How to implement numerical solvers

2 visualizzazioni (ultimi 30 giorni)

Mostra commenti meno recenti

Kevin Hanekom il 29 Gen 2022

0
Link

Link diretto a questa domanda

https://it.mathworks.com/matlabcentral/answers/1638695-how-to-implement-numerical-solvers

Commentato: Image Analyst il 19 Apr 2022

Sorry! It turned out I just needed to focus on it more myself, a little too niche! Thank you all for the help.

7 Commenti
Mostra 5 commenti meno recentiNascondi 5 commenti meno recenti

Kevin Hanekom il 29 Gen 2022

Thats anouther source of the confussion I am having when trying to optimize my parameter values, becuase the "max" value is different for every oriention. One way I may be able to solve this is to average the maximum stress, to make that highest stress value you see equal to 1, and then use the same "max" value to show the differing stress per orientation.

Image Analyst il 19 Apr 2022

@Kevin Hanekom, so did Star's answer below solve it???

Accedi per commentare.

Accedi per rispondere a questa domanda.

Risposte (1)

Star Strider il 29 Gen 2022

0
Link

Link diretto a questa risposta

https://it.mathworks.com/matlabcentral/answers/1638695-how-to-implement-numerical-solvers#answer_884425

Apri in MATLAB Online

The function needs to be changed so that it accepts one vector of parameters (‘b’ here) and produces a scalar value for ‘S’. Just now, it does not, and returns ‘S’ as a matrix:

b = rand(3,1)
b = 3×1
    0.4067
    0.4213
    0.0238
[S] = YieldCriteriaOptimization(b)
S = 3×3
    0.0238   -0.0002    0.0002
   -0.0002    0.0000   -0.0000
    0.0002   -0.0000    0.0000
function [S] = YieldCriteriaOptimization(b)
ZZ = b(1);
psi = b(2);
max = b(3);
Ry = [ cosd(ZZ) 0 sind(ZZ) ; 0 1 0; -sind(ZZ) 0 cosd(ZZ)];
Rz = [cosd(psi) -sind(psi) 0 ; sind(psi) cosd(psi) 0; 0 0 1];
R = Ry*Rz;
SigmaPrime = [[max 0 0];[0 0 0];[0 0 0];]; %unidirectional test applied in x'
S = R\SigmaPrime*R;
end

I have no idea what ‘S’ represents, so I have no idea how to transform it into a scalar. One option might be the calculate its determinant with the det function or its norm with norm, however I have no idea if either of those are even close to being appropriate.

It just somehow magickally needs to be come a scalar.