Add to ORKGWe study the spaces of polynomials stratified into the sets of polynomial with fixed number of roots inside certain semialgebraic region Ω, on its border, and at the complement to its closure. Presented approach is a generalisation, unification and development of several classical approaches to stability problems in control theory: root clustering (D-stability) developed by R.E. Kalman, B.R. Barmish, S. Gutman et al., D-decomposition(Yu.I. Neimark, B.T. Polyak, E.N. Gryazina) and universal parameter space method(A. Fam, J. Meditch, J.Ackermann). Our approach is based on the interpretation of correspondence between roots and coefficients of a polynomial as a symmetric product morphism. We describe the topology of strata up to homotopy equiva...
In the paper we construct some stratifications of the space of monic polynomials in real and complex...
AbstractThe KP hierarchy is a completely integrable system of quadratic, partial differential equati...
We present an algorithm for isolating the roots of an arbitrary complex polynomial $p$ that also wor...
Root clustering problems of matrices are considered. Here the conditions are given for eigenvalues o...
International audienceThis paper considers robust stability analysis for a matrix affected by unstru...
The stability robustness of both continuous and discrete-time dynamical systems is tantamount to the...
We investigate two main overarching topics in the theory of stable polynomials.1. Differential and D...
This paper treats the problem of root distribution invariance of polynomial families. We first estab...
summary:The article is a survey on problem of the theorem of Hurwitz. The starting point of explanat...
The polynomial cluster value problem replaces the role of the continuous linear functionals in the o...
© 2014 Dr. TriThang TranThis thesis has two purposes. The first is to serve as an introductory surve...
AbstractWe provide a unified, elementary, topological approach to the classical results stating the ...
Let F(z) be an arbitrary complex polynomial. We introduce the local root clustering problem, to comp...
For the last thirty years the EHP sequence has been a major conceptual tool in the attempt to unders...
We present an algorithm for isolating all roots of an arbitrary complex polynomial p that also works...
In the paper we construct some stratifications of the space of monic polynomials in real and complex...
AbstractThe KP hierarchy is a completely integrable system of quadratic, partial differential equati...
We present an algorithm for isolating the roots of an arbitrary complex polynomial $p$ that also wor...
Root clustering problems of matrices are considered. Here the conditions are given for eigenvalues o...
International audienceThis paper considers robust stability analysis for a matrix affected by unstru...
The stability robustness of both continuous and discrete-time dynamical systems is tantamount to the...
We investigate two main overarching topics in the theory of stable polynomials.1. Differential and D...
This paper treats the problem of root distribution invariance of polynomial families. We first estab...
summary:The article is a survey on problem of the theorem of Hurwitz. The starting point of explanat...
The polynomial cluster value problem replaces the role of the continuous linear functionals in the o...
© 2014 Dr. TriThang TranThis thesis has two purposes. The first is to serve as an introductory surve...
AbstractWe provide a unified, elementary, topological approach to the classical results stating the ...
Let F(z) be an arbitrary complex polynomial. We introduce the local root clustering problem, to comp...
For the last thirty years the EHP sequence has been a major conceptual tool in the attempt to unders...
We present an algorithm for isolating all roots of an arbitrary complex polynomial p that also works...
In the paper we construct some stratifications of the space of monic polynomials in real and complex...
AbstractThe KP hierarchy is a completely integrable system of quadratic, partial differential equati...
We present an algorithm for isolating the roots of an arbitrary complex polynomial $p$ that also wor...