Graduate School of Matehematics and Computer Science  > Thesis topics

PhD topics for 2026

(If you are a prospective Stipendium Hungaricum applicant, please see the information here)

Supervisor SH eligible topic Thesis proposal Department/Institute

BÁLINT Péter

 No

Spectral methods in dynamical systems

Department of Stochastics

BÁRÁNY Balázs, Tóth Bálint

 No

The Pólya web and related problem

Department of Stochastics

BOLLA Mariann

 No

Spectral properties of non-backtracking Laplacian matrices; application to spectral clustering and bond percolation on sparse graphs

Department of Stochastics

CSÁJI Balázs Csanád

 No

Reinforcement Learning

SZTAKI - Institute for Computer Science and Control

CSÁJI Balázs Csanád

 No

Statistical Learning

SZTAKI - Institute for Computer Science and Control

CSIMA Géza

 Yes

Interpretation of classical geometric problems in Thurston geometries

Department of Algebra and Geometry

GERBNER Dániel

 Yes

Generalized Turán problems

Alfréd Rényi Institute of Mathematics

GYENGE Ádám

 No

Algebraic Geometry

Department of Algebra and Geometry

HEGEDŰS Pál

 Yes

Reflection subgroups of finite and affine Weyl groups

Department of Algebra and Geometry

HEGEDŰS Pál

 Yes

Constants of Algebraic Derivations

Department of Algebra and Geometry

IVANYOS Gábor

 No

Algebraic methods in quantum information processing

Department of Algebra and Geometry

IVANYOS Gábor

 No

Graphs, algebra and algorithms

Department of Algebra and Geometry

KOLUMBÁN József

 No

Variational methods in magnetohydrodynamics

Department of Analysis and Operations Research

KOVÁCS Edith

 No

Contextual Stochastic Optimization

Department of Analysis and Operations Research

MATOLCSI Máté

 Yes

Selected applications of Fourier analysis

Department of Analysis and Operations Research

PACH Péter Pál

 Yes

Applications of the polynomial method

Department of Computer Science and Information Theory

PACH Péter Pál

 Yes

Arithmetic combinatorics

Department of Computer Science and Information Theory

PINTÉR Gergő

 Yes

Quantum mechanics meets topology and singularity theory

Institute  of Physics

PITRIK József

 Yes

Quantum Optimal Transport Theory

Department of Algebra and Geometry

SIMON Károly

 Yes

Self-similar and self-conformal fractals

Department of Stochastics

SIMON Károly

 Yes

Dimension theory of non-Markovian attractors and non-linear hyperbolic sets

Department of Stochastics

SZIRMAI Jenő

 Yes

Classical notions and problems in Thurston geometries and in higher dimensional hyperbolic spaces

Department of Algebra and Geometry

SZIRMAI Jenő

 No

Ball packings, coverings and Dirichlet-Voronoi cells in Thurston geometries

Department of Algebra and Geometry

TÓBIÁS András

 No

Population-genetic models with clonal interference: The case of moderate selection

Department of Computer Science and Information Theory

TÓTH János

 Yes

Problems in Formal Reaction Kinetics

Department of Analysis and Operations Research

VETŐ Bálint

 No

Asymptotics of exactly solvable models in the Kardar-Parisi-Zhang universality class

Department of Stochastics

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Last modified: 2025.11.20.