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srchgol

1-D minimization using golden section search

Syntax

[a,gX,perf,retcode,delta,tol] = srchgol(net,X,Pd,Tl,Ai,Q,TS,dX,gX,perf,dperf,delta,tol,ch_perf)

Description

srchgol is a linear search routine. It searches in a given direction to locate the minimum of the performance function in that direction. It uses a technique called the golden section search.

[a,gX,perf,retcode,delta,tol] = srchgol(net,X,Pd,Tl,Ai,Q,TS,dX,gX,perf,dperf,delta,tol,ch_perf) takes these inputs,

net

Neural network

X

Vector containing current values of weights and biases

Pd

Delayed input vectors

Tl

Layer target vectors

Ai

Initial input delay conditions

Q

Batch size

TS

Time steps

dX

Search direction vector

gX

Gradient vector

perf

Performance value at current X

dperf

Slope of performance value at current X in direction of dX

delta

Initial step size

tol

Tolerance on search

ch_perf

Change in performance on previous step

and returns

a

Step size that minimizes performance

gX

Gradient at new minimum point

perf

Performance value at new minimum point

retcode

Return code that has three elements. The first two elements correspond to the number of function evaluations in the two stages of the search. The third element is a return code. These have different meanings for different search algorithms. Some might not be used in this function.

 0  Normal
 1  Minimum step taken
 2  Maximum step taken
 3  Beta condition not met
delta

New initial step size, based on the current step size

tol

New tolerance on search

Parameters used for the golden section algorithm are

alpha

Scale factor that determines sufficient reduction in perf

bmax

Largest step size

scale_tol

Parameter that relates the tolerance tol to the initial step size delta, usually set to 20

The defaults for these parameters are set in the training function that calls them. See traincgf, traincgb, traincgp, trainbfg, and trainoss.

Dimensions for these variables are

Pd

No-by-Ni-by-TS cell array

Each element P{i,j,ts} is a Dij-by-Q matrix.

Tl

Nl-by-TS cell array

Each element P{i,ts} is a Vi-by-Q matrix.

Ai

Nl-by-LD cell array

Each element Ai{i,k} is an Si-by-Q matrix.

where

Ni =net.numInputs
Nl =net.numLayers
LD =net.numLayerDelays
Ri =net.inputs{i}.size
Si=net.layers{i}.size
Vi=net.targets{i}.size
Dij=Ri * length(net.inputWeights{i,j}.delays)

More About

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Golden Section Search

The golden section search srchgol is a linear search that does not require the calculation of the slope. This routine begins by locating an interval in which the minimum of the performance function occurs. This is accomplished by evaluating the performance at a sequence of points, starting at a distance of delta and doubling in distance each step, along the search direction. When the performance increases between two successive iterations, a minimum has been bracketed. The next step is to reduce the size of the interval containing the minimum. Two new points are located within the initial interval. The values of the performance at these two points determine a section of the interval that can be discarded, and a new interior point is placed within the new interval. This procedure is continued until the interval of uncertainty is reduced to a width of tol, which is equal to delta/scale_tol.

Algorithms

srchgol locates the minimum of the performance function in the search direction dX, using the golden section search. It is based on the algorithm as described on page 33 of Scales (see reference below).

References

Scales, L.E., Introduction to Non-Linear Optimization, New York, Springer-Verlag, 1985

Version History

Introduced before R2006a