Multiplier method

By combining the Lagrange multiplier method with the highly efficient delocalized internal coordinates, a very powerfiil algoritlun for constrained optimization has been developed [ ]. Given that delocalized internal coordinates are potentially linear combinations of all possible primitive stretches, bends and torsions in the system, cf Z-matrix coordinates which are individual primitives, it would seem very difficult to impose any constraints at all however, as... [Pg.2348]

Penalty functions with augmented Lagrangian method (an enhancement of the classical Lagrange multiplier method)... [Pg.745]

Lagrange Multiplier Method for programming problems, 289 for weapon allocation, 291 Lamb and Rutherford, 641 Lamb shift, 486,641 Lanczos form, 73 Landau, L. D., 726,759, 768 Landau-Lifshitz theory applied to magnetic structure, 762 Large numbers, weak law of, 199 Law of large numbers, weak, 199 Lawson, J. L., 170,176 Le Cone, Y., 726... [Pg.776]

Programming problems, 289 Lagrange multiplier method, 289 Projection, methods of, 61 Projection operator, 557 von Neumann, 461 Propagated error, 51 Proper node, 326 Pryce, M. 536... [Pg.781]

A similar relationship could be written by taking the single phase gas flow as the reference instead of the liquid, i.e., Gq = Gm. This is the basis for the two-phase multiplier method ... [Pg.465]

The two-phase multiplier method is used primarily for separated flows, which will be discussed later. [Pg.465]

To find the minimum crossing point we shall use the Lagrange multiplier method. That is, we consider... [Pg.76]

EXAMPLE 8.3 APPLICATION OF THE LAGRANGE MULTIPLIER METHOD WITH NONLINEAR INEQUALITY CONSTRAINTS... [Pg.278]

The solution is obtained by means of the Lagrange multipliers method. The Lagrangian for this problem is... [Pg.96]

Thus combining (20) and (21) by the usual Lagrange multiplier method we have the non-linear differential equation... [Pg.43]

Figure 6.1 Search for the minimum of the Gibbs function in a two-component space (nn and ni2 are mole numbers) with the mass conservation constraints Bn = q. The search direction is the projection of the gradient onto the constraint subspace. Minimum is attained when the gradient is orthogonal to the constraint direction, which is the geometrical expression of the Lagrange multiplier methods.

We solve the nonlinear formulation of the semidefinite program by the augmented Lagrange multiplier method for constrained nonlinear optimization [28, 29]. Consider the augmented Lagrangian function... [Pg.47]

Huang and Guan have reported an ultraviolet spectrophotometric and coefficient-multiplied method for the determination of procaine hydrochloride in compounded zinc sulfate eye drops [36]. 3 mL of sample was shaken with 1.5 mL of ethyl ether and water, and after removal of the organic phase, water was added to achieve a final volume of 50 mL. The absorbance of this solution was measured at 291 and 344.5 nm. The recovery (n = 6) for procaine was found to be 99.9%, with a relative standard deviation equal to 0.44%. [Pg.430]

To maximize In W, subject to the above constraints, it is convenient to use the Lagrangian multiplier method ... [Pg.151]

With the restriction of Eq. (B-17) and using the Lagrangian multiplier method, we get for the free energy of adsorption AF2... [Pg.8]

This direct method yields the same results as the Lagrange multiplier method for finding the kernel introduced in Ref. [16] for the square-rectangle case, and used for kernels in 2D and 3D in Refs. [7-12],... [Pg.146]

Bertsekas DP (1982) Constrained optimization and Lagrange multiplier methods. Academic Press, New York... [Pg.70]

Constraints in optimization problems often exist in such a fashion that they cannot be eliminated explicitly—for example, nonlinear algebraic constraints involving transcendental functions such as exp(x). The Lagrange multiplier method can be used to eliminate constraints explicitly in multivariable optimization problems. Lagrange multipliers are also useful for studying the parametric sensitivity of the solution subject to the constraints. [Pg.137]

The Lagrange multiplier method, applied to this minimisation problem, allows to recover the usual Kohn-Sham equations, modulo an unitary transform within the space of occupied orbitals, as follows. One Lagrange multiplier for each orthonormalisation constraint is introduced, such that ... [Pg.227]

In order to find extrema of E( ui ), subject to the normalization condition, standard moves known as the Lagrange multipliers method are applied, which readily lead us to the well-known form of the generalized matrix eigenvalue/eigenvector problem ... [Pg.18]

In Eq. (16), yci stands for the number of segments of a chain in conformation c located in layer i. The two equations express the obvious conditions that each lattice layer must be occupied and that the total number of chains is constant. The Lagrange multiplier method is used to calculate the minimum free energy subject to the above constraints. By introducing the multipliers at, for each of the constraints given by Eq. (16), and (i for the constraint expressed by Eq. (17), one can write... [Pg.611]

Only three of the four variables in Eq. (42) are independent. Under these conditions, optimization can be accomplished by use of the Lagrange multiplier method The necessary relationship for applying the constant Lagrangian multiplier A is given by Eq. (43) ... [Pg.631]

B. van de Graaf and J. M. A. Baas, /. Comput. Chem., 5 314 (1984). Empirical Force Field Calculations. 23. The Lagrange Multiplier Method for Manipulating Geometries. Implementation and Applications in Molecular Mechanics. [Pg.220]

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