Lax–Wendroff theorem
In computational mathematics, the Lax–Wendroff theorem, named after Peter Lax and Burton Wendroff, states that if a conservative numerical scheme for a hyperbolic system of conservation laws converges, then it converges towards a weak solution.
See also
References
- Randall J. LeVeque, Numerical methods for conservation laws, Birkhäuser, 1992 {{ISBN|978-3-7643-2723-1}}
{{DEFAULTSORT:Lax-Wendroff theorem}}
Category:Numerical differential equations
Category:Computational fluid dynamics
Category:Theorems in mathematical analysis
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