Isospectral Flows Related to Frobenius–Stickelberger–Thiele Polynomials

Abstract: The isospectral deformations of the Frobenius-Stickelberger-Thiele (FST) polynomials introduced in [32] (Spiridonov et al. Commun. Math. Phys. 272:139-165, 2007 ) are studied. For a specific choice of the deformation of the spectral measure, one is led to an integrable lattice (FST lattice), which is indeed an isospectral flow connected with a generalized eigenvalue problem. In the second part of the paper the spectral problem used previously in the study of the modified Camassa-Holm (mCH) peakon lattice is … Show more

“…(1) M (z) with arbitrary λ M is connected to the FST polynomials [14,15]. If λ M = 1, the polynomial P The quasi-particles energies {ε i } and the roots are re-…”

Powerful method to evaluate the mass gaps of free-particle quantum critical systems

“…(1) M (z) with arbitrary λ M is connected to the FST polynomials [14,15]. If λ M = 1, the polynomial P The quasi-particles energies {ε i } and the roots are re-…”

Powerful method to evaluate the mass gaps of free-particle quantum critical systems

On the peakon dynamical system of the second flow in the Camassa–Holm hierarchy

A view of the peakon world through the lens of approximation theory