q = 1 case, while both transformations tend to increase Lyapunov exponents for regular orbits. Some exceptions to this trend remain unexplained regarding Kolmogorov-Arnold-Moser (KAM) tori stability.

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