International audienceGiven rational univariate polynomials f and g such that gcd(f, g) and f / gcd(f, g) are relatively prime, we show that g is non-negative on all the real roots of f if and only if g is a sum of squares of rational polynomials modulo f. We complete our study by exhibiting an algorithm that produces a certificate that a polynomial g is non-negative on the real roots of a non-zero polynomial f , when the above assumption is satisfied
Let q be a power of an odd prime p. For r 2 f1; 2g and p 6 = 3, we give bounds for the minimal non-n...
Abstract If a real polynomial f can be written as a sum of squares of real polynomials, then clearly...
AbstractWe present a hybrid symbolic-numeric algorithm for certifying a polynomial or rational funct...
24 pages, 2 tablesAssessing non-negativity of multivariate polynomials over the reals, through the c...
24 pages, 2 tablesAssessing non-negativity of multivariate polynomials over the reals, through the c...
24 pages, 2 tablesAssessing non-negativity of multivariate polynomials over the reals, through the c...
24 pages, 2 tablesAssessing non-negativity of multivariate polynomials over the reals, through the c...
International audienceIt is well-known that every non-negative univariate real polynomial can be wri...
International audienceIt is well-known that every non-negative univariate real polynomial can be wri...
Let X be a finite set of points in R^n. A polynomial p nonnegative on X can be written as a sum of s...
Let X be a finite set of points in R^n. A polynomial p nonnegative on X can be written as a sum of s...
AbstractWe present an algorithm to determine if a real polynomial is a sum of squares (of polynomial...
Abstract. Hilbert posed the following problem as the 17th in the list of 23 problems in his famous 1...
This paper presents an algorithm for computing a decomposition of a non- negative real polynomial as...
Abstract. Hilbert posed the following problem as the 17th in the list of 23 problems in his famous 1...
Let q be a power of an odd prime p. For r 2 f1; 2g and p 6 = 3, we give bounds for the minimal non-n...
Abstract If a real polynomial f can be written as a sum of squares of real polynomials, then clearly...
AbstractWe present a hybrid symbolic-numeric algorithm for certifying a polynomial or rational funct...
24 pages, 2 tablesAssessing non-negativity of multivariate polynomials over the reals, through the c...
24 pages, 2 tablesAssessing non-negativity of multivariate polynomials over the reals, through the c...
24 pages, 2 tablesAssessing non-negativity of multivariate polynomials over the reals, through the c...
24 pages, 2 tablesAssessing non-negativity of multivariate polynomials over the reals, through the c...
International audienceIt is well-known that every non-negative univariate real polynomial can be wri...
International audienceIt is well-known that every non-negative univariate real polynomial can be wri...
Let X be a finite set of points in R^n. A polynomial p nonnegative on X can be written as a sum of s...
Let X be a finite set of points in R^n. A polynomial p nonnegative on X can be written as a sum of s...
AbstractWe present an algorithm to determine if a real polynomial is a sum of squares (of polynomial...
Abstract. Hilbert posed the following problem as the 17th in the list of 23 problems in his famous 1...
This paper presents an algorithm for computing a decomposition of a non- negative real polynomial as...
Abstract. Hilbert posed the following problem as the 17th in the list of 23 problems in his famous 1...
Let q be a power of an odd prime p. For r 2 f1; 2g and p 6 = 3, we give bounds for the minimal non-n...
Abstract If a real polynomial f can be written as a sum of squares of real polynomials, then clearly...
AbstractWe present a hybrid symbolic-numeric algorithm for certifying a polynomial or rational funct...
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