Integrable systems play a key role in establishing exact results. Besides their importance in statistical mechanics and stochastic processes, they also have emerged in high-energy theory, in particular QCD. The integrable structure gives access to study e.g. transport phenomena and non-equilibrium universality classes and also allows to obtain non-perturbative results.
Although the questions and motivations are specific to each field, the methodologies and mathematical structures are often common, e.g. Yang-Baxter equation, representation theory of quantum groups, (stochastic) dualities, Bethe ansatz methods, determinant formulas but also conformal field theories that for example allow to compute correlation functions in the Raise and Peel model.
This workshop aims to bring together experts and scholars to facilitate the exchange of ideas and cross-fertilization.
Mini-courses by:
- Gregory Korchemsky (Integrability in QCD and sl(2) spin chains)
- Tomaž Prosen (Integrability in stochastic circuits)
Supported by the Unimore Grant FAR23 interdisciplinare CUP-E93C23002040005
