Michele Giuliano Carlino, PhD
Researcher at ONERA (Meudon) and INRIA (Bordeaux)
Researcher at ONERA (Meudon) and INRIA (Bordeaux)
"Mathematics knows no races or geographical boundaries; for mathematics, the cultural world is one country."
D. Hilbert
"The future development of international civil aviation can play a vital role in fostering friendship and mutual understanding among nations and peoples around the world. However, its misuse could pose a threat to global security."
Convention on International Civil Aviation (Chicago, 1944)
My name is Michele Giuliano, but for everyone I'm simply Giuliano.
I am a permanent researcher at the French Aerospace Agency ONERA (Meudon) and French Math lab INRIA (Bordeaux - MEMPHIS team). In line with the agreements that establish the collaboration between the Île-de-France and Aquitaine centers, my research focuses on the development of algorithms for computational fluid dynamics (in both compressible and incompressible regimes). In particular, the three main areas I work on are Reduced-Order Models (Reduced Bases, Hyperreduction, etc.), High-Order Methods (especially finite volume methods on moving grids, i.e., Chimera grids), and Optimization. The project I am involved in is led by Dr. Denis Sipp (ONERA) and Prof. Angelo Iollo (University of Bordeaux).
I have a PhD in Applied Mathematics and Scientific Computing. It was achieved at University of Bordeaux and INRIA Bordeaux Sud-Ouest under the supervision of CR Michel Bergmann and Prof. Angelo Iollo. During the PhD, I studied ALE ADER-like methods for the incompressible Navier-Stokes equations by discretizing the space through Chimera/Overset meshes. In addition, during this period, I was visiting researcher at Optimad Engineering in Turin.
I was previosuly postdoc fellow at the University of Ferrara, supervised by Prof. Walter Boscheri on schemes for hyperbolic PDEs for conservations laws. Prior to this, I was postdoc fellow at INRIA Bordeaux in team lead by CR Mario Ricchiuto and under the supervision of Dr. E. Gaburro. My research of that period adresses to structure preserving schemes for conservation laws on manifolds.
Keywords & Scientific Interest:
Model Order Reduction; Hyper-Reduction.
Numerical Analysis for Partial Differential Equations;
Scientific Computing;
Hyperbolic PDEs;
ADER Finite Volume schemes and Discontinuous Galerkin methods; well balanced methods;
Navier-Stokes Equations, Euler Equations, CFD;
Moving and overlapping Overset Meshes, Chimera Grids;