Minimize a function of a single variable using golden section search
Returns the argument that minimizes a function of a single variable using golden section search, a search algorithm similar to bisection search except that the size of the intervals is chosen so that function evaluations can be reused more effectively. The golden section works fine with discontinuities, asymptotes, or oscillations that would throw off derivative-based methods but is somewhat slower to converge, likely requiring more function evaluations.
$ npm install minimize-golden-section-1d
Returns the argument that minimizes the function:
var minimize = require('minimize-golden-section-1d');
minimize(Math.cos)
// => 3.1415926622945616
minimize(Math.cos, {lowerBound: 0, upperBound: 1});
// => 1
minimize(Math.cos, {guess: -3});
// => -3.1415926432597825
Given function f
of one Number
-valued variable, computes a local minimum. On successful completion, returns the value of the argument that minimizes f
(note that this may either be a local or global minimum in the provided range). If the algorithm fails (i.e. if max iterations exceeded, NaN
encountered, or unbounded divergence of the argument to Infinity
), returns NaN
.
If bounds are provided, this module proceeds immediately with golden section search. If upper, lower or both bounds are not provided, the algorithm will make use of an initial guess (a provided guess or just one of the bounds if that's all it has) and expand the search range until a minimum is bracketed.
tolerance [=1e-8]
: Convergence tolerance. Algorithm continues until search interval is smaller thantolerance
.lowerBound [=-Infinity]
: Lower bound of the search intervalupperBound [=Infinity]
: Upper bound of the search intervalmaxIterations [=100]
: Maximum number of iterations for either bracketing or search phase.guess [=0]
: initial guess for unbounded minimization. Unused unless bothupperBound
andlowerBound
are not provided.initialIncrement [=1]
: Initial interval by which to expand the search interval for unbounded minimization. Unused unless bothupperBound
andlowerBound
are not provided.
If status
object is provided, the following outputs are written in place:
status.converged
(Boolean
):true
if algorithm succeededstatus.iterations
(Number
): number of iterationsstatus.minimum
(Number
): minimum value of the function achieved before exiting, whether the algorithm converged or notstatus.argmin
(Number
): best guess of argmin achieved before exiting, whether the algorithm converged or not.
© 2015 Scijs. MIT License.
Ricky Reusser