Postdoctoral position in my group!

If you are interested in working within our group on a project related to symmetric functions, algebraic or/and enumerative combinatorics, I am happy to announce that we are offering a one-year postdoctoral position for you!

Below you can find all the information in English, and here is the information in Polish.

The research group led by Maciej Dołęga at the Institute of Mathematics of the Polish Academy of Sciences in Kraków, Poland, is seeking highly qualified candidates for a postdoctoral position for 12 months in the project One-parameter deformations in symmetric functions theory, funded by the National Science Centre.

About the project: The project is devoted to the study of one-parameter deformations in symmetric function theory with relations to the following areas: algebraic combinatorics, enumerative combinatorics (with emphasis on enumerative combinatorics of ribbon graphs), enumerative geometry, integrable hierarchies, probability, topological recursion (here are more details).

Details:

  • A PhD in mathematics or mathematical physics is required before starting employment.
  • Expertise in one of the following areas will be a significant advantage: algebraic combinatorics, enumerative combinatorics, enumerative geometry. Nevertheless, expertise in any area related to the project will be considered as an advantage.
  • Good communication skills in English are expected.
  • The fellow must respect the NCN rules of funding.

To apply: please submit:

The candidates may be asked to participate in an interview or remote interview with the members of the hiring committee.

All documents should be sent by email to the address mdolega@impan.pl by April 15, 2024 for full consideration.

We encourage candidates to apply regardless of gender, racial or ethnic origins, religion or belief, disability, age, or sexual orientation.

Any questions? - do not hesitate to ask me!

Maciej Dołęga
Maciej Dołęga
Associate Professor of Mathematics

Algebraic combinatorics, probability, representation theory and enumerative combinatorics/geometry.