Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free, no registration required.

How to compute the maximum of a smooth function defined on [a,b] in Fortran ? For simplicity, a polynomial function.

The background is that almost all numerical flux(a concept in numerical PDE) involves computing the maximum of certain function over an interval [a,b].

share|improve this question
See Numerical Recipes in Fortran nrbook.com/a/bookfpdf.php –  QuentinUK Mar 9 '13 at 15:03

1 Answer 1

up vote 1 down vote accepted

For a 1-D problem with smooth and readily-computed derivatives, use Newton-Raphson to find zeros of the first derivative.

For multiple dimensions, and readily-computed derivatives, you're better off using a method that approximates the Hessian. There are several methods of this type, but I've found the L-BFGS method to be reliable and efficient. There a convenient, BSD-licensed package provided by a group at Northwestern University. There's also quite a bit of well-tested code at http://www.netlib.org/

share|improve this answer
Thank you! Quite comprehensive! –  booksee Mar 9 '13 at 15:42
I tried the package provided by Northwestern Univ., but it did not work well enough. I used it to minimize sin(x) over [-1,5], whose result of course should be -1. Setting the initial value of x = 1, I got the minimum -0.8xxxx and the point was -1. It can be seen that the package found a LOCAL minimum instead of a GLOBAL one. Finding a global minimum is a common difficulty for people researching optimization, but I think people designing the package SHOULD correctly solve the problem I posed because right derivative of sin(x) at -1 is far from ZERO. –  booksee Mar 13 '13 at 13:40
@booksee: All gradient-based minimizers are local. In fact, most minimizers are local. Global optimization is an NP-complete problem. Also, sin(-1) is not a minimum. Sine extrema occur at sin((n+1)pi/2). Moreover, all sine local minima are global minima. The fact that you're stopping at something other than -pi/2 (about -1.6) suggests that your function or its derivative has a bug. –  sfstewman Mar 13 '13 at 14:57
It seems that you misunderstood my opinion or I didn't state it clearly enough.-_-... I mean the package produced the following results: in [-1,5] min_sin(x)= -0.8xxx when x=-1, while the TRUTH should be min_sin(x) = -1 when x=1.5*pi approximately 4.712, which belongs to [-1,5]. I hope they could put more initial searching points, distributed uniformly in the interval, to avoid producing the problem I described. –  booksee Mar 15 '13 at 3:47
@booksee: Gradient minimizers start from one initial searching point, and search for a local minimum. The user can start them from additional searching points, but selecting a good starting point requires some knowledge of the function, and the minimizer has no such knowledge. If you're truly looking for a global minimizers, consider a simulated annealing or other heuristic approach. –  sfstewman Mar 15 '13 at 15:33

Your Answer


By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.