Links and subcategories within the Differential Equations section are provided below.
Directory Links:
The general analytical solution for the Burgers equation is presented in terms of 4D commutative hypercomplex mathematics. The one general solution (4D characteristic function) is found to implicitly model planar shock waves, propagating diffusion front Link: http://home.comcast.net/~cmdaven/burgers.htm

The general analytical solution for the Kortewegde Vries equation is presented in terms of 4D commutative hypercomplex mathematics. The one general solution (4D characteristic function) is found to implicitly model fluid behavior, traveling waves, shoc Link: http://home.comcast.net/~cmdaven/korteweg.htm

Maple lessons for an undergraduate course in Differential Equations by Jim Herod. Link: http://www.mapleapps.com/powertools/pdes/pdes.shtml

Online course material Link: http://math.bu.edu/DYSYS/odebif/odebif.html

Explicit solutions provided for this particular type of equation and their relations to the heat equation, Burger's equation, and Euler's equation. Link: http://www.coolissues.com/mathematics/NavierStokes/nstokes.htm

Consortium of ODE Experiments at Harvey Mudd College. Newsletter, graphics, links. Link: http://www.math.hmc.edu/codee

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. Link: http://www.maths.gla.ac.uk/~ca

Contents Link: http://www.math.ohiostate.edu/~gerlach/math/BVtypset/node2.html

Various lecture notes by C. McMullen Link: http://www.math.harvard.edu/~ctm/courses.html

European TMR network coordinated at the Oxford Centre for Industrial and Applied Mathematics. Link: http://www2.maths.ox.ac.uk/ociam/TMR
