Prof. Dr. Sergio Conti
 professor
                            Mathematics                                                        
Hausdorff Center for Mathematics
                                                        Germany
                        
Biography
My research activity focuses on variational problems with applications to materials science, in particular in elasticity and plasticity. One key theme is the elastic behavior of thin sheets. The starting point was a variational analysis of blistering in thin films [1], which contributed to a new understanding of the origin of microstructure in these systems. I then turned to the situation where compressive Dirichlet boundary conditions by confinement, as in an obstacle problem. The optimal scaling turned out to be different, being proportional to the thickness to the power [3]. A second line of thought focused on variational models in crystal plasticity and their relaxation. An explicit relaxation of a geometrically linear model in which finitely many slip systems are active was obtained in [4], and applied to simulate numerically an indentation test in [5]. At a finer scale, a line-tension model for dislocations was derived in [10,9]. Future work will address interaction between different defects, such as damage and fracture, or density of interstitials and motion of dislocations. At the same time I intend to address microstructure formation in situations which cannot be addressed purely by energy minimization, such as plastic deformation under non-monotonous loadings, or fracture propagation, or cycling in phase transformation in shape-memory alloys. This will involve both the study of path-dependence in inelastic deformation and the study of hysteresis, and can be attacked by macroscopic rate-independent models or at a more microscopic level using transition-state theory. 1997 PhD, Scuola Normale Superiore di Pisa, Italy 1997 - 2004 Postdoctoral Associate, Max Planck Institute for Mathematics in the Sciences, Leipzig 2004 Habilitation in Mathematics, University of Leipzig 2004 - 2008 Professor (C4), University of Duisburg-Essen Since 2008 Professor (W3), Institute for Applied Mathematics, University of Bonn HIM Trimester on “Mathematical challenges of materials science and condensed matter physics", organizer, 2012 Project “From pair potentials to macroscopic plasticity” within DFG Collaborative Research Center SFB 1060 “The Mathematics of Emergent Effects”, jointly with Stefan Müller and Michael Ortiz Project “Hysteresis and microstructure in shape memory alloys” within DFG Collaborative Research Center SFB 1060 “The Mathematics of Emergent Effects”, jointly with Barbara Zwicknagl Project “Numerical optimization of shape microstructures” within DFG Collaborative Research Center SFB 1060 “The Mathematics of Emergent Effects”, jointly with Martin Rumpf
Research Interest
Research Area B My research activity focuses on variational problems with applications to materials science, in particular in elasticity and plasticity. One key theme is the elastic behavior of thin sheets. The starting point was a variational analysis of blistering in thin films [1], which contributed to a new understanding of the origin of microstructure in these systems. A simplification of the blistering model leads to the scalar Aviles-Giga functional, which was studied in [2]. I then turned to the situation where compressive Dirichlet boundary conditions by confinement, as in an obstacle problem. The optimal scaling turned out to be different, being proportional to the thickness to the power
Publications
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                            David P. Bourne, Sergio Conti and Stefan Müller Energy bounds for a compressed elastic film on a substrate J. Nonlinear Sci., 27(2):453--494 2017 DOI: 10.1007/s00332-016-9339-0 
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                            Andrea Braides, Sergio Conti and Adriana Garroni Density of polyhedral partitions Calc. Var. Partial Differential Equations, 56(2):Paper No. 28, 10 2017 DOI: 10.1007/s00526-017-1108-x 
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                            Sergio Conti, Johannes Diermeier and Barbara Zwicknagl Deformation concentration for martensitic microstructures in the limit of low volume fraction Calc. Var. Partial Differential Equations, 56(1):Paper No. 16, 24 2017 DOI: 10.1007/s00526-016-1097-1 

