A novel method with two variations is proposed with which the number of positive and negative zeros of a polynomial with real co-efficients and degree $n$ can be restricted with significantly better determinacy than that provided by the Descartes\u27 rule of signs and also isolate quite successfully the zeros of the polynomial. The method relies on solving equations of degree smaller than that of the given polynomial. One can determine analytically the exact number of positive and negative zeros of a polynomial of degree up to and including five and also fully isolate the zeros of the polynomial analytically and with one of the variations of the method, one can analytically approach polynomials of degree up to and including nine by solving ...
AbstractWe give new sufficient conditions for a sequence of polynomials to have only real zeros base...
AbstractWe present a complete numerical algorithm for isolating all the real zeros of a zero-dimensi...
Article dans revue scientifique avec comité de lecture. internationale.International audienceThis pa...
This is to certify that this PhD thesis is, to the best of my knowledge, entirely my own work, excep...
We propose a simple and fast implimentation to find real zeros of polynomials of integercoefiicients...
AbstractIn this paper, algorithms to enumerate and isolate complex polynomial roots are developed, a...
AbstractWe create a new resultant for determining the presence and number of reciprocal zeros in a g...
In this thesis, we put restrictions on the coefficients of polynomials and give bounds concerning th...
This paper describes a set of algorithms for isolating the real zeros of a univariate polynomial wit...
Polynomials pervade mathematics and much that is beautiful in mathematics is related to polynomials,...
AbstractWe show two simple algorithms for isolation of the real and nearly real zeros of a univariat...
AbstractWe substantially improve the known algorithms for approximating all the complex zeros of an ...
Analysing the cubic sectors of a real polynomial of degree n, a minor modification of Newton’s Rule ...
AbstractThis paper revisits an algorithm isolating the real roots of a univariate polynomial using D...
University of Minnesota Ph.D. dissertation. April 2011. Major: Mathematics. Advisor: Richard Moeckel...
AbstractWe give new sufficient conditions for a sequence of polynomials to have only real zeros base...
AbstractWe present a complete numerical algorithm for isolating all the real zeros of a zero-dimensi...
Article dans revue scientifique avec comité de lecture. internationale.International audienceThis pa...
This is to certify that this PhD thesis is, to the best of my knowledge, entirely my own work, excep...
We propose a simple and fast implimentation to find real zeros of polynomials of integercoefiicients...
AbstractIn this paper, algorithms to enumerate and isolate complex polynomial roots are developed, a...
AbstractWe create a new resultant for determining the presence and number of reciprocal zeros in a g...
In this thesis, we put restrictions on the coefficients of polynomials and give bounds concerning th...
This paper describes a set of algorithms for isolating the real zeros of a univariate polynomial wit...
Polynomials pervade mathematics and much that is beautiful in mathematics is related to polynomials,...
AbstractWe show two simple algorithms for isolation of the real and nearly real zeros of a univariat...
AbstractWe substantially improve the known algorithms for approximating all the complex zeros of an ...
Analysing the cubic sectors of a real polynomial of degree n, a minor modification of Newton’s Rule ...
AbstractThis paper revisits an algorithm isolating the real roots of a univariate polynomial using D...
University of Minnesota Ph.D. dissertation. April 2011. Major: Mathematics. Advisor: Richard Moeckel...
AbstractWe give new sufficient conditions for a sequence of polynomials to have only real zeros base...
AbstractWe present a complete numerical algorithm for isolating all the real zeros of a zero-dimensi...
Article dans revue scientifique avec comité de lecture. internationale.International audienceThis pa...