Deterministic Global Optimization: Theory, Methods and ApplicationsSpringer Science & Business Media, 2013. gada 9. marts - 742 lappuses The vast majority of important applications in science, engineering and applied science are characterized by the existence of multiple minima and maxima, as well as first, second and higher order saddle points. The area of Deterministic Global Optimization introduces theoretical, algorithmic and computational ad vances that (i) address the computation and characterization of global minima and maxima, (ii) determine valid lower and upper bounds on the global minima and maxima, and (iii) address the enclosure of all solutions of nonlinear con strained systems of equations. Global optimization applications are widespread in all disciplines and they range from atomistic or molecular level to process and product level representations. The primary goal of this book is three fold : first, to introduce the reader to the basics of deterministic global optimization; second, to present important theoretical and algorithmic advances for several classes of mathematical prob lems that include biconvex and bilinear; problems, signomial problems, general twice differentiable nonlinear problems, mixed integer nonlinear problems, and the enclosure of all solutions of nonlinear constrained systems of equations; and third, to tie the theory and methods together with a variety of important applications. |
No grāmatas satura
1.–5. rezultāts no 86.
xv. lappuse
... parameters . Chapter 19 introduces the parameter estimation problem of nonlinear algebraic models via the error in variables approach and presents a global optimization approach based on the aBB principles . Part IV , consisting of ...
... parameters . Chapter 19 introduces the parameter estimation problem of nonlinear algebraic models via the error in variables approach and presents a global optimization approach based on the aBB principles . Part IV , consisting of ...
xvi. lappuse
... parameters , introduced the SMIN - aBB and GMIN- aBB approaches for nonconvex MINLPs and created the implementation ... parameter estimation , data reconcilliation and optimal control problems of nonlinear algebraic and differential ...
... parameters , introduced the SMIN - aBB and GMIN- aBB approaches for nonconvex MINLPs and created the implementation ... parameter estimation , data reconcilliation and optimal control problems of nonlinear algebraic and differential ...
9. lappuse
... parameter uncertainty is typically expressed as positive and negative deviations of the real parameters from some nominal values . Checking the stability of a particular system with characteristic equation P ( jw , q ) involves the ...
... parameter uncertainty is typically expressed as positive and negative deviations of the real parameters from some nominal values . Checking the stability of a particular system with characteristic equation P ( jw , q ) involves the ...
10. lappuse
... parameters and Aq + , Aq ̄ are the estimated bounds . Stability is ensured if and only if the optimal solution k is greater or equal to one . This mathematical model features nonconvexities in the form of multivari- able polynomial ...
... parameters and Aq + , Aq ̄ are the estimated bounds . Stability is ensured if and only if the optimal solution k is greater or equal to one . This mathematical model features nonconvexities in the form of multivari- able polynomial ...
12. lappuse
... Parameter Estimation and Data Reconciliation Nonlinear mathematical models which accurately predict physical phenomena are ... parameters , z is a vector of n experimentally measured variables , and f represents the system of algebraic ...
... Parameter Estimation and Data Reconciliation Nonlinear mathematical models which accurately predict physical phenomena are ... parameters , z is a vector of n experimentally measured variables , and f represents the system of algebraic ...
Saturs
1 | |
THE GOP APPROACH IMPLEMENTATION AND COMPUTATIONAL STUDIES | 141 |
THE GOP APPROACH IN BILEVEL LINEAR AND QUADRATIC PROBLEMS | 173 |
DISTRIBUTED IMPLEMENTATION | 243 |
Signomial Problems | 257 |
COMPUTATIONAL STUDIES | 289 |
FROM BICONVEX TO GENERAL TWICE DIFFERENTIABLE NLPS | 309 |
THEORY315 | 315 |
THE ABB APPROACH IN PEPTIDE DOCKING | 481 |
THE ABB APPROACH IN BATCH DESIGN UNDER UNCERTAINTY | 507 |
THE aBB APPROACH IN PARAMETER ESTIMATION | 543 |
Nonlinear and MixedInteger Optimization | 571 |
THE SMINαBB APPROACH THEORY AND COMPUTATIONS | 587 |
THE GMINaBB APPROACH THEORY AND COMPUTATIONS | 617 |
Nonlinear Constrained Systems of Equations | 641 |
LOCATING ALL HOMOGENEOUS AZEOTROPES | 667 |
THE aBB FOR CONSTRAINED TWICE DIFFERENTIABLE NLPS THEORY | 333 |
COMPUTATIONAL STUDIES OF THE ABB APPROACH | 377 |
GLOBAL OPTIMIZATION IN MICROCLUSTERS | 403 |
THE ABB APPROACH IN MOLECULAR STRUCTURE PREDICTION | 435 |
References | 699 |
xiii | 736 |
Citi izdevumi - Skatīt visu
Deterministic Global Optimization: Theory, Methods and Applications Christodoulos A. Floudas Priekšskatījums nav pieejams - 2010 |
Bieži izmantoti vārdi un frāzes
Adjiman azeotropes bilinear terms binary variables bound updates bounding function branch and bound Chapter concave function connected variables convergence convex envelope convex functions convex lower bounding convex relaxation convex set convex underestimators corresponding defined dihedral angles eigenvalue equation Figure formulation fractional function f(x Gibbs free energy global minimum global optimization algorithm global optimization approach global solution GMIN-aBB GOP algorithm Hessian matrix integer interval iteration Lagrange function linear Maranas and Floudas maximum separation methods MILP minimization MINLP node nonconvex terms nonlinear number of iterations objective function obtained optimization problem parameters peptide potential energy primal problem programming problem properties quadratic qualifying constraints relaxed dual problem relaxed dual subproblems shift matrix solved Table tangent plane Theorem total number upper bound variable bounds vector