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In mathematics, the Dirichlet (or first-type) boundary condition is a type of boundary condition, named after Peter Gustav Lejeune Dirichlet (1805–1859).^[1] When imposed on an ordinary or a partial differential equation, it specifies the values that a solution needs to take on the boundary of the domain.

The question of finding solutions to such equations is known as the Dirichlet problem. In engineering applications, a Dirichlet boundary condition may also be referred to as a fixed boundary condition.

Examples

ODE

For an ordinary differential equation, for instance:

y^{″} + y = 0

the Dirichlet boundary conditions on the interval $[a, b]$ take the form:

y (a) = α and y (b) = β

where $α$ and $β$ are given numbers.

PDE

For a partial differential equation, for instance:

\nabla^{2} y + y = 0

where $\nabla^{2}$ denotes the Laplacian, the Dirichlet boundary conditions on a domain $Ω \subset ℝ^{n}$ take the form:

y (x) = f (x) \forall x \in \partial Ω

where f is a known function defined on the boundary $\partial Ω$ .

Engineering applications

For example, the following would be considered Dirichlet boundary conditions:

In mechanical engineering (beam theory), where one end of a beam is held at a fixed position in space.
In thermodynamics, where a surface is held at a fixed temperature.
In electrostatics, where a node of a circuit is held at a fixed voltage.
In fluid dynamics, the no-slip condition for viscous fluids states that at a solid boundary, the fluid will have zero velocity relative to the boundary.

Other boundary conditions

Many other boundary conditions are possible, including the Cauchy boundary condition and the mixed boundary condition. The latter is a combination of the Dirichlet and Neumann conditions.

References

↑ Cheng, A. and D. T. Cheng (2005). Heritage and early history of the boundary element method, Engineering Analysis with Boundary Elements, 29, 268–302.

[1] Cheng, A. and D. T. Cheng (2005). Heritage and early history of the boundary element method, Engineering Analysis with Boundary Elements, 29, 268–302.

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+In [[mathematics]], the '''Dirichlet''' (or '''first-type''') '''boundary condition''' is a type of [[boundary condition]], named after [[Peter Gustav Lejeune Dirichlet]] (1805–1859).<ref>Cheng, A. and D. T. Cheng (2005). Heritage and early history of the boundary element method, ''Engineering Analysis with Boundary Elements'', '''29''', 268–302.</ref> When imposed on an [[ordinary differential equation|ordinary]] or a [[partial differential equation]], it specifies the values that a solution needs to take on the [[boundary (topology)|boundary]] of the domain.
+The question of finding solutions to such equations is known as the [[Dirichlet problem]]. In engineering applications, a Dirichlet boundary condition may also be referred to as a '''fixed boundary condition'''.
+==Examples==
+===ODE===
+For an [[ordinary differential equation]], for instance:
+:<math>y'' + y = 0~</math>
+the Dirichlet boundary conditions on the interval <math>[a, \, b]</math> take the form:
+:<math>y(a)= \alpha \ \text{and} \ y(b) = \beta</math>
+where <math>\alpha</math> and <math>\beta</math> are given numbers.
+===PDE===
+For a [[partial differential equation]], for instance:
+:<math>\nabla^2 y + y = 0</math>
+where <math>\nabla^2</math> denotes the [[Laplace operator|Laplacian]], the Dirichlet boundary conditions on a domain <math>\Omega \subset \mathbb{R}^n</math> take the form:
+:<math>y(x) = f(x) \quad \forall x \in \partial\Omega</math>
+where ''f'' is a known [[function (mathematics)|function]] defined on the boundary <math>\partial\Omega</math>.
+===Engineering applications===
+For example, the following would be considered Dirichlet boundary conditions:
+* In [[mechanical engineering]] ([[Euler–Bernoulli beam theory#Boundary considerations|beam theory]]), where one end of a beam is held at a fixed position in space.
+* In [[thermodynamics]], where a surface is held at a fixed temperature.
+* In [[electrostatics]], where a node of a circuit is held at a fixed voltage.
+* In [[fluid dynamics]], the [[no-slip condition]] for viscous fluids states that at a solid boundary, the fluid will have zero velocity relative to the boundary.
+==Other boundary conditions==
+Many other boundary conditions are possible, including the [[Cauchy boundary condition]] and the [[mixed boundary condition]]. The latter is a combination of the Dirichlet and [[Neumann boundary condition|Neumann]] conditions.
+==See also==
+*[[Neumann boundary condition]]
+*[[Mixed boundary condition]]
+*[[Robin boundary condition]]
+*[[Cauchy boundary condition]]
+*[[Different Types of Boundary Conditions in Fluid Dynamics]]
+==References==
+<references />
+{{DEFAULTSORT:Dirichlet Boundary Condition}}
+[[Category:Boundary conditions]]

Interval class: Difference between revisions

Revision as of 23:50, 11 March 2013

Contents

Examples

ODE

PDE

Engineering applications

Other boundary conditions

See also

References

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Interval class: Difference between revisions

Revision as of 23:50, 11 March 2013

Examples

ODE

PDE

Engineering applications

Other boundary conditions

See also

References

Navigation menu

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