# Is there a quadratic programming library in C++?

The only Google search result I found is QuadProg++ but it can not solve the quadratic programming problem whose matrix is not applicable for Cholesky decomposition.

So can anyone give me some suggestion on other library? Thanks.

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Sorry for stating the obvious but I had to check Wikipedia to find out what quadratic programming is and I saw it contains references to a few implementations, have you checked those? Or maybe hqp.sourceforge.net/index.html or gnu.org/s/gsl would help? –  rve Nov 6 '11 at 8:04
@rve I check the gsl, it does not have a quadratic programming solver function. I also checked the wiki, most of them are either not written in C/c++ or very hard to setup.. I will check the hqp to see whether it work, thanks –  Daniel Gao Nov 6 '11 at 15:07
How could a matrix be non-applicable to Cholesky decomposition? Any symmetric positive-semidefinite matrix is applicable (and decomposition takes ~n^3/3 FLOPs). Expression \$x^TQx\$ can always be (re-)written with \$Q\$ being symmetric. Do you mean, that it is not positive-semidefinite? –  fiktor May 28 '12 at 8:23
QuadProg++ requires the matrix to be positive definite, not positive semi-definite. –  Ben-Uri Jul 19 '12 at 17:05
Did you find a a solution for this? If so, can you please post it here? –  Ben-Uri Jul 19 '12 at 17:10
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LAPACK has a number of Cholesky decomposition routines (they call it Cholesky factorization). There are C++ wrappers available for LAPACK (see this SO question for a list).

The answer from Anycom in that post is a bit cryptic, but he meant that there are LAPACK bindings that can be used together with Boost's linear algebra library, uBLAS.

I've found this library: OOQP (Object-Oriented Software for Quadratic Programming). If you scroll down that page, you'll find a research paper and a user guide. There seems to be a C++ API for that library. Hope this helps.

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But this does not solve my problem. The Symmetric matrix in the quadratic programming problem I am trying to solve is not applicable for Cholesky decomposition. –  Daniel Gao Nov 6 '11 at 18:00
Oops, I didn't read your question carefully enough. Sorry. –  Emile Cormier Nov 6 '11 at 18:03
@DanielGao: Updated my answer. –  Emile Cormier Nov 6 '11 at 18:17

CGAL looks great for quadratic programming. There is even a manual.

``````  // by default, we have a nonnegative QP with Ax <= b
Program qp (CGAL::SMALLER, true, 0, false, 0);

// now set the non-default entries:
const int X = 0;
const int Y = 1;
qp.set_a(X, 0,  1); qp.set_a(Y, 0, 1); qp.set_b(0, 7);  //  x + y  <= 7
qp.set_a(X, 1, -1); qp.set_a(Y, 1, 2); qp.set_b(1, 4);  // -x + 2y <= 4
qp.set_u(Y, true, 4);                                   //       y <= 4
qp.set_d(X, X, 2); qp.set_d (Y, Y, 8); // !!specify 2D!!    x^2 + 4 y^2
qp.set_c(Y, -32);                                       // -32y
qp.set_c0(64);                                          // +64

// solve the program, using ET as the exact type
``````

Code from the first example.

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