Constructive method for the Cauchy problem of parabolic equations and its mechanization;

Cauchy problem for a class of coupled hyperbolic systems of conservation laws;

The generalization of the sabstitution-iteration method for high-dimension wave equation s Cauchy problem;

The propagation of singularities of solutions to the Cauchy problems of a linear thermoelastic system for microstretch materials in one space variable is studied by using an argument of frequencies analysis.

In this paper, how to construct the global solution with "small initial data" and its asymptotic property of the semilinear problem according to the decaying estimates of the solution to its corresponding homogeneous problem is discussed its results can be applied to semilinear heat equations, Schrodinger equations or systems and a series of results are obtained about them.

In this paper, we investigate the following non-local Cauchy problem of nonlinear population evolution equation with random periodic migration perturbation,{(p(r,t))/(t)+(p(r,t))/(r)=-μ(r)p(r,t)+f(t,p(r,t)),0<r<rm,t0p(r,0)=p0(r)+g(p(r,t0)),T>t0>0 p(0,t)=β(t)integral from n=r1 to r2 k(r)h(r)p(r,t)dr, t≥0.