Algorithms are developed that adopt a novel implicit representation for multivariate polynomials and rational functions with rational coefficients, that of black boxes for their evaluation. We show that within this representation the polynomial greatest common divisor and factorization problems, as well as the problem of extracting the numerator and denominator of a rational function, can all be solved in random polynomial-time. Since we can convert black boxes efficiently to sparse format, problems with sparse solutions, e.g., sparse polynomial factorization and sparse multivariate rational function interpolation, are also in random polynomial time. Moreover, the black box representation is one of the most space efficient implicit represen...
In this paper, we consider the problem of interpolating univariate polynomials over a field of chara...
Polynomials may be represented sparsely in an effort to conserve memory usage and provide a succinct...
AbstractTo reconstruct a black box multivariate sparse polynomial from its floating point evaluation...
Algorithms are developed that adopt a novel implicit representation for multivariate polynomials and...
AbstractWe consider the problem of sparse interpolation of an approximate multivariate black-box pol...
AbstractConsider the black box interpolation of a τ-sparse, n-variate rational function f, where τ i...
We consider the problem of sparse interpolation of a multivariate black-box polynomial in floating-p...
We consider the problem of sparse interpolation of an approximate multivariate black-box polynomial ...
The black box algorithm for separating the numerator from the denominator of a multivariate rational...
We consider the problem of sparse interpolation of an approximate multivariate black-box polynomial ...
The problem of interpolating a sparse polynomial has always been one of the central objects of resea...
. F Algorithms on multivariate polynomials represented by straight-line programs are developed irst ...
An algorithm is developed for the factorization of a multivariate polynomial represented by a straig...
We construct a hitting set generator for sparse multivariate polynomials over the reals. The seed le...
AbstractGiven a black box which will produce the value of a k-sparse multivariate polynomial for any...
In this paper, we consider the problem of interpolating univariate polynomials over a field of chara...
Polynomials may be represented sparsely in an effort to conserve memory usage and provide a succinct...
AbstractTo reconstruct a black box multivariate sparse polynomial from its floating point evaluation...
Algorithms are developed that adopt a novel implicit representation for multivariate polynomials and...
AbstractWe consider the problem of sparse interpolation of an approximate multivariate black-box pol...
AbstractConsider the black box interpolation of a τ-sparse, n-variate rational function f, where τ i...
We consider the problem of sparse interpolation of a multivariate black-box polynomial in floating-p...
We consider the problem of sparse interpolation of an approximate multivariate black-box polynomial ...
The black box algorithm for separating the numerator from the denominator of a multivariate rational...
We consider the problem of sparse interpolation of an approximate multivariate black-box polynomial ...
The problem of interpolating a sparse polynomial has always been one of the central objects of resea...
. F Algorithms on multivariate polynomials represented by straight-line programs are developed irst ...
An algorithm is developed for the factorization of a multivariate polynomial represented by a straig...
We construct a hitting set generator for sparse multivariate polynomials over the reals. The seed le...
AbstractGiven a black box which will produce the value of a k-sparse multivariate polynomial for any...
In this paper, we consider the problem of interpolating univariate polynomials over a field of chara...
Polynomials may be represented sparsely in an effort to conserve memory usage and provide a succinct...
AbstractTo reconstruct a black box multivariate sparse polynomial from its floating point evaluation...