Add to ORKGA solution for Smale's 17th problem, for the case of systems with bounded degree was recently given. This solution, an algorithm computing approximate zeros of complex polynomial systems in average polynomial time, assumed infinite precision. In this paper we describe a finite-precision version of this algorithm. Our main result shows that this version works within the same time bounds and requires a precision which, on the average, amounts to a polynomial amount of bits in the mantissa of the intervening floating-point numbers
We propose a simple and fast implimentation to find real zeros of polynomials of integercoefiicients...
We propose a simple and fast implimentation to find real zeros of polynomials of integercoefiicients...
A new fast algorithm for computing the zeros of a polynomial in $O(n^{2})$ time using $O(n)$ memory ...
A solution for Smale's 17th problem, for the case of systems with bounded degree was recently given....
AbstractWe substantially improve the known algorithms for approximating all the complex zeros of an ...
We propose a new algorithm for the classical and still practically important problem of approximatin...
AbstractWe describe an algorithm to count the number of distinct real zeros of a polynomial (square)...
International audienceSeveral different techniques and softwares intend to improve the accuracy of r...
Several different techniques and softwares intend to improve the accuracy of results computed in a f...
AbstractWe propose a new algorithm for the classical and still practically important problem of appr...
AbstractWe substantially improve the known algorithms for approximating all the complex zeros of an ...
AbstractThe problem of the evaluation in floating-point arithmetic of a polynomial with floating-poi...
This paper describes a set of algorithms for isolating the real zeros of a univariate polynomial wit...
We propose a simple and fast implimentation to find real zeros of polynomials of integercoefiicients...
We propose a simple and fast implimentation to find real zeros of polynomials of integercoefiicients...
We propose a simple and fast implimentation to find real zeros of polynomials of integercoefiicients...
We propose a simple and fast implimentation to find real zeros of polynomials of integercoefiicients...
A new fast algorithm for computing the zeros of a polynomial in $O(n^{2})$ time using $O(n)$ memory ...
A solution for Smale's 17th problem, for the case of systems with bounded degree was recently given....
AbstractWe substantially improve the known algorithms for approximating all the complex zeros of an ...
We propose a new algorithm for the classical and still practically important problem of approximatin...
AbstractWe describe an algorithm to count the number of distinct real zeros of a polynomial (square)...
International audienceSeveral different techniques and softwares intend to improve the accuracy of r...
Several different techniques and softwares intend to improve the accuracy of results computed in a f...
AbstractWe propose a new algorithm for the classical and still practically important problem of appr...
AbstractWe substantially improve the known algorithms for approximating all the complex zeros of an ...
AbstractThe problem of the evaluation in floating-point arithmetic of a polynomial with floating-poi...
This paper describes a set of algorithms for isolating the real zeros of a univariate polynomial wit...
We propose a simple and fast implimentation to find real zeros of polynomials of integercoefiicients...
We propose a simple and fast implimentation to find real zeros of polynomials of integercoefiicients...
We propose a simple and fast implimentation to find real zeros of polynomials of integercoefiicients...
We propose a simple and fast implimentation to find real zeros of polynomials of integercoefiicients...
A new fast algorithm for computing the zeros of a polynomial in $O(n^{2})$ time using $O(n)$ memory ...