Add to ORKGGiven the tridiagonal matrix J(t) defining a Toda lattice solution, the dynamic behavior of zeros of polynomials associated to J(t) is analyzed. Also, under certain conditions the invariance of the spectrum of J(t) is established. Finally, an example of solution is presented, and the method given in [2] to obtain new solutions is illustrated.
AbstractFirst, we derive a simple connection between Toda and Langmuir lattices and give a character...
AbstractWe study the motion of zeros of time dependent orthogonal polynomials. We also relate the ta...
Abstract. The asymptotic behavior of the Toda lattice, when actingon real normal matrices, is studie...
Sufficient conditions for constructing a set of solutions of the Toda lattice are analyzed. First, u...
n this work we characterize a high-order Toda lattice in terms of a family of matrix polynomials ort...
n this work we characterize a high-order Toda lattice in terms of a family of matrix polynomials ort...
The tridiagonal Toda lattice equation is a fundamental example of an explicitly solvable differentia...
The tridiagonal Toda lattice equation is a fundamental example of an explicitly solvable differentia...
Transformation of the measure of orthogonality for orthogonal polynomials, namely Freud transformati...
Several inverse spectral problems are solved by a method which is based on exact solu-tions of the s...
Several inverse spectral problems are solved by a method which is based on exact solu-tions of the s...
Several inverse spectral problems are solved by a method which is based on exact solu-tions of the s...
Discrete integrable nonlinear differential difference equations (NDDEs) have various mathematical st...
Starting from the Toda spectral problem, a new Toda lattice hierarchy of isospectral equations wi...
Starting from the Toda spectral problem, a new Toda lattice hierarchy of isospectral equations with ...
AbstractFirst, we derive a simple connection between Toda and Langmuir lattices and give a character...
AbstractWe study the motion of zeros of time dependent orthogonal polynomials. We also relate the ta...
Abstract. The asymptotic behavior of the Toda lattice, when actingon real normal matrices, is studie...
Sufficient conditions for constructing a set of solutions of the Toda lattice are analyzed. First, u...
n this work we characterize a high-order Toda lattice in terms of a family of matrix polynomials ort...
n this work we characterize a high-order Toda lattice in terms of a family of matrix polynomials ort...
The tridiagonal Toda lattice equation is a fundamental example of an explicitly solvable differentia...
The tridiagonal Toda lattice equation is a fundamental example of an explicitly solvable differentia...
Transformation of the measure of orthogonality for orthogonal polynomials, namely Freud transformati...
Several inverse spectral problems are solved by a method which is based on exact solu-tions of the s...
Several inverse spectral problems are solved by a method which is based on exact solu-tions of the s...
Several inverse spectral problems are solved by a method which is based on exact solu-tions of the s...
Discrete integrable nonlinear differential difference equations (NDDEs) have various mathematical st...
Starting from the Toda spectral problem, a new Toda lattice hierarchy of isospectral equations wi...
Starting from the Toda spectral problem, a new Toda lattice hierarchy of isospectral equations with ...
AbstractFirst, we derive a simple connection between Toda and Langmuir lattices and give a character...
AbstractWe study the motion of zeros of time dependent orthogonal polynomials. We also relate the ta...
Abstract. The asymptotic behavior of the Toda lattice, when actingon real normal matrices, is studie...