67 Conferences false [["minutes", "Minutes"], ["notes", "Notes"], ["paper", "Paper"], ["poster", "Poster"], ["slides", "Slides"], ["summary", "Summary"]] University of Warsaw krolb@fuw.edu.pl 307 SIDE14@fuw.edu.pl,maciejun@fuw.edu.pl,aszer@fuw.edu.pl SIDE 14.2 SIDE 14.2 is the fourteenth in a series of biennial conferences dedicated to Symmetries and Integrability of Difference Equations, and in particular to: ordinary and partial difference equations, analytic difference equations, orthogonal polynomials and special functions, symmetries and reductions, discrete differential geometry, integrable discrete systems on graphs, integrable dynamical mappings, (discrete) Painlevé equations, integrability criteria, Yang-Baxter type equations, cluster algebras, difference Galois theory, quantum mappings, quantum field theory on space-time lattices, representation theory, combinatorics, numerical models of differential equations, discrete stochastic models and other related topics. False Faculty of Physics, University of Warsaw

Pasteura 5, Warsaw

Lecture hall: 0.06 2023-06-19T08:00:00 2023-06-23T18:10:00 2022-10-24T15:25:45 2023-06-19T02:50:33 Europe/Warsaw Faculty of Physics, University of Warsaw maciejun@fuw.edu.pl University of Warsaw aszer@fuw.edu.pl 50 false [["minutes", "Minutes"], ["notes", "Notes"], ["paper", "Paper"], ["poster", "Poster"], ["slides", "Slides"], ["summary", "Summary"]] Geometrical view of the Lagrangian 1-from closure relation Dr. The Institute for Fundamental Study, Naresuan University sikariny@nu.ac.th Dr. The Institute for Fundamental Study, Naresuan University sikariny@nu.ac.th Mr. The Institute for Fundamental Study, Naresuan University thanadonk@nu.ac.th Faculty of Physics, University of Warsaw

Pasteura 5, Warsaw

Lecture hall: 0.06 We will present a geometrical interpretation of the Lagrangian 1-form closure relation, inferred as the multi-dimensional consistency in time evolution on the space of independent variables. New mathematical objects, such as Lagrange vector field and Hamilton vector field defined on the the space of independent variables, will be used to capture the integrability condition.