Optimization options parameter 'findiffrelstep'

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Pappu Murthy
Pappu Murthy el 4 de Oct. de 2014
Editada: Matt J el 8 de Oct. de 2014
I want to know exactly what this parameter is. i have two variables one is in the range 10 to 25 and other in the range 1000 to 2000... I am wondering whether setting findiffrelstep will improve my solution performance. Thanks in advance. Pappu murthy

Respuestas (1)

Matt J
Matt J el 5 de Oct. de 2014
The description at the FMINUNC webpage is pretty detailed.
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Pappu Murthy
Pappu Murthy el 8 de Oct. de 2014
Thanks for the valueable insights you are giving. I am sure my function is not differentiable in closed form. It involves a lot of computations which are done using a complicated fortran program as I mentioned earlie. That said, I have no reasons to believe there are 'undifferentiable' aspects to the compuations. I do have actually 5 parameters. The two parameter case is a sub case for testing purposes. I can try "fminsearch" if that can do the job. However, by scaling I am able to move properly all the 5 parameters now. I just divied one parameter by 100 and that seemed to do that job. Not sure though, whether I am doing this correctly. Now the question is i dod have sqrt in my least squares operation. But why should it matter? It is not doing a closed form differentiation anyway. So for finite difference it should not matter at all. Right?
Matt J
Matt J el 8 de Oct. de 2014
Editada: Matt J el 8 de Oct. de 2014
It is not doing a closed form differentiation anyway. So for finite difference it should not matter at all. Right?
No, the theory of the algorithms assumes that the function is twice continuously differentiable. I'm not sure what distinction you're drawing between "closed-form differentiable" and other kinds. Either the function is continuously differentiable, or it's not. If it is not, the assumptions of the algorithm are violated, and that's the end of the story.
Finite difference operations are just a way of approximating the true derivative. The algorithm performs better if you provide an analytical gradient calculation (whether or not it is closed form). If the true derivative doesn't exist, the finite difference will not produce anything more useful. It will produce some unstable value greatly depending on the delta step size you use.

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