What is he best known for?
The fields of study he is best known for:
- Mathematical analysis
- Thermodynamics
- Algebra
Mathematical analysis, Uniqueness, Quasistatic process, Variational inequality and Weak solution are his primary areas of study.
His Mathematical analysis research integrates issues from Finite element method and Regular polygon.
Within one scientific family, Mircea Sofonea focuses on topics pertaining to Contact mechanics under Uniqueness, and may sometimes address concerns connected to Monotonic function and Calculus.
His Quasistatic process research incorporates themes from Function, Viscoplasticity and Viscoelasticity.
Mircea Sofonea interconnects Mathematical economics and Yield limit in the investigation of issues within Variational inequality.
His research in Weak solution intersects with topics in Monotone polygon and Constitutive equation.
His most cited work include:
- Quasistatic Contact Problems in Viscoelasticity and Viscoplasticity (377 citations)
- Models and analysis of quasistatic contact (313 citations)
- Contact problems in elasticity (234 citations)
What are the main themes of his work throughout his whole career to date?
The scientist’s investigation covers issues in Mathematical analysis, Weak solution, Uniqueness, Quasistatic process and Applied mathematics.
His Mathematical analysis research is multidisciplinary, incorporating perspectives in Viscoelasticity and Constitutive equation.
His Weak solution study combines topics from a wide range of disciplines, such as Monotone polygon and Displacement field.
His biological study spans a wide range of topics, including Class, Weak formulation, Mosco convergence and Contact mechanics.
The concepts of his Quasistatic process study are interwoven with issues in Viscoplasticity, Classical mechanics, Function, Mechanics and Numerical analysis.
As part of the same scientific family, Mircea Sofonea usually focuses on Applied mathematics, concentrating on Monotonic function and intersecting with Mathematical proof.
He most often published in these fields:
- Mathematical analysis (47.92%)
- Weak solution (36.31%)
- Uniqueness (33.04%)
What were the highlights of his more recent work (between 2017-2021)?
- Applied mathematics (30.36%)
- Weak formulation (13.10%)
- Uniqueness (33.04%)
In recent papers he was focusing on the following fields of study:
His primary areas of investigation include Applied mathematics, Weak formulation, Uniqueness, Weak solution and Variational inequality.
His Applied mathematics research is multidisciplinary, incorporating elements of Optimal control, Mosco convergence, Optimization problem, Inequality and Contact mechanics.
His Weak solution study is concerned with the larger field of Mathematical analysis.
His studies examine the connections between Mathematical analysis and genetics, as well as such issues in Displacement, with regards to Fixed-point theorem.
His study in Variational inequality is interdisciplinary in nature, drawing from both Well posedness and Metric space.
His work deals with themes such as Quasistatic process and Fixed point, which intersect with Constitutive equation.
Between 2017 and 2021, his most popular works were:
- Numerical analysis of stationary variational-hemivariational inequalities (34 citations)
- Numerical analysis of hemivariational inequalities in contact mechanics (33 citations)
- Optimization problems for elastic contact models with unilateral constraints (33 citations)
In his most recent research, the most cited papers focused on:
- Mathematical analysis
- Thermodynamics
- Algebra
His primary scientific interests are in Applied mathematics, Optimal control, State, Weak formulation and Banach space.
His Applied mathematics research includes elements of Mathematical proof, Uniqueness, Compact space and Monotonic function.
Mircea Sofonea has researched Compact space in several fields, including Displacement field, Weak solution, Strongly monotone, Viscoelasticity and Lipschitz continuity.
His Optimal control study integrates concerns from other disciplines, such as Current and Boundary value problem.
His research integrates issues of Numerical analysis, Mathematical problem, Computer simulation and Contact mechanics in his study of Variational inequality.
Class is a primary field of his research addressed under Mathematical analysis.
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