Working meeting "Dealing with stochastics in optimization problems" - May, 13th 2016
Organizers: Josselin Garnier (Université Paris diderot, laboratoire LPMA & laboratoire JAcques-Louis Lions), Emmanuel Vazquez (Centrale Supélec, département signal & statistiques) and Miguel Munoz Zuniga (IFP Energies Nouvelles, département de mathématiques appliquées)
It will take place on:
May 13, 2016, at Amphithéâtre Hermite, Institut Henri Poincaré, Paris.
9:15 : Welcome of the participants
9:30 – 9:45 : Introduction – M. Munoz Zuniga (IFPEN) slides .
9:45 – 10:30 : Maliki Moustapha (ETH Zurich) – Quantile-based optimization using adaptive Kriging models: Application to car body design. slides
10:30 – 11:15 : Paul Feliot (Centrale Supélec) – Bayesian constrained multi-objective optimization with application to the design of a commercial aircraft environment control system. slides
11:15 – 11:45 : Coffee Break
11:45 – 12:30 : Asma Atamna (INRIA) – Evolution Strategies with Augmented Lagrangian
Constraint Handling Approach. slides
12:30-14:15: Lunch break
14:15 – 15:00 : Wim Van Ackooij (EDF) - Differentiability of probability function involving non-linear mappings of Gaussian random vectors. slides
15:00 – 15:45 : Nicolas Gayton (IFMA) – Stratégie AK de classification : principe et applications
15:45 – 16:00 : Conclusion and end of the workshop
Maliki Moustapha – Quantile-based optimization using adaptive Kriging models: Application to car body design
Uncertainties play an important role in the design of engineering structures.
As they may aect the physical properties and environmental conditions
of a designed structure, they must be fully accounted for throughout the design process. From the point of view of optimization, the most popular
approaches are robust and reliability-based design optimization. In this presentation, we focus on the latter only. More specically, we introduce an
alternative formulation to the state-of-the-art techniques which is based on quantiles as measure of conservatism.
Broadly speaking, optimization under uncertainties require repeated evaluations of the performance function describing the structure behavior. In
practice, the associated models are expensive-to-evaluate. Metamodeling has arisen as a tool to overcome this issue. Here, we consider Gaussian process modeling, also known as Kriging. The remarkable feature of Kriging
is that it also provides a built-in measure of its own accuracy. This feature
is used to propose a methodology for adaptive Kriging optimization based
on quantiles. Such a methodology is aimed at producing a reliable solution
with a reduced computational budget. As an application, a problem related
to the lightweight design of an automotive body shell under frontal impact
Paul Feliot – Bayesian constrained multi-objective optimization with application to the design of a commercial aircraft environment control system
We present the BMOO algorithm for multi-objective optimization in the presence of non-linear and expensive-to-evaluate constraints and an application to the design of a commercial aircraft environment control system (ECS). The BMOO algorithm implements a Bayesian approach to this optimization problem. The emphasis is on conducting the optimization using a limited number of system simulations and, as a particularity, the algorithm is run on a non-hypercubic design domain and implements hidden constraints handling capabilities. The ECS is composed of two cross-flow heat exchangers, a centrifugal compressor and a radial turbine, the geometries of which are simultaneously optimized to achieve minimal weight and entropy generation of the system as a whole, while respecting strict specifications. While both objectives impact the overall performance of the aircraft, they are shown to be antagonistic and a set of trade-off design solutions is identified.
Registration is free but appreciated.
Asma Atamna - Evolution Strategies with Augmented Lagrangian Constraint Handling Approach
Evolution Strategies (ESs) are derivative-free randomized adaptive optimization
algorithms initially designed for unconstrained continuous optimization. In this work,
we consider a simple constrained problem where we have a single linear constraint
and propose a general ES with an augmented Lagrangian approach for constraint handling.
We then discuss how linear convergence can be achieved on our general algorithm
by adopting a Markov chains approach: given some conditions are satisfied by
the transition function of the algorithm, we exhibit a class of functions on which one
can construct a homogeneous Markov chain. We then show how the stability of the
constructed Markov chain leads to linear convergence/divergence of the ES. Stability
being usually difficult to prove “manually”, we will investigate it empirically on convex
quadratic functions, for two particular ESs: the (1+1)-ES with 1/5th success rule
and the (mu,lambda)-ES with median success rule.
Wim Van Ackooij - Differentiability of probability function involving non-linear mappings of Gaussian random vectors
In this talk, we will consider probability functions of parameter-
dependent random inequality systems under Gaussian distributions. As a main
result, we provide an upper estimate for the Clarke subdifferential of such
probability functions without imposing compactness conditions. A constraint
qualification ensuring continuous differentiability is formulated. Using these
results, several explicit formulae can be derived from the general result in
case of linear random inequality systems. We will also show how these compare
with other formulae in the same setting. Finally, in the case of a constant
coefficient matrix an upper estimate for even the smaller Mordukhovich
subdifferential is proven. Throughout the talk, we will also discuss several
Nicolas Gayton – Stratégie AK de classification : principe et applications
Les méta-modèles sont couramment utilisés depuis quelques années particulièrement pour l'analyse paramétrique, l'analyse de sensibilité, l'optimisation, l'analyse fiabiliste.
Ces méta-modèles sont en général construits de façon itérative, pour approximer un fonction coûteuse, grâce à un critère d'enrichissement qui permet d'identifier le meilleur point de calcul suivant à réaliser.
L'objectif de la cette intervention est la présentation d'une technique un peu différente de construction d'un méta-modèle de krigeage qui permet de séparer un nuage de points en différentes populations. Cette technique dite de classification est utilisée dans une famille de méthode appelée AK qui sera présentée en lien avec quelques applications à l'ingénierie mécanique.