Institute for Geometry and Physics
The Institute for Geometry and Physics (IGAP) is a joint venture between SISSA and ICTP, a new actor in this scientific and cultural landscape, and aims at becoming a meeting point between mathematicians and physicists, a hub devoted to the exchange of ideas, techniques and experiences, and the training of young researchers interested in this fascinating research area.
Pavlo Gavrylenko – Advanced Mathematical Physics A. 22. Sturm–Liouville theory. Examples
Pavlo Gavrylenko – Advanced Mathematical Physics A. 21. Sturm–Liouville theory
Pavlo Gavrylenko – Advanced Mathematical Physics A. 20. Spherical functions. Rodrigues formula
Pavlo Gavrylenko – Advanced Mathematical Physics A. Problem solving 1.
Pavlo Gavrylenko – Adv. Math.Phys. A. 19. Separation of variables in 2d and 3d. Legendre polynomials
Pavlo Gavrylenko – Adv. Math. Phys. A. 18. Method of images for 2d Poisson equation. Conformal maps.
Pavlo Gavrylenko –Adv. Math.Phys. A. 17. Green function of Laplace operator in 2d. Reflection method
Pavlo Gavrylenko – Advanced Mathematical Physics A. 16. 2d Laplace equation in polar coordinates
P. Gavrylenko – Adv. Math. Phys. A. 15. Variational calculus. Laplace operator in polar coordinates.
Jasper Kager – Exact Solutions of Matrix Models and String Theories
Pavlo Gavrylenko – Adv. Math.Phys.A. 14. Various normal modes. Existence and uniqueness of solutions
Pavlo Gavrylenko – Adv. Math. Phys. A. 13. Partial Fourier transform; well- and ill-posed problems
Pavlo Gavrylenko – Adv. Math. Physics A. 12. Green functions of the wave equation in 1d, 2d and 3d
Pavlo Gavrylenko – Advanced Math. Phys. A. 11. Simplest retarded and advanced Green functions
Konstantin Aleshkin – Quasimaps and mirror symmetry for abelian GLSM
Pavlo Gavrylenko – Advanced Math. Phys. A. 10.Applications of the Fourier Transform: Green functions
Pavlo Gavrylenko – Advanced Mathematical Physics. A.9. Generalised functions.Weak forms of equations
Pavlo Gavrylenko – Adv. Math. Phys. A. 8. Properties of the Fourier transform. Generalised functions
Pavlo Gavrylenko – Adv. Mathematical Physics A. 7. Properties and examples of the Fourier transform
Pavlo Gavrylenko – Advanced Mathematical Physics A. 6. Discrete Fourier transform and its properties
Pavlo Gavrylenko – Adv. Math. Phys.A. 5. Time-dependent boundary conditions. Discrete Green function
Pavlo Gavrylenko – Adv. Math. Phys. A. 4. Wave equation in arbitrary 1+1 space. Boundary conditions.
Pavlo Gavrylenko – Advanced Mathematical Physics A. 3. Solution of the 1+1 wave equation
Pavlo Gavrylenko – Advanced Mathematical Physics A. 2. Classification of 2nd order PDEs
Pavlo Gavrylenko – Advanced Mathematical Physics A. 1. Physics origins of PDEs
Oleg Lisovyi — Many-faced Painlevé I
Davide Fioravanti — Integrability, gauge, black holes theories: their correspondences at work
Qianyu Hao — Exact WKB of solutions by Borel summation and open TBS
Ines Aniceto — Special function solutions of Painlevé equations
Marta Mazzocco — Triangulations and representations of quantum algebra