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Stencil_(numerical_analysis) abstract "In mathematics, especially the areas of numerical analysis concentrating on the numerical solution of partial differential equations, a stencil is a geometric arrangement of a nodal group that relate to the point of interest by using a numerical approximation routine. Stencils are the basis for many algorithms to numerically solve partial differential equations (PDE). Two examples of stencils are the five-point stencil and the Crank–Nicolson method stencil.Stencils are classified into two categories: compact and non-compact, the difference being the layers from the point of interest that are also used for calculation.In the notation used for one-dimensional stencils n-1, n, n+1 indicate the time steps where timestep n and n-1 have known solutions and time step n+1 is to be calculated. The spacial location of finite volumes used in the calculation are indicated by j-1, j and j+1.".
Stencil_(numerical_analysis) thumbnail Crank-Nicolson-stencil.svg?width=300.
Stencil_(numerical_analysis) wikiPageID "18558187".
Stencil_(numerical_analysis) wikiPageRevisionID "596283318".
Stencil_(numerical_analysis) hasPhotoCollection Stencil_(numerical_analysis).
Stencil_(numerical_analysis) subject Category:Numerical_differential_equations.
Stencil_(numerical_analysis) type Abstraction100002137.
Stencil_(numerical_analysis) type Communication100033020.
Stencil_(numerical_analysis) type DifferentialEquation106670521.
Stencil_(numerical_analysis) type Equation106669864.
Stencil_(numerical_analysis) type MathematicalStatement106732169.
Stencil_(numerical_analysis) type Message106598915.
Stencil_(numerical_analysis) type NumericalDifferentialEquations.
Stencil_(numerical_analysis) type Statement106722453.
Stencil_(numerical_analysis) comment "In mathematics, especially the areas of numerical analysis concentrating on the numerical solution of partial differential equations, a stencil is a geometric arrangement of a nodal group that relate to the point of interest by using a numerical approximation routine. Stencils are the basis for many algorithms to numerically solve partial differential equations (PDE).".
Stencil_(numerical_analysis) label "Stencil (numerical analysis)".
Stencil_(numerical_analysis) sameAs m.04f_9pg.
Stencil_(numerical_analysis) sameAs Q7607499.
Stencil_(numerical_analysis) sameAs Q7607499.
Stencil_(numerical_analysis) sameAs Stencil_(numerical_analysis).
Stencil_(numerical_analysis) wasDerivedFrom Stencil_(numerical_analysis)?oldid=596283318.
Stencil_(numerical_analysis) depiction Crank-Nicolson-stencil.svg.
Stencil_(numerical_analysis) isPrimaryTopicOf Stencil_(numerical_analysis).