Mathematical Programming in UseM. L. Balinski, Claude Lemaréchal |
Contents
2 A family of iterative quadratic optimization algorithms for pairs | 15 |
3 A blending problem using integer programming online G S Thomas | 30 |
4 Reliability type inventory models based on stochastic programming | 43 |
Copyright | |
7 other sections not shown
Common terms and phrases
Algorithm Schema application APR MAY JUN assume AUG SEP OCT b₁ batch blend c₁ cluster coefficients components convergence convex convex function costs DEC JAN FEB defined denote density dynamic programming engine farmer feasible FEB MAR APR formulation gamma distribution given gradient heuristic inflows input form integer programming integer solution Irrigation iterations JAN FEB MAR JUL AUG SEP JUN JUL AUG K₁ Karun River Khuzestan linear decision rules linear programming logconcave Mach Marun mathematical programming matrix method minimize minimum nodes nonlinear programming NOV DEC JAN objective function OCT NOV DEC operation optimal solution optimisation optimization problem optimum paper plant Prékopa probability distribution procedure production Purdue quadratic assignment problem Ramhormoz random variables Research reservoir routine Section SEP OCT NOV Shadegan Shushtar solve stochastic programming storage structure sub-programs Table Theorem truss turbine units values Vollmann water resources systems zone