Characterizations of Bézout and Hankel-Bézout matrices

This paper deals with some ideas of Bézout and his successors Poisson, Netto and Laurent for solving polynomial systems. We treat them from the determinantal and from the Gröbner basis point of view. This results in effective algorithms for constructing the multivariate resultant. Other problems of

In this paper we show that over a commutative valuation ring V, a semiheredi-Ž . tary V-order H in a finite-dimensional simple Artinian ring is a finite intersection Ž . of Bezout maximal V-orders iff either H is Bezout or H is contained in a Bezout ´´Ž . V-order and J V is a principal ideal of V. ᮊ

The relationship between the BCzout and input-output approaches to right-coprimeness is investigated. We introduce a generalized BCzout identity and analyze its relationship to right-coprimeness. In terms of the generalized BCzout identity, a right factorization of a nonlinear plant is coprime acco

Given an absolutely irreducible horizontal hypersurface Z in a projective space over the ring of integers R of a number field, we give an explicit bound for the product of the norms of the prime ideals of R over which the fibre of Z becomes reducible. This bound is given as a function of a projectiv

The aim of this paper is to solve a division problem for the algebra of functions, which are holomorphic in a domain D ⊂ C n , n > 1, and grow near the boundary not faster than some power oflog dist(z, bD). The domain D is assumed to be smoothly bounded and convex of finite d'Angelo type.