Add to ORKGAbstract: A method for integration of the Cauchy problem for the hyperbolic system (the so-called continuum limit of the Toda lattice, see above) is proposed.∂ α / ∂ t = - (β-α)/4 ∂ α/ ∂ x ,∂ β / ∂ t = - (β-α)/4 ∂ β/ ∂ x ,α(x,0)=α(x), β(x,0)=β(x),α(0,t)=β(0,t)=α(0), α(1,t)=β(1,t)=α(1).The method is based on some extremal problems of the theory of logarithmic potentials. The method is justified by means of the known results of the asymptotic theory of the polynomials orthogonal with respect to a discrete measure.Note: Research direction:Mathematical problems and theory of numerical method
In this dissertation the partition function, Zn, for the six-vertex model with domain wall boundary ...
The Toda lattice is a one-dimensional lattice with exponential interactions between nearest neighbor...
Abstract: A goal of this preprint is to provide an analytical understanding of dispersive ...
Abstract: We present the derivation of equations for the interval of equilibrium for the c...
Mathematical structures of integrable systems, its deepening and expansion. September 9-11, 2019. ed...
Discrete integrable nonlinear differential difference equations (NDDEs) have various mathematical st...
AbstractLimit relations between classical continuous (Jacobi, Laguerre, Hermite) and discrete (Charl...
We consider the first member of an extended Toda lattice hierarchy. This system of equations is diff...
Abstract. We present the first detailed numerical study of the Toda equations in 2 + 1 dimensions in...
© 2016, Institute of Mathematics. All rights reserved. In this paper we present multidimensional ana...
Several inverse spectral problems are solved by a method which is based on exact solu-tions of the s...
Abstract. This paper is concerned with the asymptotic behavior of the free energy for a class of Her...
Abstract: A limiting property of the coefficients of the nearest-neighbor recurrence coeff...
An integrability criterion for discrete systems based on singularity confinement has been defined re...
We study the DNLS and its dispersionless limit based on a family of matrices, named after Cantero, M...
In this dissertation the partition function, Zn, for the six-vertex model with domain wall boundary ...
The Toda lattice is a one-dimensional lattice with exponential interactions between nearest neighbor...
Abstract: A goal of this preprint is to provide an analytical understanding of dispersive ...
Abstract: We present the derivation of equations for the interval of equilibrium for the c...
Mathematical structures of integrable systems, its deepening and expansion. September 9-11, 2019. ed...
Discrete integrable nonlinear differential difference equations (NDDEs) have various mathematical st...
AbstractLimit relations between classical continuous (Jacobi, Laguerre, Hermite) and discrete (Charl...
We consider the first member of an extended Toda lattice hierarchy. This system of equations is diff...
Abstract. We present the first detailed numerical study of the Toda equations in 2 + 1 dimensions in...
© 2016, Institute of Mathematics. All rights reserved. In this paper we present multidimensional ana...
Several inverse spectral problems are solved by a method which is based on exact solu-tions of the s...
Abstract. This paper is concerned with the asymptotic behavior of the free energy for a class of Her...
Abstract: A limiting property of the coefficients of the nearest-neighbor recurrence coeff...
An integrability criterion for discrete systems based on singularity confinement has been defined re...
We study the DNLS and its dispersionless limit based on a family of matrices, named after Cantero, M...
In this dissertation the partition function, Zn, for the six-vertex model with domain wall boundary ...
The Toda lattice is a one-dimensional lattice with exponential interactions between nearest neighbor...
Abstract: A goal of this preprint is to provide an analytical understanding of dispersive ...