Generalized Factorization for Daniele-Khrapkov Matrix Functions - Partial Indexes

## 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

## Abstract We prove asymptotic formulas for block Toeplitz matrices with symbols admitting right and left Wiener–Hopf factorizations such that all partial indices are equal to some integer number. We consider symbols and Wiener–Hopf factorizations in Wiener algebras with weights satisfying natural

Recently we have presented a matrix algebraic factorization scheme for multiplicative representations of generalized hypergeometric functions of type p+1Fp . The Method uses exponential functions with matrix arguments. We have shown that factorization is possible around any kind of point, regular or