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List of Runge–Kutta methods

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Runge–Kutta methods are methods for the numerical solution of the ordinary differential equation

Explicit Runge–Kutta methods take the form

Stages for implicit methods of s stages take the more general form, with the solution to be found over all s

Each method listed on this page is defined by its Butcher tableau, which puts the coefficients of the method in a table as follows:

For adaptive and implicit methods, the Butcher tableau is extended to give values of , and the estimated error is then

.

Explicit methods

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The explicit methods are those where the matrix is lower triangular.

First-order methods

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Forward Euler

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The Euler method is first order. The lack of stability and accuracy limits its popularity mainly to use as a simple introductory example of a numeric solution method.

Second-order methods

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Generic second-order method

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Second-order methods can be generically written as follows:[1]

with α ≠ 0.

Explicit midpoint method

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The (explicit) midpoint method is a second-order method with two stages (see also the implicit midpoint method below):

Heun's method

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Heun's method is a second-order method with two stages. It is also known as the explicit trapezoid rule, improved Euler's method, or modified Euler's method:

Ralston's method

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Ralston's method is a second-order method[2] with two stages and a minimum local error bound:

Third-order methods

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Generic third-order method

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Third-order methods can be generically written as follows:[1]

with α ≠ 0, α23, β ≠ 0, and αβ.

Kutta's third-order method

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Heun's third-order method

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Ralston's third-order method

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Ralston's third-order method[2] has a minimum local error bound and is used in the embedded Bogacki–Shampine method.

Van der Houwen's/Wray's third-order method

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Third-order Strong Stability Preserving Runge-Kutta (SSPRK3)

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Fourth-order methods

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Classic fourth-order method

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The "original" Runge–Kutta method.[3]

3/8-rule fourth-order method

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This method doesn't have as much notoriety as the "classic" method, but is just as classic because it was proposed in the same paper (Kutta, 1901).[3]

Ralston's fourth-order method

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This fourth order method[2] has minimum truncation error.

Embedded methods

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The embedded methods are designed to produce an estimate of the local truncation error of a single Runge–Kutta step, and as result, allow to control the error with adaptive stepsize. This is done by having two methods in the tableau, one with order p and one with order p-1.

The lower-order step is given by

where the are the same as for the higher order method. Then the error is

which is . The Butcher Tableau for this kind of method is extended to give the values of

Heun–Euler

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The simplest adaptive Runge–Kutta method involves combining Heun's method, which is order 2, with the Euler method, which is order 1. Its extended Butcher Tableau is:

The error estimate is used to control the stepsize.

Fehlberg RK1(2)

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The Fehlberg method[4] has two methods of orders 1 and 2. Its extended Butcher Tableau is:

0
1/2 1/2
1 1/256 255/256
1/512 255/256 1/512
1/256 255/256 0

The first row of b coefficients gives the second-order accurate solution, and the second row has order one.

Bogacki–Shampine

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The Bogacki–Shampine method has two methods of orders 2 and 3. Its extended Butcher Tableau is:

0
1/2 1/2
3/4 0 3/4
1 2/9 1/3 4/9
2/9 1/3 4/9 0
7/24 1/4 1/3 1/8

The first row of b coefficients gives the third-order accurate solution, and the second row has order two.

Fehlberg

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The Runge–Kutta–Fehlberg method has two methods of orders 5 and 4; it is sometimes dubbed RKF45 . Its extended Butcher Tableau is:

The first row of b coefficients gives the fifth-order accurate solution, and the second row has order four. The coefficients here allow for an adaptive stepsize to be determined automatically.

Cash-Karp

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Cash and Karp have modified Fehlberg's original idea. The extended tableau for the Cash–Karp method is

0
1/5 1/5
3/10 3/40 9/40
3/5 3/10 −9/10 6/5
1 −11/54 5/2 −70/27 35/27
7/8 1631/55296 175/512 575/13824 44275/110592 253/4096
37/378 0 250/621 125/594 0 512/1771
2825/27648 0 18575/48384 13525/55296 277/14336 1/4

The first row of b coefficients gives the fifth-order accurate solution, and the second row has order four.

Dormand–Prince

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The extended tableau for the Dormand–Prince method is

0
1/5 1/5
3/10 3/40 9/40
4/5 44/45 −56/15 32/9
8/9 19372/6561 −25360/2187 64448/6561 −212/729
1 9017/3168 −355/33 46732/5247 49/176 −5103/18656
1 35/384 0 500/1113 125/192 −2187/6784 11/84
35/384 0 500/1113 125/192 −2187/6784 11/84 0
5179/57600 0 7571/16695 393/640 −92097/339200 187/2100 1/40

The first row of b coefficients gives the fifth-order accurate solution, and the second row gives the fourth-order accurate solution.

Implicit methods

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Backward Euler

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The backward Euler method is first order. Unconditionally stable and non-oscillatory for linear diffusion problems.

Implicit midpoint

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The implicit midpoint method is of second order. It is the simplest method in the class of collocation methods known as the Gauss-Legendre methods. It is a symplectic integrator.

Crank-Nicolson method

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The Crank–Nicolson method corresponds to the implicit trapezoidal rule and is a second-order accurate and A-stable method.

Gauss–Legendre methods

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These methods are based on the points of Gauss–Legendre quadrature. The Gauss–Legendre method of order four has Butcher tableau:

The Gauss–Legendre method of order six has Butcher tableau:

Diagonally Implicit Runge–Kutta methods

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Diagonally Implicit Runge–Kutta (DIRK) formulae have been widely used for the numerical solution of stiff initial value problems; [5] the advantage of this approach is that here the solution may be found sequentially as opposed to simultaneously.

The simplest method from this class is the order 2 implicit midpoint method.

Kraaijevanger and Spijker's two-stage Diagonally Implicit Runge–Kutta method:

Qin and Zhang's two-stage, 2nd order, symplectic Diagonally Implicit Runge–Kutta method:

Pareschi and Russo's two-stage 2nd order Diagonally Implicit Runge–Kutta method:

This Diagonally Implicit Runge–Kutta method is A-stable if and only if . Moreover, this method is L-stable if and only if equals one of the roots of the polynomial , i.e. if . Qin and Zhang's Diagonally Implicit Runge–Kutta method corresponds to Pareschi and Russo's Diagonally Implicit Runge–Kutta method with .

Two-stage 2nd order Diagonally Implicit Runge–Kutta method:

Again, this Diagonally Implicit Runge–Kutta method is A-stable if and only if . As the previous method, this method is again L-stable if and only if equals one of the roots of the polynomial , i.e. if . This condition is also necessary for 2nd order accuracy.

Crouzeix's two-stage, 3rd order Diagonally Implicit Runge–Kutta method:

Crouzeix's three-stage, 4th order Diagonally Implicit Runge–Kutta method:

with .

Three-stage, 3rd order, L-stable Diagonally Implicit Runge–Kutta method:

with

Nørsett's three-stage, 4th order Diagonally Implicit Runge–Kutta method has the following Butcher tableau:

with one of the three roots of the cubic equation . The three roots of this cubic equation are approximately , , and . The root gives the best stability properties for initial value problems.

Four-stage, 3rd order, L-stable Diagonally Implicit Runge–Kutta method

Lobatto methods

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There are three main families of Lobatto methods,[6] called IIIA, IIIB and IIIC (in classical mathematical literature, the symbols I and II are reserved for two types of Radau methods). These are named after Rehuel Lobatto[6] as a reference to the Lobatto quadrature rule, but were introduced by Byron L. Ehle in his thesis.[7] All are implicit methods, have order 2s − 2 and they all have c1 = 0 and cs = 1. Unlike any explicit method, it's possible for these methods to have the order greater than the number of stages. Lobatto lived before the classic fourth-order method was popularized by Runge and Kutta.

Lobatto IIIA methods

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The Lobatto IIIA methods are collocation methods. The second-order method is known as the trapezoidal rule:

The fourth-order method is given by

These methods are A-stable, but neither L-stable nor B-stable [8]

Lobatto IIIB methods

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The Lobatto IIIB methods are not collocation methods, but they can be viewed as discontinuous collocation methods (Hairer, Lubich & Wanner 2006, §II.1.4). The second-order method is given by

The fourth-order method is given by

Lobatto IIIB methods are A-stable, but neither L-stable nor B-stable[6].

Lobatto IIIC methods

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The Lobatto IIIC methods also are discontinuous collocation methods. The second-order method is given by

The fourth-order method is given by

They are L-stable. They are also algebraically stable and thus B-stable, that makes them suitable for stiff problems.

Lobatto IIIC* methods

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The Lobatto IIIC* methods are also known as Lobatto III methods (Butcher, 2008), Butcher's Lobatto methods (Hairer et al., 1993), and Lobatto IIIC methods (Sun, 2000) in the literature.[6] The second-order method is given by

Butcher's three-stage, fourth-order method is given by

These methods are not A-stable, B-stable or L-stable. The Lobatto IIIC* method for is sometimes called the explicit trapezoidal rule.

Generalized Lobatto methods

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One can consider a very general family of methods with three real parameters by considering Lobatto coefficients of the form

,

where

.

For example, Lobatto IIID family introduced in (Nørsett and Wanner, 1981), also called Lobatto IIINW, are given by

and

These methods correspond to , , , and . The methods are L-stable. They are algebraically stable and thus B-stable.

Radau methods

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Radau methods are fully implicit methods (matrix A of such methods can have any structure). Radau methods attain order 2s − 1 for s stages. Radau methods are A-stable, but expensive to implement. Also they can suffer from order reduction.

Radau IA methods

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The first order method is similar to the backward Euler method and given by

The third-order method is given by

The fifth-order method is given by

Radau IIA methods

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The ci of this method are zeros of

.

The first-order method is equivalent to the backward Euler method.

The third-order method is given by

The fifth-order method is given by

Notes

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  1. ^ a b Butcher, John C. (2003). Numerical Methods for Ordinary Differential Equations. John Wiley. ISBN 978-0-471-96758-3.
  2. ^ a b c Ralston, Anthony (1962). "Runge-Kutta Methods with Minimum Error Bounds". Math. Comput. 16 (80): 431–437. doi:10.1090/S0025-5718-1962-0150954-0.
  3. ^ a b Kutta, Martin (1901). "Beitrag zur näherungsweisen Integration totaler Differentialgleichungen". Zeitschrift für Mathematik und Physik. 46: 435–453.
  4. ^ Fehlberg, E. (July 1969). Low-order classical Runge-Kutta formulas with stepsize control and their application to some heat transfer problems (NASA Technical Report R-315).
  5. ^ For discussion see: Christopher A. Kennedy; Mark H. Carpenter (2016). "Diagonally Implicit Runge-Kutta Methods for Ordinary Differential Equations. A Review". Technical Memorandum, NASA STI Program.
  6. ^ a b c d See Laurent O. Jay (N.D.). "Lobatto methods". University of Iowa
  7. ^ Ehle (1969)
  8. ^ Cite error: The named reference jay was invoked but never defined (see the help page).

References

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