Asymptotic behavior for a class of damped second-order gradient systems via Lyapunov method

Abstract

In this work we study the asymptotic behavior of a class of damped second-order gradient systems u(t) + au(t) + ∇ W(u(t)) = 0, under assumptions ensuring local convexity of the potential near equilibrium and coercivity at infinity. By introducing a Lyapunov functional adapted to the geometry of the system, we establish uniform asymptotic stability of the equilibrium for all a ∈ (0,a0], together with exponential decay when the potential satisfies a quadratic control near its minimum. Furthermore, complementary arguments based on semigroup theory reveal the existence of a global attractor. We also present numerical simulations for some W potentials that illustrate the behavior of trajectories near equilibrium, in both dissipative and conservative regimes.

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