Roger A. Sauer
Roger A. Sauer
Graduate School AICES, RWTH Aachen University; Mechanical Engineering, IIT Kanpur
Verified email at aices.rwth-aachen.de - Homepage
Title
Cited by
Cited by
Year
A new rotation-free isogeometric thin shell formulation and a corresponding continuity constraint for patch boundaries
TX Duong, F Roohbakhshan, RA Sauer
Computer Methods in applied Mechanics and engineering 316, 43-83, 2017
982017
A contact mechanics model for quasi‐continua
RA Sauer, S Li
International journal for numerical methods in engineering 71 (8), 931-962, 2007
932007
The Eshelby tensors in a finite spherical domain—part I: theoretical formulations
S Li, RA Sauer, G Wang
902007
An atomic interaction-based continuum model for adhesive contact mechanics
RA Sauer, S Li
Finite Elements in Analysis and Design 43 (5), 384-396, 2007
812007
A NURBS-based inverse analysis for reconstruction of nonlinear deformations of thin shell structures
N Vu-Bac, TX Duong, T Lahmer, X Zhuang, RA Sauer, HS Park, ...
Computer Methods in Applied Mechanics and Engineering 331, 427-455, 2018
772018
Enriched contact finite elements for stable peeling computations
RA Sauer
International Journal for numerical methods in engineering 87 (6), 593-616, 2011
742011
Formulation and analysis of a three-dimensional finite element implementation for adhesive contact at the nanoscale
RA Sauer, P Wriggers
Computer Methods in Applied Mechanics and Engineering 198 (49-52), 3871-3883, 2009
732009
A computational formulation for constrained solid and liquid membranes considering isogeometric finite elements
RA Sauer, TX Duong, CJ Corbett
Computer Methods in Applied Mechanics and Engineering 271, 48-68, 2014
692014
A circular inclusion in a finite domain I. The Dirichlet-Eshelby problem
S Li, R Sauer, G Wang
Acta mechanica 179 (1), 67-90, 2005
622005
A computational contact formulation based on surface potentials
RA Sauer, L De Lorenzis
Computer Methods in Applied Mechanics and Engineering 253, 369-395, 2013
612013
An unbiased computational contact formulation for 3D friction
RA Sauer, L De Lorenzis
International Journal for Numerical Methods in Engineering 101 (4), 251-280, 2015
552015
NURBS-enriched contact finite elements
CJ Corbett, RA Sauer
Computer Methods in Applied Mechanics and Engineering 275, 55-75, 2014
532014
The peeling behavior of thin films with finite bending stiffness and the implications on gecko adhesion
RA Sauer
The Journal of Adhesion 87 (7-8), 624-643, 2011
522011
A survey of computational models for adhesion
RA Sauer
The Journal of Adhesion 92 (2), 81-120, 2016
492016
Multiscale modelling and simulation of the deformation and adhesion of a single gecko seta
RA Sauer
Computer methods in biomechanics and biomedical engineering 12 (6), 627-640, 2009
482009
The Eshelby tensors in a finite spherical domain—Part II: applications to homogenization
S Li, G Wang, RA Sauer
482007
On the theoretical foundations of thin solid and liquid shells
RA Sauer, TX Duong
Mathematics and mechanics of solids 22 (3), 343-371, 2017
462017
A stabilized finite element formulation for liquid shells and its application to lipid bilayers
RA Sauer, TX Duong, KK Mandadapu, DJ Steigmann
Journal of computational physics 330, 436-466, 2017
422017
An atomistically enriched continuum model for nanoscale contact mechanics and its application to contact scaling
RA Sauer, S Li
Journal of nanoscience and nanotechnology 8 (7), 3757-3773, 2008
382008
Local finite element enrichment strategies for 2D contact computations and a corresponding post-processing scheme
RA Sauer
Computational Mechanics 52 (2), 301-319, 2013
362013
The system can't perform the operation now. Try again later.
Articles 1–20