AbstractThe classification of 2-component systems of equations for the form uit = uixxx + cijuiujx (i, j = 1, 2) which possess higher symmetries is given. A new class of such integrable KdV-like systems is obtained. All the computations have been done using the REDUCE computer algebra system
This paper is devoted to the complete classification of integrable one-component evolution equations...
AbstractWe show how the triangularization method of Moreno Maza can be successfully applied to the p...
A class of multi-component integrable systems associated to Novikov algebras, which interpolate betw...
The foundations of the symmetry approach to the classification problem of integrable non-linear evol...
We give the conditions for a system of N-coupled Korteweg de Vries (KdV) type of equations to be int...
This thesis is devoted to the classification of integrable two-component polynomial homogeneous syst...
We investigate symmetries and reductions of a coupled KdV system with variable coef-ficients. The in...
This paper is devoted to classifying second order evolution equations with two components. Combining...
AbstractThis paper is devoted to classifying second order evolution equations with two components. C...
This paper is devoted to classifying second order evolution equations with two components. Combining...
AbstractA new isospectral problem is designed and the multi-component second mKdV equation is worked...
By introducing a 3×3 matrix Lie algebra and employing the generalized Tu scheme, a AKNS isospectral–...
We found matrix integro-differential Lax representations for Davey-Stewartson systems (DSI, DS-II, D...
Multi-component Korteweg-de Vries (KdV) type of nonautonomous systems in (1+1) dimensions are classi...
Abstract: Using the machinery of Lie group analysis the nonlinear variable coefficients coupled KdV ...
This paper is devoted to the complete classification of integrable one-component evolution equations...
AbstractWe show how the triangularization method of Moreno Maza can be successfully applied to the p...
A class of multi-component integrable systems associated to Novikov algebras, which interpolate betw...
The foundations of the symmetry approach to the classification problem of integrable non-linear evol...
We give the conditions for a system of N-coupled Korteweg de Vries (KdV) type of equations to be int...
This thesis is devoted to the classification of integrable two-component polynomial homogeneous syst...
We investigate symmetries and reductions of a coupled KdV system with variable coef-ficients. The in...
This paper is devoted to classifying second order evolution equations with two components. Combining...
AbstractThis paper is devoted to classifying second order evolution equations with two components. C...
This paper is devoted to classifying second order evolution equations with two components. Combining...
AbstractA new isospectral problem is designed and the multi-component second mKdV equation is worked...
By introducing a 3×3 matrix Lie algebra and employing the generalized Tu scheme, a AKNS isospectral–...
We found matrix integro-differential Lax representations for Davey-Stewartson systems (DSI, DS-II, D...
Multi-component Korteweg-de Vries (KdV) type of nonautonomous systems in (1+1) dimensions are classi...
Abstract: Using the machinery of Lie group analysis the nonlinear variable coefficients coupled KdV ...
This paper is devoted to the complete classification of integrable one-component evolution equations...
AbstractWe show how the triangularization method of Moreno Maza can be successfully applied to the p...
A class of multi-component integrable systems associated to Novikov algebras, which interpolate betw...
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