Research fields in Pure Mathematics
Name | Research Field | ||
|
Ergodic theory; Probability; Dynamics. |
||
Prof. Semyon Alesker |
|
Convexity. |
|
|
Combinatorics, graph theory and their applications to theoretical computer science; Combinatorial algorithms and circuit complexity; Algebraic and probabilistic methods in combinatorics. |
||
Prof. Dan Amir |
emer. |
Functional analysis; Approximation theory. |
|
Prof. Aharon Atzmon |
emer. |
Harmonic analysis; Operator theory. |
|
|
Asymptotic Geometric Analysis, High-dimensional Convexity. |
||
|
Galois Theory, Field Arithmetic, Profinite Groups, Number Theory. |
||
Prof. Asher Ben Artzi |
|
Operator theory. |
|
|
Algebraic geometry; Representation theory. |
||
Prof. Michael Bialy |
|
Hamiltonian systems; Dynamical systems. |
|
|
Algebraic groups; Number theory. |
||
Dr. Yuli Eidelman |
|
Numerical methods of linear algebra and operator theory. |
|
Prof. Daniel Eidus |
emer. |
- |
Differential equations. |
emer. |
Topology, Morse theory, L2-cohomology. |
||
emer. |
Additive number theory. |
||
Prof. David Ginzburg |
|
Automorphic forms; L-functions. |
|
|
Set theory; Mathematical logic. |
||
|
Ergodic theory; Topological dynamics. |
||
Prof. Efim Gluskin |
|
Functional analysis. |
|
Dr. Assaf Goldberger |
|
Number Theory; Linear Algbera. |
|
|
Fields arithmetic; Profinite groups. |
||
Prof. Marcel Herzog |
emer. |
Group theory; Group representations. |
|
emer. |
Logic; Non-standard analysis; Foundation of computer science. |
||
Prof. Amnon Jakimovski |
emer. |
Classical analysis. |
|
emer. |
The arithmetic of fields. |
||
Prof. Shoshana Kamin |
emer. |
Partial differential equations. |
|
|
Convex geometry; Analysis. |
||
Prof. Abraham Klein |
emer. |
Ring theory. |
|
|
Combinatorics and its applications to theoretical computer science. |
||
emer. |
Functional analysis. |
||
|
Approximation theory. |
||
Prof. Vladimir Matsaev |
emer. |
Operator theory; Functions of complex variables. |
|
emer. |
Functional analysis; Geometric analysis; Convexity. |
||
|
Probability Theory. |
||
Prof. Alexander Olevskii |
emer. |
Real and harmonic analysis. |
|
|
Symplectic topology; Hamiltonian dynamics. |
||
emer. |
Analysis, Partial differential equations, Analytic geometry and singularities, Inverse problems of mathematical physics. |
||
|
Probability theory and its applications; Statistical physics. |
||
|
Symplectic topology and dynamical systems. |
||
Prof. Shmuel Rosset |
emer. |
Algebra. |
|
|
Number theory. |
||
Dr. Inna Scherbak |
|
Algebraic geometry. Singularity theory |
|
Prof. Jochanan Schonheim |
emer. |
Graph theory; Combinatorial mathematics; Combinatorial group theory; Combinatorial number theory. |
|
Prof. Yehuda Shalom |
|
Lie groups; Discrete groups. |
|
|
Combinatorics and its applications to theoretical computer science. |
||
|
Real and complex algebraic geometry. |
||
Prof. Alexander Sodin |
|
Mathematical physics. |
|
Prof. Mikhail Sodin |
|
Complex analysis and its applications. |
|
Prof. David Soudry |
|
Automorphic forms; Representation theory; Harmonic analysis. |
|
|
Probability theory. |
||
|
Dynamical Systems. |
||
|
Combinatorics. |