TY - JOUR T1 - Driving bifurcating parametrized nonlinear PDEs by optimal control strategies: application to Navier–Stokes equations with model order reduction JF - ESAIM: M2AN Y1 - 2022 A1 - Federico Pichi A1 - Maria Strazzullo A1 - F. Ballarin A1 - Gianluigi Rozza VL - 56 UR - https://doi.org/10.1051/m2an/2022044 IS - 4 ER - TY - UNPB T1 - A CERTIFIED REDUCED BASIS Method FOR LINEAR PARAMETRIZED PARABOLIC OPTIMAL CONTROL PROBLEMS IN SPACE-TIME FORMULATION Y1 - 2021 A1 - Maria Strazzullo A1 - Francesco Ballarin A1 - Gianluigi Rozza ER - TY - UNPB T1 - Consistency of the full and reduced order models for Evolve-Filter-Relax Regularization of Convection-Dominated, Marginally-Resolved Flows Y1 - 2021 A1 - Maria Strazzullo A1 - Michele Girfoglio A1 - Francesco Ballarin A1 - T. Iliescu A1 - Gianluigi Rozza ER - TY - UNPB T1 - A data-driven partitioned approach for the resolution of time-dependent optimal control problems with dynamic mode decomposition Y1 - 2021 A1 - Eleonora Donadini A1 - Maria Strazzullo A1 - Marco Tezzele A1 - Gianluigi Rozza ER - TY - UNPB T1 - AN EXTENDED PHYSICS INFORMED NEURAL NETWORK FOR PRELIMINARY ANALYSIS OF PARAMETRIC OPTIMAL CONTROL PROBLEMS Y1 - 2021 A1 - Nicola Demo A1 - Maria Strazzullo A1 - Gianluigi Rozza ER - TY - ABST T1 - Model Order Reduction for Nonlinear and Time-Dependent Parametric Optimal Flow Control Problems Y1 - 2021 A1 - Maria Strazzullo PB - SISSA CY - Trieste ER - TY - CONF T1 - Reduced Order Methods for Parametrized Non-linear and Time Dependent Optimal Flow Control Problems, Towards Applications in Biomedical and Environmental Sciences T2 - Numerical Mathematics and Advanced Applications ENUMATH 2019 Y1 - 2021 A1 - Maria Strazzullo A1 - Zakia Zainib A1 - F. Ballarin A1 - Gianluigi Rozza JF - Numerical Mathematics and Advanced Applications ENUMATH 2019 PB - Springer VL - 139 SN - 978-3-030-55873-4 UR - https://arxiv.org/abs/1912.07886 ER - TY - CONF T1 - Reduced Order Methods for Parametrized Non-linear and Time Dependent Optimal Flow Control Problems, Towards Applications in Biomedical and Environmental Sciences T2 - Numerical Mathematics and Advanced Applications ENUMATH 2019 Y1 - 2021 A1 - Maria Strazzullo A1 - Zakia Zainib A1 - F. Ballarin A1 - Gianluigi Rozza ED - Fred J Vermolen ED - Cornelis Vuik AB -

We introduce reduced order methods as an efficient strategy to solve parametrized non-linear and time dependent optimal flow control problems governed by partial differential equations. Indeed, the optimal control problems require a huge computational effort in order to be solved, most of all in physical and/or geometrical parametrized settings. Reduced order methods are a reliable and suitable approach, increasingly gaining popularity, to achieve rapid and accurate optimal solutions in several fields, such as in biomedical and environmental sciences. In this work, we employ a POD-Galerkin reduction approach over a parametrized optimality system, derived from the Karush-Kuhn-Tucker conditions. The methodology presented is tested on two boundary control problems, governed respectively by (1) time dependent Stokes equations and (2) steady non-linear Navier-Stokes equations.

JF - Numerical Mathematics and Advanced Applications ENUMATH 2019 PB - Springer International Publishing CY - Cham SN - 978-3-030-55874-1 UR - https://www.springerprofessional.de/en/reduced-order-methods-for-parametrized-non-linear-and-time-depen/19122676 ER - TY - JOUR T1 - A weighted POD-reduction approach for parametrized PDE-constrained optimal control problems with random inputs and applications to environmental sciences JF - Computers and Mathematics with Applications Y1 - 2021 A1 - G. Carere A1 - Maria Strazzullo A1 - Francesco Ballarin A1 - Gianluigi Rozza A1 - R. Stevenson VL - 102 UR - https://www.scopus.com/inward/record.uri?eid=2-s2.0-85117948561&doi=10.1016%2fj.camwa.2021.10.020&partnerID=40&md5=cb57d59a6975a35315b2cf5d0e3a6001 ER - TY - UNPB T1 - POD-Galerkin Model Order Reduction for Parametrized Nonlinear Time Dependent Optimal Flow Control: an Application to Shallow Water Equations Y1 - 2020 A1 - Maria Strazzullo A1 - F. Ballarin A1 - Gianluigi Rozza AB -

In this work we propose reduced order methods as a reliable strategy to efficiently solve parametrized optimal control problems governed by shallow waters equations in a solution tracking setting. The physical parametrized model we deal with is nonlinear and time dependent: this leads to very time consuming simulations which can be unbearable e.g. in a marine environmental monitoring plan application. Our aim is to show how reduced order modelling could help in studying different configurations and phenomena in a fast way. After building the optimality system, we rely on a POD-Galerkin reduction in order to solve the optimal control problem in a low dimensional reduced space. The presented theoretical framework is actually suited to general nonlinear time dependent optimal control problems. The proposed methodology is finally tested with a numerical experiment: the reduced optimal control problem governed by shallow waters equations reproduces the desired velocity and height profiles faster than the standard model, still remaining accurate.

ER - TY - JOUR T1 - POD–Galerkin Model Order Reduction for Parametrized Time Dependent Linear Quadratic Optimal Control Problems in Saddle Point Formulation JF - Journal of Scientific Computing Y1 - 2020 A1 - Maria Strazzullo A1 - F. Ballarin A1 - Gianluigi Rozza AB -

In this work we deal with parametrized time dependent optimal control problems governed by partial differential equations. We aim at extending the standard saddle point framework of steady constraints to time dependent cases. We provide an analysis of the well-posedness of this formulation both for parametrized scalar parabolic constraint and Stokes governing equations and we propose reduced order methods as an effective strategy to solve them. Indeed, on one hand, parametrized time dependent optimal control is a very powerful mathematical model which is able to describe several physical phenomena, on the other, it requires a huge computational effort. Reduced order methods are a suitable approach to have rapid and accurate simulations. We rely on POD–Galerkin reduction over the physical and geometrical parameters of the optimality system in a space-time formulation. Our theoretical results and our methodology are tested on two examples: a boundary time dependent optimal control for a Graetz flow and a distributed optimal control governed by time dependent Stokes equations. With these two test cases the convenience of the reduced order modelling is further extended to the field of time dependent optimal control.

VL - 83 ER - TY - JOUR T1 - Model Reduction for Parametrized Optimal Control Problems in Environmental Marine Sciences and Engineering JF - SIAM Journal on Scientific Computing Y1 - 2018 A1 - Maria Strazzullo A1 - F. Ballarin A1 - Mosetti, R. A1 - Gianluigi Rozza VL - 40 UR - https://doi.org/10.1137/17M1150591 ER -