2. Spectral discretization of an elliptic equation
We'll start by describing spectral discretization in the case of a model problem: the Laplace equation with homogeneous Dirichlet boundary conditions. We'll then look at how to deal with more complex boundary conditions. Finally, we will allude to the various equations in mechanics and physics that have been discretized by spectral methods, and give references for more detailed results.
2.1 Discretization of a Laplace equation
We first consider the basic equation in the square or cube Ω
Exclusive to subscribers. 97% yet to be discovered!
Already subscribed? Log in!
Spectral discretization of an elliptic equation
Article included in this offer
"Mathematics"
(
167 articles
)
Updated and enriched with articles validated by our scientific committees
A set of exclusive tools to complement the resources
Bibliography
Exclusive to subscribers. 97% yet to be discovered!
Already subscribed? Log in!