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| author | Jörg Frings-Fürst <debian@jff-webhosting.net> | 2018-07-11 22:20:14 +0200 |
|---|---|---|
| committer | Jörg Frings-Fürst <debian@jff-webhosting.net> | 2018-07-11 22:20:14 +0200 |
| commit | 7beb00cd8d28c3d5893ce3db907a828d64afdea9 (patch) | |
| tree | 395a3dee2fe197b8284dee02c5f527889df78413 /numlib/quadprog.h | |
| parent | e2d30e0583c047a4bedf4c8d0c86320f1b3fd8ed (diff) | |
| parent | a0442ed58dee48a521ea053083ea967894507898 (diff) | |
Update upstream source from tag 'upstream/2.0.1+repack'
Update to upstream version '2.0.1+repack'
with Debian dir 6edb5dd2df9aca152662fc4a8f72bd6d86f8552e
Diffstat (limited to 'numlib/quadprog.h')
| -rwxr-xr-x | numlib/quadprog.h | 18 |
1 files changed, 9 insertions, 9 deletions
diff --git a/numlib/quadprog.h b/numlib/quadprog.h index 7d28ec8..d091b75 100755 --- a/numlib/quadprog.h +++ b/numlib/quadprog.h @@ -25,20 +25,20 @@ The problem is in the form: min 0.5 * x G x + g0 x s.t. - CE^T x + ce0 = 0 - CI^T x + ci0 >= 0 + CE^t x + ce0 = 0 + CI^t x + ci0 >= 0 The matrix and vectors dimensions are as follows: - G: n * n - g0: n + G: n * n + g0: n - CE: n * p - ce0: p + CE: n * p + ce0: p - CI: n * m - ci0: m + CI: n * m + ci0: m - x: n + x: n References: D. Goldfarb, A. Idnani. A numerically stable dual method for solving strictly convex quadratic programs. Mathematical Programming 27 (1983) pp. 1-33. |