Add to ORKGWe prove that 1) diagonal systems of hydrodynamic type are Darboux integrable if and only if the corresponding systems for commuting flows are Darboux integrable, 2) systems for commuting flows are Darboux integrable if and only if the Laplace transformation sequences terminate, 3) Darboux integrable systems are necessarily semihamiltonian. We give geometric interpretation for Darboux integrability of such systems in terms of congruences of lines and in terms of solution orbits with respect to symmetry subalgebras, discuss known and new examples
The invariant differential-geometric approach to the integrability of (2+1)- dimensional systems of ...
The invariant differential-geometric approach to the integrability of (2+1)- dimensional systems of ...
The integrability of m-component systems of hydrodynamic type, u_t = V(u)u_x, by the generalized hod...
The Darboux transformation approach is one of the most effective methods for constructing explicit s...
This article reviews some recent theoretical results about the structure of Darboux integrable diffe...
Abstract In this article we summarize the results on algebraic aspects of integrability for polynomi...
This is the first book to systematically state the fundamental theory of integrability and its devel...
Abstract: The paper is divided into two parts. In the first one we present a survey about the theory...
The conserved densities of hydrodynamic type system in Riemann invariants satisfy a system of liner ...
We study the Darboux integrability of two differential systems with parameters: the Raychaudhuri equ...
The integrability of m-component systems of hydrodynamic type, ut = V (u)ux, by the generalized hodo...
The Darboux–Egoroff system of PDEs with any number n ≥ 3 of independent variables plays an essential...
The invariant differential-geometric approach to the integrability of (2+1)- dimensional systems of ...
International audienceIn this talk, I will present a geometric interpretation of some integrable sys...
Macroscopic dynamics of soliton gases can be analytically described by the thermodynamic limit of th...
The invariant differential-geometric approach to the integrability of (2+1)- dimensional systems of ...
The invariant differential-geometric approach to the integrability of (2+1)- dimensional systems of ...
The integrability of m-component systems of hydrodynamic type, u_t = V(u)u_x, by the generalized hod...
The Darboux transformation approach is one of the most effective methods for constructing explicit s...
This article reviews some recent theoretical results about the structure of Darboux integrable diffe...
Abstract In this article we summarize the results on algebraic aspects of integrability for polynomi...
This is the first book to systematically state the fundamental theory of integrability and its devel...
Abstract: The paper is divided into two parts. In the first one we present a survey about the theory...
The conserved densities of hydrodynamic type system in Riemann invariants satisfy a system of liner ...
We study the Darboux integrability of two differential systems with parameters: the Raychaudhuri equ...
The integrability of m-component systems of hydrodynamic type, ut = V (u)ux, by the generalized hodo...
The Darboux–Egoroff system of PDEs with any number n ≥ 3 of independent variables plays an essential...
The invariant differential-geometric approach to the integrability of (2+1)- dimensional systems of ...
International audienceIn this talk, I will present a geometric interpretation of some integrable sys...
Macroscopic dynamics of soliton gases can be analytically described by the thermodynamic limit of th...
The invariant differential-geometric approach to the integrability of (2+1)- dimensional systems of ...
The invariant differential-geometric approach to the integrability of (2+1)- dimensional systems of ...
The integrability of m-component systems of hydrodynamic type, u_t = V(u)u_x, by the generalized hod...