Dirichlet Problem
In
mathematics
,
Dirichlet problems
are a class of
partial differential equation
(PDE) problems which ask you to solve for the values of a function in a region given the value of the function on the boundary of that region. This requirement is called the Dirichlet
boundary condition
, for the partial differential equation that the function satisfies within the region. Dirichlet problems are typical of
elliptic partial differential equations
, and
potential theory
, and the
Laplace equation
in particular. Other examples include equations involving the
bilaplacian
, in
elasticity theory
. They are one of several types of classes of PDE problems defined by the information given at the boundary, including
Neumann problems
and
Cauchy problems
.
External links
http://mathworld.wolfram.com/BoundaryConditions.html
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