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, Highdimensional 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, L^{2}cohomology. 

emer. 
Additive number theory. 

Prof. David Ginzburg 

Automorphic forms; Lfunctions. 


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; Nonstandard 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. 