This note reports on some joint work with I. Scherbak, aiming to overview a connection between generalized wronskians (of fundamental systems of solutions of linear ordinary differential equations with constant coefficients) and the intersection theory of complex Grassmann varieties. Detailed computations are performed in the easiest case of the intersection theory of the grassmannian of lines in projective spaces
Hilbert's 15th problem called for a rigorous foundation of Schubert's calculus, in which a long stan...
In this paper we determine all Fano varieties which are complete intersections of hypersurfaces in a...
Abstract. This excerpt is a section from an article in progress. This section proves that for the Gr...
Articolo testo di una conferenza tenuta presso l'Accademia Peloritana dei Pericolanti (Messina
A K-theoretic Pieri formula provides a convenient way to calculate the product of arbitrary Schubert...
For a linear ODE with indeterminate coefficients,we explicitly exhibit a fundamental system of solut...
Given a $d$-dimensional vector space $V \subset \mathbb{C}[u]$ of polynomials, its Wronskian is the ...
AbstractThe Wronskian associates to d linearly independent polynomials of degree at most n, a non-ze...
AbstractGiven a sequence A=(A1,…,Ar) of binary d-ics, we construct a set of combinants C={Cq:0≤q≤r,q...
A K-theoretic Pieri formula provides a convenient way to calculate the product of arbitrary Schuber...
In this thesis, we studied flag varieties, the Grassmann variety G(d; n) and their behavior under th...
Given a complex vector space V, consider the quotient map of the image of the Plucker embedding of t...
The Wroński determinant (Wrońskian), usually introduced in standard courses in Ordinary Differential...
In this paper, we introduce a sub-family of the usual generalized Wronskians, that we call geometric...
Linear Ordinary Differential Equations (ODEs) with constant coefficients are studied by looking in g...
Hilbert's 15th problem called for a rigorous foundation of Schubert's calculus, in which a long stan...
In this paper we determine all Fano varieties which are complete intersections of hypersurfaces in a...
Abstract. This excerpt is a section from an article in progress. This section proves that for the Gr...
Articolo testo di una conferenza tenuta presso l'Accademia Peloritana dei Pericolanti (Messina
A K-theoretic Pieri formula provides a convenient way to calculate the product of arbitrary Schubert...
For a linear ODE with indeterminate coefficients,we explicitly exhibit a fundamental system of solut...
Given a $d$-dimensional vector space $V \subset \mathbb{C}[u]$ of polynomials, its Wronskian is the ...
AbstractThe Wronskian associates to d linearly independent polynomials of degree at most n, a non-ze...
AbstractGiven a sequence A=(A1,…,Ar) of binary d-ics, we construct a set of combinants C={Cq:0≤q≤r,q...
A K-theoretic Pieri formula provides a convenient way to calculate the product of arbitrary Schuber...
In this thesis, we studied flag varieties, the Grassmann variety G(d; n) and their behavior under th...
Given a complex vector space V, consider the quotient map of the image of the Plucker embedding of t...
The Wroński determinant (Wrońskian), usually introduced in standard courses in Ordinary Differential...
In this paper, we introduce a sub-family of the usual generalized Wronskians, that we call geometric...
Linear Ordinary Differential Equations (ODEs) with constant coefficients are studied by looking in g...
Hilbert's 15th problem called for a rigorous foundation of Schubert's calculus, in which a long stan...
In this paper we determine all Fano varieties which are complete intersections of hypersurfaces in a...
Abstract. This excerpt is a section from an article in progress. This section proves that for the Gr...