The organizers of the conference do not authorise any external subjects to arrange or propose accommodation for the participants. If you receive e-mails from travel or housing agencies etc., containing booking offers and requests for sending your personal data or advance payment, you should treat them as scam. 

All official communications will only come from our conference email (simons2026@impan.pl) or directly from our organizers' institutional emails.

This event is a part of the Simons Semester Continued Fractions, Fractals, Ergodic theory and Dynamics. The conference will be a central event of the Semester, hosting both leaders of the field and young researchers, allowing for intense interactions. It will bring together the main topics of focus of the Semester.

Diophantine approximation is one of the central fields of number theory, dealing with the speed of approximation of irrational numbers with rational numbers. It is intimately linked with ergodic theory and fractal geometry, with continued fractions being a major tool in each of those fields. For instance, it turned out that studying continued fraction expansion with bounded partial quotients can help one to gain understanding of the structure of Lagrange and Markov spectra, that give “best constants” in approximation of irrational numbers. More generally, the sets defined in terms of continued fractions of their elements have very intricate, fractal structure, and their Hausdorff dimension plays an important role in Number-theoretic applications - in particular in Zaremba conjecture and in the problem of counting spanning trees in planar graphs. In holomorphic dynamics, a classical result by Brjuno-Yoccoz states that for a quadratic polynomial with a rationally indifferent fixed point the dynamics near this point is analytically conjugate to a rotation if and only if the associated Brjuno function evaluated at the rotation angle is finite. Brjuno functions, used as a tool in holomorphic dynamics, on their own present an independent interest. In addition they have deep connections with Kolmogorov–Arnold–Moser (KAM) theory of quasiperiodic motions for Hamiltonian systems, through which continued fractions appear in astronomy when studying the stability of motion of objects in space such as planets and asteroids.

INVITED SPEAKERS