Semismooth SQP method for equality-constrained optimization problems with an application to the lifted reformulation of mathematical programs with complementarity constraints

Izmailov, A. F.; Pogosyan, A. L.; Solodov, M. V.

doi:10.1080/10556788.2011.557727

Cited by 7 publications

(5 citation statements)

References 26 publications

(93 reference statements)

Supporting

Mentioning

Contrasting

Order By: Relevance

“…This would be required for local superlinear convergence, see e.g. [18]. Since the dimension of the control space can become quite large with our approach we chose the memory efficient L-BFGS method, see [25].…”

Section: 3mentioning

confidence: 99%

Frequency-sparse optimal quantum control

Friesecke¹,

Henneke²,

Kunisch³

2018

Mathematical Control &Amp; Related Fields

View full text Add to dashboard Cite

A new class of cost functionals for optimal control of quantum systems which produces controls which are sparse in frequency and smooth in time is proposed. This is achieved by penalizing a suitable time-frequency representation of the control field, rather than the control field itself, and by employing norms which are of L 1 or measure form with respect to frequency but smooth with respect to time.We prove existence of optimal controls for the resulting nonsmooth optimization problem, derive necessary optimality conditions, and rigorously establish the frequency-sparsity of the optimizers. More precisely, we show that the time-frequency representation of the control field, which a priori admits a continuum of frequencies, is supported on only finitely many frequencies. These results cover important systems of physical interest, including (infinitedimensional) Schrödinger dynamics on multiple potential energy surfaces as arising in laser control of chemical reactions. Numerical simulations confirm that the optimal controls, unlike those obtained with the usual L 2 costs, concentrate on just a few frequencies, even in the infinite-dimensional case of laser-controlled chemical reactions.

show abstract

Section: 3mentioning

confidence: 99%

Frequency-sparse optimal quantum control

Friesecke¹,

Henneke²,

Kunisch³

2018

Mathematical Control &Amp; Related Fields

View full text Add to dashboard Cite

show abstract

“…One of the ways consists in using a sequence of quadratic programming subproblems (SQP) which have to be solved successively. Since SQP methods were developed [1][2][3], a great variety of research has been carried out focusing on this technique [4][5][6][7][8]. Many SQP algorithms are combined with trust region methods.…”

Section: Introductionmentioning

confidence: 99%

“…where x is the Euclidean norm of x ∈ R n and each p j (x) is a polynomial of degree d j . More precisely, we are interested in computing points that locally minimize the Euclidean norm x under the polynomial constraints (4). We note that the problems that we have in mind are too complex to apply algorithms that guarantee the computation of all local minimizers of the Euclidean norm.…”

Section: Introductionmentioning

confidence: 99%

An algorithm based on continuation techniques for minimization problems with highly non-linear equality constraints

Alberdi¹,

Antoñana²,

Makazaga³

et al. 2019

Preprint

View full text Add to dashboard Cite

We present an algorithm based on continuation techniques that can be applied to solve numerically minimization problems with equality constraints. We focus on problems with a great number of local minima which are hard to obtain by local minimization algorithms with random starting guesses. We are particularly interested in the computation of minimal norm solutions of underdetermined systems of polynomial equations. Such systems arise, for instance, in the context of the construction of high order optimized differential equation solvers. By applying our algorithm, we are able to obtain 10th order time-symmetric composition integrators with smaller 1-norm than any other integrator found in the literature up to now.

show abstract

“…This problem setting with restricted smoothness requirements has multiple applications: e.g., in stochastic programming and optimal control (the so-called extended linear-quadratic problems [26,28,29]), and in semi-infinite programming and in primal decomposition procedures (see [21,25] and references therein). Once but not twice differentiable functions arise also when reformulating complementarity constraints as in [12] or in the lifting approach [10,11,30]. Other possible sources are subproblems in penalty or augmented Lagrangian methods with lower-level constraints treated directly and upper-level inequality constraints treated via quadratic penalization or via augmented Lagrangian, which gives rise to certain terms that are not twice differentiable in general; see, e.g., [1].…”

Section: Property 1 (Upper Lipschitz Stability Of the Solutions Of Kkmentioning

confidence: 99%

“…Using the terminology of [4], the multiplier (λ,μ) being noncritical also means that the cone-matrix pair (C(x), ∂Ψ ∂ x (x,λ,μ)) has the so-called R 0 property (see the discussion following (3.3.18) in [4]). Finally, note that multiplying the first equality in (9) by ξ and using the other two equalities in (9) and the relations in (10), it can be seen that a sufficient condition for (λ,μ) to be noncritical is the following second-order sufficiency condition (SOSC):…”

Section: Property 1 (Upper Lipschitz Stability Of the Solutions Of Kkmentioning

confidence: 99%

A note on upper Lipschitz stability, error bounds, and critical multipliers for Lipschitz-continuous KKT systems

2012

View full text Add to dashboard Cite

We prove a new local upper Lipschitz stability result and the associated local error bound for solutions of parametric Karush-Kuhn-Tucker systems corresponding to variational problems with Lipschitzian base mappings and constraints possessing Lipschitzian derivatives, and without any constraint qualifications. This property is equivalent to the appropriately extended to this nonsmooth setting notion of noncriticality of the Lagrange multiplier associated to the primal solution, which is weaker than second-order sufficiency. All this extends several results previously known only for optimization problems with twice differentiable data, or assuming some constraint qualifications. In addition, our results are obtained in the more general variational setting.

show abstract

Semismooth SQP method for equality-constrained optimization problems with an application to the lifted reformulation of mathematical programs with complementarity constraints

Cited by 7 publications

References 26 publications

Frequency-sparse optimal quantum control

Frequency-sparse optimal quantum control

An algorithm based on continuation techniques for minimization problems with highly non-linear equality constraints

A note on upper Lipschitz stability, error bounds, and critical multipliers for Lipschitz-continuous KKT systems

Contact Info

Product

Resources

About