Add to ORKGWe bound the Pythagoras number of a real projective subvariety: the smallest positive integer $r$ such that every sum of squares of linear forms in its homogeneous coordinate ring is a sum of a most $r$ squares. We will describe three distinct upper bounds involving known invariants. In contrast, our lower bound depends on a new invariant called quadratic persistence. This talk is based on joint work with Greg Blekherman, Rainer Sinn, and Mauricio Velasco.Non UBCUnreviewedAuthor affiliation: Queen's UniversityFacult
International audienceLen q be a quadratic form over a field K of characteristic different from 2. T...
International audienceLen q be a quadratic form over a field K of characteristic different from 2. T...
International audienceLen q be a quadratic form over a field K of characteristic different from 2. T...
AbstractHilbert’s 17th Problem launched a number of inquiries into sum-of-squares representations of...
This paper presents lower and upper bounds on the Pythagoras number of sum of square magnitudes of c...
In this paper, we conjecture a formula for the value of the Pythagoras number for real multivariate ...
In this paper, we conjecture a formula for the value of the Pythagoras number for real multivariate ...
The Pythagoras number of a sum of squares is the shortest length among its sums of squares represent...
Abstract. Let k be a real field. We show that every non-negative homogeneous qua-dratic polynomial f...
Abstract. Let k be a real field. We show that every non-negative homogeneous qua-dratic polynomial f...
AbstractWe introduce the concept of the continuous Pythagoras number Pc(S) of a subset S of a commut...
This paper presents a lower and upper bound of the Pythagoras number of sum of square magnitudes of ...
AbstractWe prove first that, for fixed integers n, m⩾1, there is a uniform bound on the number of Pf...
We give a continuous representation of positive semidefinite (psd) n-ary quadratic forms over an ord...
International audienceLen q be a quadratic form over a field K of characteristic different from 2. T...
International audienceLen q be a quadratic form over a field K of characteristic different from 2. T...
International audienceLen q be a quadratic form over a field K of characteristic different from 2. T...
International audienceLen q be a quadratic form over a field K of characteristic different from 2. T...
AbstractHilbert’s 17th Problem launched a number of inquiries into sum-of-squares representations of...
This paper presents lower and upper bounds on the Pythagoras number of sum of square magnitudes of c...
In this paper, we conjecture a formula for the value of the Pythagoras number for real multivariate ...
In this paper, we conjecture a formula for the value of the Pythagoras number for real multivariate ...
The Pythagoras number of a sum of squares is the shortest length among its sums of squares represent...
Abstract. Let k be a real field. We show that every non-negative homogeneous qua-dratic polynomial f...
Abstract. Let k be a real field. We show that every non-negative homogeneous qua-dratic polynomial f...
AbstractWe introduce the concept of the continuous Pythagoras number Pc(S) of a subset S of a commut...
This paper presents a lower and upper bound of the Pythagoras number of sum of square magnitudes of ...
AbstractWe prove first that, for fixed integers n, m⩾1, there is a uniform bound on the number of Pf...
We give a continuous representation of positive semidefinite (psd) n-ary quadratic forms over an ord...
International audienceLen q be a quadratic form over a field K of characteristic different from 2. T...
International audienceLen q be a quadratic form over a field K of characteristic different from 2. T...
International audienceLen q be a quadratic form over a field K of characteristic different from 2. T...
International audienceLen q be a quadratic form over a field K of characteristic different from 2. T...