Add to ORKGLet A1,...,Ar be linear partial differential operators in N variables, with constant coefficients in a field K of characteristic 0. With A := (A1,...,Ar), a polynomial u is A-harmonic if Au = 0, that is, A1u = ··· = Aru = 0. Denote by mi the order of the first nonzero homogeneous part of Ai (initial part). The main result of this paper is that if r ≤ N, the dimension over K of the space of A-harmonic polynomials of degree at most d is given by an explicit formula depending only upon r, N, d, and m1,...,mr (but not K) provided that the initial parts of A1,...,Ar satisfy a simple generic condition. If r > N and A1,...,Ar are homogeneous, the existence of a generic formula is closely related to a conjecture of Fröberg on Hilbert functions. The main...
Abstract. The Gram Spectrahedron of a polynomial parametrizes its sums-of-squares rep-resentations. ...
Article on polynomial harmonic decompositions. For real polynomials in two indeterminates a classica...
Let $L$ be a free Lie algebra of finite rank over a field $K$ and let $L_{n}$ denote the degree $n$ ...
Let A1,...,Ar be linear partial differential operators in N variables, with constant coefficients in a ...
[[abstract]]Let H-l(p)(M) be the space of polynomial growth harmonic forms. We proved that the dimen...
We prove some results related to a conjecture of Hivert and Thiéry about the dimension of the space ...
AbstractThe space DHn of Sn diagonal harmonics is the collection of polynomials P(x, y) = P(x1,…,xn,...
AbstractLet R ≅ k[x1,..., xr]/(F1,..., Fn) where (F1,..., Fn) denotes the ideal of homogeneous polyn...
AbstractIn his study of papers by Osgood and Kolchin on rational approximations of algebraic functio...
27 pagesWe present a generic operator $J$ simply defined as a linear map not increasing the degree f...
AbstractSimple formulas are proved for the dimensions of vector spaces of homogeneous zero regressio...
Abstract. We extendMaxwell’s representation of harmonic polynomials to h-harmonics associated to a r...
Abstract. There is a natural conjecture that the universal bounds for the di-mension spectrum of har...
Given a Banach space E and positive integers k and l we investigate the smallest constant C that sat...
AbstractLet Q[X, Y] denote the ring of polynomials with rational coefficients in the variables X = {...
Abstract. The Gram Spectrahedron of a polynomial parametrizes its sums-of-squares rep-resentations. ...
Article on polynomial harmonic decompositions. For real polynomials in two indeterminates a classica...
Let $L$ be a free Lie algebra of finite rank over a field $K$ and let $L_{n}$ denote the degree $n$ ...
Let A1,...,Ar be linear partial differential operators in N variables, with constant coefficients in a ...
[[abstract]]Let H-l(p)(M) be the space of polynomial growth harmonic forms. We proved that the dimen...
We prove some results related to a conjecture of Hivert and Thiéry about the dimension of the space ...
AbstractThe space DHn of Sn diagonal harmonics is the collection of polynomials P(x, y) = P(x1,…,xn,...
AbstractLet R ≅ k[x1,..., xr]/(F1,..., Fn) where (F1,..., Fn) denotes the ideal of homogeneous polyn...
AbstractIn his study of papers by Osgood and Kolchin on rational approximations of algebraic functio...
27 pagesWe present a generic operator $J$ simply defined as a linear map not increasing the degree f...
AbstractSimple formulas are proved for the dimensions of vector spaces of homogeneous zero regressio...
Abstract. We extendMaxwell’s representation of harmonic polynomials to h-harmonics associated to a r...
Abstract. There is a natural conjecture that the universal bounds for the di-mension spectrum of har...
Given a Banach space E and positive integers k and l we investigate the smallest constant C that sat...
AbstractLet Q[X, Y] denote the ring of polynomials with rational coefficients in the variables X = {...
Abstract. The Gram Spectrahedron of a polynomial parametrizes its sums-of-squares rep-resentations. ...
Article on polynomial harmonic decompositions. For real polynomials in two indeterminates a classica...
Let $L$ be a free Lie algebra of finite rank over a field $K$ and let $L_{n}$ denote the degree $n$ ...