Beilina, Larisa.
Overview
| Works: | 1 works in 6 publications in 1 languages | |
|---|---|---|
Titles
Inverse Problems and Applications
by:
SpringerLink (Online service); Beilina, Larisa.
(Language materials, printed)
, [http://id.loc.gov/vocabulary/relators/edt]
Numerical linear algebra = theory and applications /
by:
Karchevskii, Mikhail.; SpringerLink (Online service); Karchevskii, Evgenii.; Beilina, Larisa.
(Language materials, printed)
Applied inverse problems = select contributions from the first annual Workshop on Inverse Problems /
by:
Workshop on the Preservation of Stability under Discretization ((2001 :); Beilina, Larisa.; SpringerLink (Online service)
(Language materials, printed)
Inverse problems and applications
by:
SpringerLink (Online service); Workshop on the Preservation of Stability under Discretization ((2001 :); Beilina, Larisa.
(Language materials, printed)
Mathematical and Numerical Approaches for Multi-Wave Inverse Problems = CIRM, Marseille, France, April 1–5, 2019 /
by:
Da Silva, Anabela.; SpringerLink (Online service); Cristofol, Michel.; Bergounioux, Maïtine.; Beilina, Larisa.; Litman, Amelie.
(Language materials, printed)
, [http://id.loc.gov/vocabulary/relators/edt]
Gas dynamics with applications in industry and life sciences = On Gas Kinetic/Dynamics and Life Science Seminar, March 25-26, 2021 and March 17-18, 2022 /
by:
Asadzadeh, Mohammad.; SpringerLink (Online service); Takata, Shigeru.; Workshop on the Preservation of Stability under Discretization ((2001 :); Beilina, Larisa.
(Language materials, printed)
Inverse problems and large-scale computations
by:
SpringerLink (Online service); Shestopalov, Yury V.; Beilina, Larisa.; Workshop on Inverse Problems (2012 :)
(Language materials, printed)
Approximate global convergence and adaptivity for coefficient inverse problems
by:
Beilina, Larisa.; Klibanov, Michael Victor.; SpringerLink (Online service)
(Language materials, printed)
Subjects
Numerical and Computational Physics.
Mathematical Methods in Physics.
Mathematical Applications in the Physical Sciences.
Numerical analysis.
Difference equations.
Differential Equations.
Special functions.
Partial Differential Equations.
Mathematical Physics.
Mathematics.
Matrix theory.
Difference and Functional Equations.
Gas dynamics
Functional equations.
Mathematical models.
Appl.Mathematics/Computational Methods of Engineering.
Finite element method.
Operator Theory.
Continuum Mechanics and Mechanics of Materials.
Algebra.
Mathematical Modeling and Industrial Mathematics.
Inverse problems (Differential equations)
Linear and Multilinear Algebras, Matrix Theory.
Numerical Analysis.
Mathematical physics.
Global Analysis and Analysis on Manifolds.
Algebras, Linear.
Operator theory.
Mathematical models
Analysis.
Computational Science and Engineering.
Special Functions.