Your search keyword '"Giorgio Gubbiotti"' showing total 12 results

1. Algebraic entropy for face-centered quad equations

Author

Andrew P. Kels, Giorgio Gubbiotti, Gubbiotti, Giorgio, and Kels, Andrew

Subjects

Statistics and Probability, Pure mathematics, 37A35, 39A14, Quadrilateral, Nonlinear Sciences - Exactly Solvable and Integrable Systems, General Physics and Astronomy, FOS: Physical sciences, Statistical and Nonlinear Physics, Mathematical Physics (math-ph), System of linear equations, Square lattice, Vertex (geometry), Entropy (classical thermodynamics), Quadratic equation, Modeling and Simulation, Algebraic number, Exactly Solvable and Integrable Systems (nlin.SI), Unit (ring theory), Mathematical Physics, Mathematics

Abstract

In this paper we define the algebraic entropy test for face-centered quad equations, which are equations defined on vertices of a quadrilateral plus an additional interior vertex. This notion of algebraic entropy is applied to a recently introduced class of these equations that satisfy a new form of multidimensional consistency called consistency-around-a-face-centered-cube (CAFCC), whereby the system of equations is consistent on a face-centered cubic unit cell. It is found that for certain arrangements of equations (or pairs of equations) in the square lattice, all known CAFCC equations pass the algebraic entropy test possessing either quadratic or linear growth., Comment: 46 pages; 13 figures; 2 tables

Published

2021

2. A Novel Integrable Fourth-Order Difference Equation Admitting Three Invariants

Author

Giorgio Gubbiotti, M. B. Paranjape, Richard MacKenzie, Zora Thomova, Pavel Winternitz William Witczak-Krempa, and Gubbiotti, Giorgio

Subjects

Reduction (complexity), Pure mathematics, Fourth order, Integrable system, Differential equation, Novelty, Mathematics

Abstract

In this short note we present a novel integrable fourth-order difference equation. This equation is obtained as a stationary reduction from a known integrable differential-difference equation. The novelty of the equation is inferred from the number and shape of its invariants.

Published

2020

3. Lax pairs for the discrete reduced Nahm systems

Author

Giorgio Gubbiotti and Gubbiotti, G.

Subjects

Pure mathematics, Discretization, General problem, Difference equation, Reduced Nahm systems, FOS: Physical sciences, 01 natural sciences, 37K10, 37M15, 39A10, Mathematics::Numerical Analysis, Integrable discretisation, 0103 physical sciences, Quantitative Biology::Populations and Evolution, 0101 mathematics, Invariant (mathematics), 010306 general physics, Equivalence (measure theory), Physics::Atmospheric and Oceanic Physics, Mathematical Physics, Mathematics, Lax pair, Nonlinear Sciences - Exactly Solvable and Integrable Systems, 010102 general mathematics, Mathematical Physics (math-ph), Nonlinear Sciences::Exactly Solvable and Integrable Systems, Computer Science::Mathematical Software, Geometry and Topology, Exactly Solvable and Integrable Systems (nlin.SI)

Abstract

We discretise the Lax pair for the reduced Nahm systems and prove its equivalence with the Kahan-Hirota-Kimura discretisation procedure. We show that these Lax pairs guarantee the integrability of the discrete reduced Nahm systems providing an invariant. Also, we show with an example that Nahm systems cannot solve the general problem of characterisation of the integrability for Kahan-Hirota-Kimura discretisations., Comment: 14 pages

Published

2020

4. SPACE of INITIAL VALUES of A MAP with A QUARTIC INVARIANT

Author

Giorgio Gubbiotti, Nalini Joshi, Gubbiotti, G., and Joshi, N.

Subjects

Pure mathematics, Special solution, 14E15, General Mathematics, 39A10, FOS: Physical sciences, 14E05, 14E15, 14H70, 14J17, 37F10, 39A10, 14H70, 01 natural sciences, 37F10, 010305 fluids & plasmas, symbols.namesake, Mathematics::Algebraic Geometry, Quartic function, 0103 physical sciences, Algebraic number, Invariant (mathematics), 010306 general physics, Mathematical Physics, Mathematics, Nonlinear Sciences - Exactly Solvable and Integrable Systems, 14E05, Mathematical Physics (math-ph), Planar graph, 2020 Mathematics subject classification, symbols, Exactly Solvable and Integrable Systems (nlin.SI), 14J17

Abstract

We compactify and regularize the space of initial values of a planar map with a quartic invariant and use this construction to prove its integrability in the sense of algebraic entropy. The system turns out to have certain unusual properties, including a sequence of points of indeterminacy in $\mathbb P^1\cross \mathbb P^1$. These indeterminacy points are shown to lie on a singular fibre of the mapping to a corresponding QRT system and provide the existence of a one-parameter family of special solutions., 10 pages, 1 figures

Published

2020

5. Algebraic Entropy of a Class of Five-Point Differential-Difference Equations

Author

Giorgio Gubbiotti and Gubbiotti, G.

Subjects

Pure mathematics, algebraic entropy, Physics and Astronomy (miscellaneous), Integrable system, General Mathematics, FOS: Physical sciences, Differential difference equations, 34K12, 37K10, Integrability, integrability, 01 natural sciences, Generalised symmetrie, 0103 physical sciences, Computer Science (miscellaneous), Algebraic number, 010306 general physics, Mathematical Physics, Mathematics, Nonlinear Sciences - Exactly Solvable and Integrable Systems, lcsh:Mathematics, Algebraic entropy, Mathematical Physics (math-ph), generalised symmetries, lcsh:QA1-939, Chemistry (miscellaneous), 010307 mathematical physics, Exactly Solvable and Integrable Systems (nlin.SI)

Abstract

We compute the algebraic entropy of a class of integrable Volterra-like five-point differential-difference equations recently classified using the generalised symmetry method. We show that, when applicable, the results of the algebraic entropy agrees with the result of the generalised symmetry method, as all the equations in this class have vanishing entropy., Comment: 21 pages

Published

2019

6. Integrable discrete autonomous quad-equations admitting, as generalized symmetries, known five-point differential-difference equations

Author

Ravil I. Yamilov, R. N. Garifullin, Giorgio Gubbiotti, Garifullin, R. N., Gubbiotti, G., and Yamilov, R. I.

Subjects

Pure mathematics, Nonlinear Sciences - Exactly Solvable and Integrable Systems, Integrable system, 010102 general mathematics, FOS: Physical sciences, Differential difference equations, Statistical and Nonlinear Physics, Mathematical Physics (math-ph), Integrability, Quad-equations, 01 natural sciences, Generalized symmetrie, Nonlinear Sciences::Exactly Solvable and Integrable Systems, 0103 physical sciences, Homogeneous space, Point (geometry), 010307 mathematical physics, Exactly Solvable and Integrable Systems (nlin.SI), 0101 mathematics, Mathematical Physics, 37L20, 37K10, 39A14, Mathematics

Abstract

In this paper we construct the autonomous quad-equations which admit as symmetries the five-point differential-difference equations belonging to known lists found by Garifullin, Yamilov and Levi. The obtained equations are classified up to autonomous point transformations and some simple non-autonomous transformations. We discuss our results in the framework of the known literature. There are among them a few new examples of both sine-Gordon and Liouville type equations., Comment: 27 pages

Published

2021

7. Bi-rational maps in four dimensions with two invariants

Author

Nalini Joshi, Giorgio Gubbiotti, Claude-Michel Viallet, Dinh T. Tran, Paris-Centre de Recherche Cardiovasculaire (PARCC - UMR-S U970), Université Paris Descartes - Paris 5 (UPD5)-Institut National de la Santé et de la Recherche Médicale (INSERM)-Hôpital Européen Georges Pompidou [APHP] (HEGP), Assistance publique - Hôpitaux de Paris (AP-HP) (AP-HP)-Hôpitaux Universitaires Paris Ouest - Hôpitaux Universitaires Île de France Ouest (HUPO)-Assistance publique - Hôpitaux de Paris (AP-HP) (AP-HP)-Hôpitaux Universitaires Paris Ouest - Hôpitaux Universitaires Île de France Ouest (HUPO), Laboratoire de Physique Théorique et Hautes Energies (LPTHE), Université Pierre et Marie Curie - Paris 6 (UPMC)-Université Paris Diderot - Paris 7 (UPD7)-Centre National de la Recherche Scientifique (CNRS), Viallet, Claude, Université Paris Descartes - Paris 5 (UPD5)-Hôpital Européen Georges Pompidou [APHP] (HEGP), Hôpitaux Universitaires Paris Ouest - Hôpitaux Universitaires Île de France Ouest (HUPO)-Assistance publique - Hôpitaux de Paris (AP-HP) (APHP)-Hôpitaux Universitaires Paris Ouest - Hôpitaux Universitaires Île de France Ouest (HUPO)-Assistance publique - Hôpitaux de Paris (AP-HP) (APHP)-Institut National de la Santé et de la Recherche Médicale (INSERM), Gubbiotti, G., Joshi, N., Tran, D. T., and Viallet, C. -M.

Subjects

Statistics and Probability, Inflation, Pure mathematics, Class (set theory), algebraic entropy, media_common.quotation_subject, FOS: Physical sciences, General Physics and Astronomy, [MATH] Mathematics [math], integrability, 01 natural sciences, [PHYS] Physics [physics], 0103 physical sciences, [NLIN] Nonlinear Sciences [physics], Point (geometry), [NLIN]Nonlinear Sciences [physics], inflation, [MATH]Mathematics [math], 0101 mathematics, Mathematical Physics, Mathematics, media_common, [PHYS]Physics [physics], Nonlinear Sciences - Exactly Solvable and Integrable Systems, Degree (graph theory), Liouville integrability, bi-rational map, 010102 general mathematics, difference equation, Statistical and Nonlinear Physics, Mathematical Physics (math-ph), 37F10, 37J15, 39A10, Modeling and Simulation, 010307 mathematical physics, Exactly Solvable and Integrable Systems (nlin.SI)

Abstract

In this paper we present a class of four-dimensional bi-rational maps with two invariants satisfying certain constraints on degrees. We discuss the integrability properties of these maps from the point of view of degree growth and Liouville integrability., 26 pages. arXiv admin note: text overlap with arXiv:1808.04942

Published

2020

8. Darboux Integrability of Trapezoidal H4 and H6 Families of Lattice Equations II: General Solutions

Author

Ravil I. Yamilov, Giorgio Gubbiotti, and Christian Scimiterna

Subjects

Pure mathematics, 010102 general mathematics, Mathematical analysis, First integrals, Darboux integral, 01 natural sciences, Nonlinear Sciences::Exactly Solvable and Integrable Systems, Lattice (order), 0103 physical sciences, 010307 mathematical physics, Geometry and Topology, 0101 mathematics, Mathematical Physics, Analysis, Mathematics

Abstract

In this paper we construct the general solutions of two families of quad-equations, namely the trapezoidal $H^{4}$ equations and the $H^{6}$ equations. These solutions are obtained exploiting the properties of the first integrals in the Darboux sense, which were derived in [Gubbiotti G., Yamilov R.I., J. Phys. A: Math. Theor. 50 (2017), 345205, 26 pages, arXiv:1608.03506]. These first integrals are used to reduce the problem to the solution of some linear or linearizable non-autonomous ordinary difference equations which can be formally solved.

Published

2018

9. A two-periodic generalization of the QV equation

Author

Giorgio Gubbiotti, C. Scimiterna, Decio Levi, Gubbiotti, G., Scimiterna, C., and Levi, D.

Subjects

Pure mathematics, Generalization, 010102 general mathematics, 0103 physical sciences, 010307 mathematical physics, 0101 mathematics, 01 natural sciences, Mathematics

Published

2017

10. Integrability of Difference Equations Through Algebraic Entropy and Generalized Symmetries

Author

Giorgio Gubbiotti and Gubbiotti, Giorgio

Subjects

Pure mathematics, Quick Test, Integrable system, 01 natural sciences, Discrete equation, ComputingMethodologies_SYMBOLICANDALGEBRAICMANIPULATION, 0103 physical sciences, Homogeneous space, 010307 mathematical physics, Algebraic number, 010306 general physics, Differential algebraic geometry, Finite set, Mathematics, Mathematical physics

Abstract

Given an equation arising from some application or theoretical consideration one of the first questions one might ask is: What is its behavior? It is integrable? In these lectures we will introduce two different ways for establishing (and in some sense also defining) integrability for difference equations: Algebraic Entropy and Generalized Symmetries. Algebraic Entropy deals with the degrees of growth of the solution of any kind of discrete equation (ordinary, partial or even differential-difference) and usually provides a quick test to establish if an equation is or not integrable. The approach based on Generalized Symmetries also provides tools for investigating integrable equations and to find particular solutions by symmetry reductions. The main focus of the lectures will be on the computational tools that allow us to calculate Generalized Symmetries and extract the value of the Algebraic Entropy from a finite number of iterations of the map.

Published

2017

11. Algebraic entropy, symmetries and linearization of quad equations consistent on the cube

Author

Decio Levi, Christian Scimiterna, Giorgio Gubbiotti, Gubbiotti, Giorgio, Scimiterna, Christian, and Levi, Decio

Subjects

Pure mathematics, Nonlinear Sciences - Exactly Solvable and Integrable Systems, FOS: Physical sciences, Statistical and Nonlinear Physics, Mathematical Physics (math-ph), Partial difference equations, Nonlinear system, Nonlinear Sciences::Exactly Solvable and Integrable Systems, Linearization, Homogeneous space, Algebraic number, Exactly Solvable and Integrable Systems (nlin.SI), Mathematical Physics, Mathematics, Statistical and Nonlinear Physic

Abstract

We discuss the non autonomous nonlinear partial difference equations belonging to Boll classification of quad graph equations consistent around the cube. We show how starting from the compatible equations on a cell we can construct the lattice equations, its B\"acklund transformations and Lax pairs. By carrying out the algebraic entropy calculations we show that the $H^4$ trapezoidal and the $H^6$ families are linearizable and in a few examples we show how we can effectively linearize them.

Published

2016

12. The non-autonomous YdKN equation and generalized symmetries of Boll equations

Author

Giorgio Gubbiotti, Christian Scimiterna, Decio Levi, Gubbiotti, G., Scimiterna, C., and Levi, D.

Subjects

Pure mathematics, Nonlinear Sciences - Exactly Solvable and Integrable Systems, Discretization, Integrable system, Entropy (statistical thermodynamics), 010102 general mathematics, FOS: Physical sciences, Statistical and Nonlinear Physics, Graph theory, Mathematical Physics (math-ph), 01 natural sciences, 39-XX, 70G65, 37K10, Nonlinear dynamical systems, Nonlinear system, Nonlinear Sciences::Exactly Solvable and Integrable Systems, 0103 physical sciences, Homogeneous space, 010307 mathematical physics, Exactly Solvable and Integrable Systems (nlin.SI), 0101 mathematics, Algebraic number, Mathematical Physics, Mathematics

Abstract

In this paper, we study the integrability of a class of nonlinear non-autonomous quad graph equations compatible around the cube introduced by Boll in the framework of the generalized Adler, Bobenko, and Suris (ABS) classification. We show that all these equations possess three-point generalized symmetries which are subcases of either the Yamilov discretization of the Krichever–Novikov equation or of its non-autonomous extension. We also prove that all those symmetries are integrable as they pass the algebraic entropy test.

Published

2017