2 research outputs found
Miura-Type Transformations for Integrable Lattices in 3D
This article studies a class of integrable semi-discrete equations with one continuous and two discrete independent variables. At present, in the literature there are nine integrable equations of the form un+1,xj=f(un,xj,unj+1,unj,un+1j,un+1j−1) up to point transformations. An efficient method based on some relation that generalizes the notion of the local conservation law is proposed for searching for Miura-type transformations relating to semi-discrete equations in 3D. The efficiency of the method is illustrated with the equations from the list. For one of the equations, which is little studied, the continuum limit is calculated. For this equation, the problem of finite-field reductions in the form of Darboux integrable systems of equations of a hyperbolic type is discussed. For reductions of small orders, N=1 and N=2, complete sets of characteristic integrals are presented. Note that the existence of characteristic integrals makes it possible to construct particular solutions to the original lattice. For the case N=1, an explicit solution was found in this paper. A new semi-discrete equation is found that lies beyond the considered class. For this equation, the Lax pair is presented
Abstracts of the First Eurasian Conference; The Coronavirus Pandemic and Critical ICT Infrastructure
While the world is struggling with COVID-19, the ICT industry seeks to play a constructive role in combating the spread of the virus. This book contains the abstracts of the papers presented at The First Eurasian Conference; The Coronavirus Pandemic and Critical ICT Infrastructure (PANDEMIC-ICT-2020) organized by AMIR Technical Services LLC, Tbilisi, Georgia held on November 28-30, 2020.
Conference Title: The Coronavirus Pandemic and Critical ICT InfrastructureConference Acronym: PANDEMIC-ICT-2020Conference Date: 28-30 November 2020Conference Location: Online (Virtual Mode)Conference Organizer: AMIR Technical Services LLC, Tbilisi, Georgi