The coexistence of quasi-periodic and blow-up solutions in a superlinear Duffing equation

Finite time blow up of solutions of the Kirchhoff-type equation with variable exponents

In this work, we investigate the following Kirchhoff-type equation with variable exponent nonlinearities u_{tt}-M(‖∇u‖²)△u+|u_{t}|^{p(x)-2}u_{t}=|u|^{q(x)-2}u. We proved the blow up of solutions in finite time by using modified energy functional method.

Existence of Periodic Solutions for the Duffing Equation with Impulses

On forced periodic solutions of superlinear quasi - parabolic problems ∗

We study the existence of periodic solutions for a class of quasi-parabolic equations involving the p-Laplacian (or any other nonlinear operators of similar class) perturbed by nonlinear terms and forced by rather irregular periodic in time excitations (including what we call abrupt changes). These equations may model problems for which, aside from the presence of the kind of nonlinear dissipat...

Blow-up of Solutions to a Periodic Nonlinear Dispersive Rod Equation

In this paper, firstly we find an optimal constant for a convolution problem on the unit circle via the variational method. Then by using the optimal constant, we give a new and improved sufficient condition on the initial data to guarantee the corresponding strong solution blows up in finite time. We also analyze the corresponding ordinary difference equation associate to the convolution probl...

Quasi-Periodic Solutions of Heun’s Equation

By exploiting a recently developed connection between Heun’s differential equation and the generalized associated Lamé equation, we not only recover the well known periodic solutions, but also obtain a large class of new, quasi-periodic solutions of Heun’s equation. Each of the quasi-periodic solutions is doubly degenerate.