Does /sci/ have any good resources on learning about PDEs and how to numerically solve them?
>>8191315
yes
>>8191350
Tell me
>>8191357
what kind of PDE? What order? Homogeneous? Lineal?
>>8191315
finite differences or finite element? what sort of equation?
>>8191362
anyway, I'll tell you a good book about DE ingeneral. Boyce-DiPrima, brilliant.
>>8191315
Just use integral equations
>>8191315
Taylor's books are pretty good.
Mathematica has always worked miracles for me.
>>8191315
.....go to school??
Why do people ask these stupid questions?
>>8191315
Do you already know methods for ODEs?
If not then that's where you should start, since most PDE solvers discretise the PDE into a system of ODEs which have to be solved.
After that, you need to decide what types of PDEs you want to solve (hyperbolic/parabolic/elliptic).
Then you can get into detail about the approach (finite differences / finite volumes / finite elements etc.)