Encyclopedia > Runge-Kutta method

  Article Content

Runge-Kutta methods

Redirected from Runge-Kutta method

The Runge-Kutta methods are a family of numerical analysis techniques used for the approximation of solutions of ordinary differential equations. They were developed around 1900 by the mathematicians C. Runge[?] and M.W. Kutta[?]. The fourth-order formulation ("RK4") is the most commonly used, since it provides substantial accuracy without excessive complexity.

If y' = f(t,y) is a differential equation and its value at some initial time is specified by y(t0) = y0, then the RK4 method is given by the following equation:

<math> y_{k+1} = y_k + {h \over 6} \left[ k_1 + 2k_2 + 2k_3 + k_4 \right] </math>

where

<math> k_1 = f \left( t_n, y_n \right) </math>

<math> k_2 = f \left( t_n + {h \over 2}, y_n + {h \over 2} k_1 \right) </math>

<math> k_3 = f \left( t_n + {h \over 2}, y_n + {h \over 2} k_2 \right) </math>

<math> k_4 = f \left( t_n + h, y_n + hk_3 \right) </math>

Thus, the next value (yn+1) is determined by the present value (yn) plus the product of the size of the interval (h) and an estimated slope. The slope is a weighted average of slopes:

  • k1 is the slope at the beginning of the interval;
  • k2 is the slope at the midpoint of the interval, using slope k1 to determine the value of y at the point tn + h/2 using Euler's formula;
  • k3 is again the slope at the midpoint, but now using the slope k2 to determine the y-value;
  • k4 is the slope at the end of the interval, with its y-value determined using k3.

When the four slopes are averaged, more weight is given to the slopes at the midpoint:

<math>\mbox{slope} = \frac{k_1 + 2k_2 + 2k_3 + k_4}{6}</math>

Iterative methods in general may be represented by the generic form yn+1 = cyn, where c is a coefficient that depends upon the method used and the equation being evaluated. The primary reason that the RK4 method is successful is that the coefficient c that it produces is almost always a very good approximation to the actual value. Indeed, the RK4 method has a total accumulated error of O(h4).



All Wikipedia text is available under the terms of the GNU Free Documentation License

 
  Search Encyclopedia

Search over one million articles, find something about almost anything!
 
 
  
  Featured Article
Jamesport, New York

... who is 65 years of age or older. The average household size is 2.41 and the average family size is 2.88. In the town the population is spread out with 20.6% under the age ...

 
 
 
This page was created in 25.9 ms