The backward phase flow and FBI-transform-based Eulerian Gaussian beams for the Schrödinger equation

We propose the backward phase flow method to implement the Fourier–Bros–Iagolnitzer (FBI)-transform-based Eulerian Gaussian beam method for solving the Schrödinger equation in the semi-classical regime. The idea of Eulerian Gaussian beams has been first proposed in [12]. In this paper we aim at two crucial computational issues of the Eulerian Gaussian beam method: how to carry out long-time beam propagation and how to compute beam ingredients rapidly in phase space. By virtue of the FBI transform, we address the first issue by introducing the reinitialization strategy into the Eulerian Gaussian beam framework. Essentially we reinitialize beam propagation by applying the FBI transform to wavefields at intermediate time steps when the beams become too wide. To address the second issue, inspired by the original phase flow method, we propose the backward phase flow method which allows us to compute beam ingredients rapidly. Numerical examples demonstrate the efficiency and accuracy of the proposed algorithms.     

A generalization of Borel's theorem and microlocal Gevrey regularity in involutive structures

In this paper, we use Borel's procedure to construct Gevrey approximate solutions of an initial value problem for involutive systems of Gevrey complex vector fields. As an application, we describe the Gevrey wave-front set of the boundary values of approximate solutions in wedges W of Gevrey involutive structures (M,V). We prove that the Gevrey wave-front set of the boundary value is contained in the polar of a certain cone ΓT(W) contained in RV∩TX where X is a maximally real edge of W. We also prove a partial converse.     

网络处理器中FBI单元的设计及其Verilog HDL实现

FBI(Fast Bus Interface)单元是实现网络处理器外部接口与网络处理器内部总线高速数据传输的关键。通过深入研究FBI单元,阐述了它的结构及其功能,运用Verilog HDL语言设计了一个FBI接口,在Model- sim SE PLUS 6．0上进行仿真,实现了整体模块的功能。     

Decay of solutions of the wave equation with arbitrary localized nonlinear damping

We study the problem of decay rate for the solutions of the initial-boundary value problem to the wave equation, governed by localized nonlinear dissipation and without any assumption on the dynamics (i.e., the control geometric condition is not satisfied). We treat separately the autonomous and the non-autonomous cases. Providing regular initial data, without any assumption on an observation subdomain, we prove that the energy decays at last, as fast as the logarithm of time. Our result is a generalization of Lebeau (in: A. Boutet de Monvel, V. Marchenko (Eds.), Algebraic and Geometric Methods in Mathematical Physics, Kluwer Academic Publishers, Dordrecht, the Netherlands, 1996, pp. 73) result in the autonomous case and Nakao (Adv. Math. Sci. Appl. 7 (1) (1997) 317) work in the non-autonomous case. In order to prove that result we use a new method based on the Fourier-Bross-Iaglintzer (FBI) transform.     

On Boundary Properties of Solutions of Complex Vector Fields

This work presents results on the boundary properties of solutions of a complex, planar, smooth vector field L. Classical results in the H^p theory of holomorphic functions of one variable are extended to the solutions of a class of nonelliptic complex vector fields.     

A Class of FBI Transforms

We introduce a class of FBI transforms whose phase functions may have a degenerate Hessian and present an application of these transforms to the microlocal analytic hypoellipticity of certain systems of vector fields.     

On the wave-front set of traces of CR functions on maximally real submanifolds

We prove that, in a locally integrable structure, the wave-front set of the trace of a CR function at a point in a totally real submanifold of maximal dimension is independent of the maximally real submanifold passing through the point .

     

The FBI transform on compact manifolds

We present a geometric theory of the Fourier-Bros-Iagolnitzer transform on a compact manifold . The FBI transform is a generalization of the classical notion of the wave-packet transform. We discuss the mapping properties of the FBI transform and its relationship to the calculus of pseudodifferential operators on . We also describe the microlocal properties of its range in terms of the ``scattering calculus' of pseudodifferential operators on the noncompact manifold .