Asymptotic analysis of Toda lattice on diagonalizable matrices

In this paper we study the solutions of the equation det(\*&L) =0, where L is the Lax operator of the quantum Toda lattice. The solutions of the equation are determined by the eigenvectors of L, L9 9 =\*9 9 . In the classical case, there exists the canonical embedding of n-dimensional Toda lattice /

WC consider ;I one-parameter l'amily of two-dcgrccs-of-freedom gcneralizcd TO&I Hamiltonians. Using Ziglin'\ thcorcm with wmc c'xtencion\. WC prove the non-existence ot an additional single-\ alucd anal) tic intcgrnl except for special values of the prrametc~.

Let N = N (q) be the number of nonzero digits in the binary expansion of the odd integer q. A construction method is presented which produces, among other results, a block circulant complex Hadamard matrix of order 2 α q, where α ≥ 2N -1. This improves a recent result of Craigen regarding the asympt

Let (L, , ∨, ∧) be a complete and completely distributive lattice. A vector ξ is said to be an eigenvector of a square matrix A over the lattice L if Aξ = λξ for some λ in L. The elements λ are called the associated eigenvalues. In this paper, we obtain the maximum eigenvector of A for a given eigen