-
Notifications
You must be signed in to change notification settings - Fork 7
/
opt03_rj.m
75 lines (71 loc) · 2 KB
/
opt03_rj.m
1
2
3
4
5
6
7
8
9
10
11
12
13
14
15
16
17
18
19
20
21
22
23
24
25
26
27
28
29
30
31
32
33
34
35
36
37
38
39
40
41
42
43
44
45
46
47
48
49
50
51
52
53
54
55
56
57
58
59
60
61
62
63
64
65
66
67
68
69
70
71
72
73
74
75
function [ res, jac ] = opt03_rj ( x, flag, p )
%% OPT03_RJ evaluates R and J for test case #3.
%
% Discussion:
%
% This example is discussed in Dennis and Schnabel, pages 225-226 and 231.
%
% The behavior of the algorithm depends in part on the starting point X0,
% and on the value of the parameter P. Here is data for particular
% choices of P, and suggested values for X0.
%
% P X* FX* Suggested X0
% -- --------- -------- ------------
% 8 0.69315 0.0 1 or 0.6
% 3 0.44005 1.6390 1 or 0.5
% -1 0.044744 6.97655 1 or 0.0
% -4 -0.37193 16.435 1 or -0.3
% -8 -0.79148 41.145 1 or -0.7
%
% Modified:
%
% 10 January 2008
%
% Author:
%
% Jeff Borggaard,
% Gene Cliff,
% Virginia Tech.
%
% Reference:
%
% John Dennis, Robert Schnabel,
% Numerical Methods for Unconstrained Optimization
% and Nonlinear Equations,
% SIAM, 1996,
% ISBN13: 978-0-898713-64-0,
% LC: QA402.5.D44.
%
% Parameters:
%
% Input, real X(1), the evaluation point.
%
% Input, string FLAG, indicates what must be computed.
% 'f' means only the value of RES is needed,
% 'g' means only the value of JAC is needed,
% 'all' means RES and JAC are needed.
% It is acceptable to behave as though FLAG was 'all'
% on every call.
%
% Input, real P, a parameter which occurs in the function
% to be optimized. Typical values of P are 8, 3, -1, -4
% or -8.
%
% Output, real RES(3,1), the residual column vector.
%
% Output, real JAC(3,1), the jacobian matrix.
%
n = length ( x );
if ( n ~= 1 )
fprintf ( '\n' );
fprintf ( 'OPT03_RJ - Fatal error!\n' );
fprintf ( ' The input vector X should have length 1.\n'),
fprintf ( ' Instead, it has length = %d.\n', n );
keyboard
end
res(1,1) = exp ( x(1) ) - 2;
res(2,1) = exp ( 2 * x(1) ) - 4;
res(3,1) = exp ( 3 * x(1) ) - p;
jac(1,1) = exp ( x(1) );
jac(2,1) = 2 * exp ( 2 * x(1) );
jac(3,1) = 3 * exp ( 3 * x(1) );