Generalized Factorization for Daniele-Khrapkov Matrix Functions - Explicit Formulas

## Abstract A generalization to __N__×__N__ of the 2×2 Daniele–Khrapkov class of matrix‐valued functions is proposed. This class retains some of the features of the 2×2 Daniele–Khrapkov class, in particular, the presence of certain square‐root functions in its definition. Functions of this class ap

## Communicated by E. Meister The Wiener-Hopf factorization of a class of 2;2 symbols including matrices of Daniele-Khrapkov type is studied. The partial indices and the factors are determined, both in the canonical and non-canonical cases. A non-linear method is used which reduces the solution of

In this paper, we present certain general formulae for the stability function of explicit advanced step-point (EAS) methods [1,2]. The stability function of EAS methods is quite complicated and appropriate general formulae will facilitate stability analysis and further computational manipulation of

Let K be a quadratic imaginary number field, f ∈ N and let O f be the order of conductor f in K. We consider the singular values of the Kleinian normalization ϕ of the Weierstrass σ -function belonging to an arbitrary proper ideal of O f . The factorization of these singular values goes back to K. R