What is he best known for?
The fields of study he is best known for:
- Finite element method
- Mathematical analysis
- Geometry
Anthony Gravouil mainly focuses on Finite element method, Extended finite element method, Fracture mechanics, Stress intensity factor and Mathematical analysis.
His biological study spans a wide range of topics, including Geometry, Fracture, Fissure and Applied mathematics.
His Extended finite element method study frequently involves adjacent topics like Heaviside step function.
His Fracture mechanics study results in a more complete grasp of Structural engineering.
His work deals with themes such as Digital image correlation, Optics, Crack closure, Mechanics and Cast iron, which intersect with Stress intensity factor.
His work in the fields of Mathematical analysis, such as Discretization, intersects with other areas such as Interface.
His most cited work include:
- Non‐planar 3D crack growth by the extended finite element and level sets—Part I: Mechanical model (518 citations)
- NON-PLANAR 3D CRACK GROWTH BY THE EXTENDED FINITE ELEMENT AND LEVEL SETS- PART II: LEVEL SET UPDATE (427 citations)
- Multi-time-step explicit–implicit method for non-linear structural dynamics (190 citations)
What are the main themes of his work throughout his whole career to date?
The scientist’s investigation covers issues in Finite element method, Extended finite element method, Structural engineering, Fracture mechanics and Algorithm.
His Finite element method study combines topics from a wide range of disciplines, such as Mathematical analysis, Multigrid method, Applied mathematics, Mechanics and Solver.
His research investigates the connection between Applied mathematics and topics such as Mathematical optimization that intersect with problems in Topology.
His Extended finite element method research is multidisciplinary, incorporating perspectives in Mixed finite element method, Geometry, Stress intensity factor, Crack tip opening displacement and Discretization.
His research in Fracture mechanics intersects with topics in Residual stress and Plasticity.
His study explores the link between Algorithm and topics such as Nonlinear system that cross with problems in Domain decomposition methods.
He most often published in these fields:
- Finite element method (53.85%)
- Extended finite element method (26.67%)
- Structural engineering (26.67%)
What were the highlights of his more recent work (between 2016-2021)?
- Finite element method (53.85%)
- Mechanics (13.85%)
- Parametric statistics (8.21%)
In recent papers he was focusing on the following fields of study:
His primary scientific interests are in Finite element method, Mechanics, Parametric statistics, Scattering and Control theory.
He interconnects Algorithm and Fracture mechanics in the investigation of issues within Finite element method.
His research integrates issues of Multigrid method and Nonlinear system in his study of Algorithm.
His Mechanics research integrates issues from Thermal conductivity and Toughness.
In his research, Computational physics, Metamaterial and Phonon is intimately related to Acoustic attenuation, which falls under the overarching field of Scattering.
His Control theory research is multidisciplinary, incorporating elements of Seismic loading, Computation and Lagrange multiplier.
Between 2016 and 2021, his most popular works were:
- 2D and 3D Abaqus implementation of a robust staggered phase-field solution for modeling brittle fracture (103 citations)
- A new heterogeneous asynchronous explicit–implicit time integrator for nonsmooth dynamics (24 citations)
- A new heterogeneous asynchronous explicit–implicit time integrator for nonsmooth dynamics (24 citations)
In his most recent research, the most cited papers focused on:
- Finite element method
- Mathematical analysis
- Geometry
His primary areas of study are Parametric statistics, Finite element method, Welding, Scale and Lagrange multiplier.
His study in Parametric statistics intersects with areas of studies such as Topology, Isogeometric analysis, Polycube, Morphing and Principal curvature.
His Finite element method research is multidisciplinary, relying on both Algorithm, Multigrid method, Nonlinear system and Fracture mechanics.
The study incorporates disciplines such as Computational science, Parameter space, Sparse grid and Interpolation in addition to Welding.
His Scale research spans across into fields like Rate of convergence, Asynchronous communication, Energy, Seismic loading and Control theory.
His Lagrange multiplier study frequently draws connections between related disciplines such as Computation.
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