| Analytic Solution for the Burgers Equation | | Provides the general analytic solution for the Burgers equation in the form of a 4-D commutative hypercomplex function. The solution exhibits the main dynamic features in a Burgers medium: propagation of disturbances, shock waves, propagating state change fronts, and solitons. A page is included to explain the hypercomplex mathematics. |
| C*ODE*E Archive | | Consortium of ODE Experiments at Harvey Mudd College. Newsletter, graphics, links. |
| Computational PDEs Unit | | School of Computing, University of Leeds. Research details, publications, software and resources. |
| GetDP (a General environment for the treatment of Discrete Problems) | | A scientific software environment for the numerical solution of integro-differential equations, open to the coupling of physical problems (electromagnetic, acoustic, thermal, mechanical, ...) as well as of numerical methods (finite element methods, boundary element and integral methods, ...). |
| Introduction to Green's Functions | | Green's functions play an important role in the solution of linear ordinary and partial differential equations, and are a key component to the development of boundary integral equation methods. |
| MGNet | | Information related to multigrid, multilevel, multiscale, aggregation, defect correction, and domain decomposition methods. |
| Navier-Stokes Type Equations | | Explicit solutions provided for this particular type of equation and their relations to the heat equation, Burger's equation, and Euler's equation. |
| Nonlinear Differential Equations at Glasgow | | The site describes research activities of the differential equations group in the mathematics department at the university of Glasgow, UK, and provides some resources of a general nature. |
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