Cauchy problem

A Cauchy problem in mathematics asks for the solution of a partial differential equation that satisfies certain conditions that are given on a hypersurface in the domain.^[1] A Cauchy problem can be an initial value problem or a boundary value problem (for this case see also Cauchy boundary condition). It is named after Augustin-Louis Cauchy.

For a partial differential equation defined on Rⁿ⁺¹ and a smooth manifold S ⊂ Rⁿ⁺¹ of dimension n (S is called the Cauchy surface), the Cauchy problem consists of finding the unknown functions ${\displaystyle u_1,\dots ,u_N}$ of the differential equation with respect to the independent variables ${\displaystyle t,x_1,\dots ,x_n}$ that satisfies^[2] $${\displaystyle \begin{array}{cc}& \frac{{\partial }^{n_i}{u}_i}{\partial t^{n_i}}=F_i(t,x_1,\dots ,x_n,u_1,\dots ,u_N,\dots ,\frac{{\partial }^k{u}_j}{\partial t^{k_0}\partial x_1^{k_1}\dots \partial x_n^{k_n}},\dots )\\ & \text{for }i,j=1,2,\dots ,N;k_0+k_1+\dots +k_n=k\le n_j;k_0<n_j\end{array}}$$ subject to the condition, for some value ${\displaystyle t=t_0}$,

$${\displaystyle \frac{{\partial }^k{u}_i}{\partial t^k}={\varphi }_i^{(k)}(x_1,\dots ,x_n)\text{for }k=0,1,2,\dots ,n_i-1}$$

where ${\displaystyle {\varphi }_i^{(k)}(x_1,\dots ,x_n)}$ are given functions defined on the surface ${\displaystyle S}$ (collectively known as the Cauchy data of the problem). The derivative of order zero means that the function itself is specified.

The Cauchy–Kowalevski theorem states that If all the functions ${\displaystyle F_i}$ are analytic in some neighborhood of the point ${\displaystyle (t^0,x_1^0,x_2^0,\dots ,{\varphi }_{j,k_0,k_1,\dots ,k_n}^0,\dots )}$, and if all the functions ${\displaystyle {\varphi }_j^{(k)}}$ are analytic in some neighborhood of the point ${\displaystyle (x_1^0,x_2^0,\dots ,x_n^0)}$, then the Cauchy problem has a unique analytic solution in some neighborhood of the point ${\displaystyle (t^0,x_1^0,x_2^0,\dots ,x_n^0)}$.

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• Cauchy boundary condition
• Cauchy horizon

• Hille, Einar (1956)[1954]. Some Aspect of Cauchy's Problem Proceedings of 1954 ICM vol III section II (analysis half-hour invited address) p. 1 0 9 ~ 1 6.
• Sigeru Mizohata(溝畑 茂 1965). Lectures on Cauchy Problem. Tata Institute of Fundamental Research.
• Sigeru Mizohata (1985).On the Cauchy Problem. Notes and Reports in Mathematics in Science and Engineering. 3. Academic Press, Inc.. ISBN 9781483269061
• Arendt, Wolfgang; Batty, Charles; Hieber, Matthias; Neubrander, Frank (2001), Vector-valued Laplace Transforms and Cauchy Problems, Birkhauser.

• Cauchy problem at MathWorld.

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de:Anfangswertproblem#Partielle Differentialgleichungen