Lyapunov-type inequality for \(n\)-dimensional quasilinear systems (Q2853324)

The authors prove an inequality of Lyapunov type for second-order and \(n\)-dimensional quasilinear systems with Dirichlet boundary conditions. A particular case are two-dimensional systems of the form NEWLINE\[NEWLINE (r_1 (t)\phi_p (u'))' + f_1 (t) | u |^{\alpha-2}u | v |^{\beta} = 0, NEWLINE\]NEWLINE NEWLINE\[NEWLINE (r_2 (t)\phi_q (v'))' + f_2 (t) | u |^{\theta}v | v |^{\gamma -2} = 0, NEWLINE\]NEWLINE previously considered by \textit{D. Çakmak} and \textit{A. Tiryaki} [Appl. Math. Comput. 216, No. 12, 3584--3591 (2010; Zbl 1208.34022)] and by \textit{P. L. de Nápoli} and \textit{J. P. Pinasco} [J. Differ. Equations 227, No. 1, 102--115 (2006; Zbl 1100.35077)]. In the proof, Hölder's inequality and Jensen's inequality are used. Three examples are given to show the obtained generalizations.