PDES-2005 Reviewers

Message from the PDES-2005 Chairs

Many people have kindly helped us prepare and organize the PDES workshop. First of all, we would like to thank the ICPADS-2005 organization committee for their support, guidance, and help for making the workshop. We would like to greatly thank Prof. Jianhua Ma, Hosei University, and Prof. Laurence T. Yang, St. Francis Xavier University. They kindly helped us to organize this workshop as ICPADS-...

Computable scalar fields: A basis for PDE software

Partial differential equations (PDEs) are fundamental in the formulation of mathematical models of the physical world. Computer simulation of PDEs is an efficient and important tool in science and engineering. Implicit in this is the question of the computability of PDEs. In this context we present the notions of scalar and tensor fields, and discuss why these abstractions are useful for the pr...

PDEs for Tensor Image Processing

Methods based on partial differential equations (PDEs) belong to those image processing techniques that can be extended in a particularly elegant way to tensor fields. In this survey paper the most important PDEs for discontinuity-preserving denoising of tensor fields are reviewed such that the underlying design principles becomes evident. We consider isotropic and anisotropic diffusion filters...

Diophantine equations of nonlinear physics . Part 1 : Nonlinear evolution PDEs ∗

Nonclassical Potential Symmetries and New Explicit Solutions of the Burgers Equation

The symmetry group method is important and widely used in the reduction and construction of explicit solutions of PDEs (partial differential equations). As shown in [1 – 4], the Lie symmetry group method can be used to find explicit solutions of PDEs using symmetry reduction and construction. This method is known as the classical method. By a classical symmetry group of a system of PDEs we mean...