This paper is mainly concerned with a class of optimal control problems of systems governed by the nonlinear dynamic systems on time scales. Introducing the reasonable weak solution of nonlinear dynamic systems, the existence of the weak solution for the nonlinear dynamic systems on time scales and its properties are presented. Discussing L1-strong-weak lower semicontinuity of integral functional, we give sufficient conditions for the existence of optimal controls. Using integration by parts formula...

This paper is mainly concerned with a class of optimal control problems of systems governed by the nonlinear dynamic systems on time scales. Introducing the reasonable weak solution of nonlinear dynamic systems, the existence of the weak solution for the nonlinear dynamic systems on time scales and its properties are presented. Discussing L1-strong-weak lower semicontinuity of integral functional, we give sufficient conditions for the existence of optimal controls. Using integration by parts formula...

We investigate the behavior of weak solutions to the nonlocal Robin problem for linear elliptic divergence second order equations in a neighborhood of a boundary corner point. We find an exponent of the solution's decreasing rate under minimal assumptions on the problem coefficients.

In this article, we study the existence of nontrivial weak solutions for the following boundary value problem: $$-{\Delta }_{\gamma }u=f(x,u)\text{in}\Omega ,u=0\text{on}\partial \Omega ,$$ where $\Omega$ is a bounded domain with smooth boundary in ${ℝ}^N$, $\Omega \cap \{x_j=0\}\ne \varnothing$ for some $j$, ${\Delta }_{\gamma }$ is a subelliptic linear operator of the type $${\Delta }_{\gamma }:=\sum _{j=1}^N{\partial }_{x_j}\left({\gamma }_j^2{\partial }_{x_j}\right),{\partial }_{x_j}:=\frac{\partial }{\partial x_j},N\ge 2,$$ where $\gamma \left(x\right)=({\gamma }_1\left(x\right),{\gamma }_2\left(x\right),\cdots ,{\gamma }_N\left(x\right))$ satisfies certain homogeneity conditions and degenerates at the coordinate hyperplanes and the nonlinearity $f(x,\xi )$ is of subcritical growth and does not satisfy the Ambrosetti-Rabinowitz (AR) condition.