how to optimize a function ( 6 independent variables) which is not smooth but has rough minimum point

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xueqi le 8 Juil 2014

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https://fr.mathworks.com/matlabcentral/answers/140995-how-to-optimize-a-function-6-independent-variables-which-is-not-smooth-but-has-rough-minimum-poin

Modifié(e) : xueqi le 9 Juil 2014

Dear fellows,

I have asked this question before in a previous post http://www.mathworks.co.uk/matlabcentral/answers/129592-how-to-optimize-a-function-which-is-no-smooth-but-has-rough-minimum-point

But now I realize though those replies do help in the case with only variable, they could not solve my problem. But in my problem, the function f contains 6 variables. And I want to minimize the function through the 6 variables? Could you offer me some advice please?

Thanks, Xueqi

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Matt J le 8 Juil 2014

Modifié(e) : Matt J le 8 Juil 2014

How is the situation critically different now that you have 6 variables, exactly? The general advice there was to smooth the surface. In particular, Alan Weiss' recommendation that you convolution-smooth the function can still be done in 6 dimensions.

xueqi le 9 Juil 2014

Modifié(e) : xueqi le 9 Juil 2014

Thank you. I just do not quite understand how to do it exactly. I have two major problems.

How to decide the range of the variables to be integrated. Alan suggested that take g(x) = int(f(t),x-0.5,x+0.5).I can not just take from x-0.5 to x+05. These variables are constrained, doing so would violate the constraints. Despite the problem of constraints, what is a proper range to be enough to smooth the function?
How to write the multiple integration? Denote the function as f(x1,x2,x3,x4,x5,x6). Could you show me how to correctly write the integration code?

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