Decay Properties for Some Lagrangian Systems with Dissipative Terms and Applications

This paper deals with decay properties for the solutions of a large class of ordinary differential systems, with time dependent restoring potential, which include the system $$\left({\left|{u\prime}\right|^{\mu - 2} u\prime}\right)\prime+\beta_1 t^{\theta_{\text{1}}}\left|{u\prime}\right|^{\mu-2}u\prime+\beta_2 t^{\theta_{\text{2}}}\left|{u\prime}\right|^{m-2}u\prime+ct^v\left|u\right|^{p-2}u=0,$$ t ε T, ∞), u : T, ∞) → $\mathbb{R}^N$ , 1 < µ < m, ν ≥ 0, c0, β₁0, β₂ ≥ 0, -1 ≤ θ₁ < µ+ν-1, θ₂ < m + ν - 1, and the nonlinear system $$Lu+T\left( t \right)u\prime+V\left( {t,u\prime } \right)+t^\nu Su=e\left(t\right),$$ where L and S are positive definite matrices, T is a skew-symmetric matrix continuous function, V is a quasilinear replacement of a linear resistive term R(t)u′ and e is continuous. We prove various types of decay properties to zero for the solutions in the first case and exponential decay for the difference of two solutions, under suitable assumptions, in the second one.