dirichlet boundary condition

In mathematics, a Dirichlet boundary condition imposed on an ordinary differential equation or a partial differential equation specifies the values a solution is to take on the boundary of the domain. In the case of an ordinary differential equation such as

\frac{d^2y}{dx^2} + 3 y = 1 on the interval

0,1

the Dirichlet boundary conditions take the form

y(0) = 1

y(1) = 2

For a partial differential equation on a domain

\Omega\subset R^n

such as

\Delta y + y = 0 (

\Delta

denotes the laplacian), the Dirichlet boundary condition typically takes the form

y(x) = f(x) \quad \forall x \in \partial\Omega where

f

is a known function defined on the boundary ∂Ω. Dirichlet boundary conditions are perhaps the easiest to understand but there are many other conditions possible. For example, there is the Neumann boundary condition or the mixed boundary condition which is a combination of the Dirichlet and Neumann conditions.

<< Previous

Word Browser

Next >>

four star restaurant
regal zonophone records
video player
antifreeze
yeung sum
list of frigates
yokomitsu riichi
frank r. paul
social animal
united states two cent coin
thomas davis

vincent rijmen
wireless man
emily lau
lynn minmay
jared
ring tone transfer language
yellow tailed black cockatoo
privatism
glenn mcgrath
crisis theory
unionism

doc
say's phoebe
vb
new lantao bus
alemannic language
the ultimates
huey lewis
denominacin de origen
matt dillon
switch hitter
long win bus

gary titley
powiat of sucha beskidzka
sant cassia
highwayman
west middle german
jerry abershawe
document file format
the frugal gourmet
rumble fish
toroid
john nevison