S
Sergio Conti
Researcher at University of Bonn
Publications - 224
Citations - 5575
Sergio Conti is an academic researcher from University of Bonn. The author has contributed to research in topics: Elastic energy & Elasticity (economics). The author has an hindex of 40, co-authored 213 publications receiving 4890 citations. Previous affiliations of Sergio Conti include International Centre for Theoretical Physics & University of Duisburg-Essen.
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Journal ArticleDOI
Crystal symmetry and the reversibility of martensitic transformations.
TL;DR: Martensitic transformations are diffusionless, solid-to-solid phase transitions, and have been observed in metals, alloys, ceramics and proteins, characterized by a rapid change of crystal structure accompanied by the development of a rich microstructure.
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Time-dependent density functional theory beyond the adiabatic local density approximation
TL;DR: In this paper, the authors provide an explicit formula for the linewidths of collective excitations in electronic systems, and derive complex and frequency-dependent viscosity/elasticity coefficients in terms of properties of the homogeneous electron gas.
Journal ArticleDOI
Soft elastic response of stretched sheets of nematic elastomers: a numerical study
TL;DR: The quasiconvexification of the microscopic energy was proposed by Bladon et al. as mentioned in this paper to model the symmetry-breaking phase transformation from a random, isotropic phase to an aligned, nematic phase, which can be combined in different ways to achieve a variety of zero energy macroscopic deformations.
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A new approach to counterexamples to L 1 estimates: Korn's inequality, geometric rigidity, and regularity for gradients of separately convex functions
TL;DR: In this article, the derivation of counterexamples to L1 estimates can be reduced to a geometric decomposition procedure along rank-one lines in matrix space, which is used to prove the failure of Korn's inequality and the corresponding geometrically nonlinear rigidity result in L1.
Book ChapterDOI
h -Principle and Rigidity for C 1, α Isometric Embeddings
TL;DR: Borisov et al. as mentioned in this paper studied the embedding of Riemannian manifolds in low codimension and provided analytic proofs of all these statements, for general dimension and general metric.