The Heat Equation for the Generalized Hermite and the Generalized Landau Operators

In this paper, the authors have studied a generalized Ginzburg᎐Landau equation Ž . in two spatial dimensions 2D . They have shown that this equation, under periodic boundary conditions, has the maximal attractor with finite Hausdorff dimension. This rigorously establishes the foundation for further

We study the following generalized 1D Ginzburg-Landau equation on Ω = (0, ∞) × (0, ∞): with initial and Dirichlet boundary conditions u(x, 0) = h(x), u(0, t) = Q(t). Based on detail analysis, the sharper existence and uniqueness of global solutions are obtained under sufficient conditions.

The Ginzburg᎐Landau-type complex partial differential equations are simplified mathematical models for various pattern formation systems in mechanics, physics, and chemistry. Most work so far concentrates on Ginzburg᎐Landau-type equations Ž . with one spatial dimension 1D . In this paper, the author