zero_muller


zero_muller, a C++ code which seeks a root of a nonlinear equation using Muller's method, with complex arithmetic.

Licensing:

The information on this web page is distributed under the MIT license.

Languages:

zero_muller is available in a C version and a C++ version and a Fortran77 version and a Fortran90 version and a MATLAB version and an Octave version.

Related Data and Programs:

zero_muller_test

bisection, a C++ code which applies the bisection method to seek a root of f(x) over a change-of-sign interval a <= x <= b.

bisection_integer, a C++ code which seeks an integer solution to the equation F(X)=0, using bisection within a user-supplied change of sign interval [A,B].

bisection_rc, a C++ code which seeks a solution to the equation F(X)=0 using bisection within a user-supplied change of sign interval [A,B]. The procedure is written using reverse communication.

fsolve, a C++ code which seeks the solution x of one or more nonlinear equations f(x)=0.

root_rc, a C++ code which seeks a solution of a scalar nonlinear equation f(x) = 0, or a system of nonlinear equations, using reverse communication (RC), by Gaston Gonnet.

test_zero, a C++ code which defines some test functions for which zeroes can be sought.

zero_brent, a C++ code which seeks a solution of a scalar nonlinear equation f(x) = 0, by Richard Brent.

zero_chandrupatla, a C++ code which finds a zero of a scalar function of a scalar variable, starting from a change of sign interval, using the Chandrupatla method, which can converge faster than bisection, regula falsi, or Brent's method, by Tirupathi Chandrapatla.

zero_itp, a C++ code which finds a zero of a scalar function of a scalar variable, starting from a change of sign interval, using the Interpolate/Truncate/Project (ITP) method, which has faster convergence than the bisection method.

zero_rc, a C++ code which seeks solutions of a scalar nonlinear equation f(x) = 0, or a system of nonlinear equations, using reverse communication (RC).

Reference:

  1. Gisela Engeln-Muellges, Frank Uhlig,
    Numerical Algorithms with C,
    Springer, 1996,
    ISBN: 3-540-60530-4,
    LC: QA297.E56213.

Source Code:


Last revised on 29 March 2024.