Add to ORKGWe inductively construct an explicit (common) orthogonal eigenbasis for the elements of the Bose-Mesner algebra of the Grassmann scheme. The key step is a constructive, linear algebraic interpretation of the Goldman-Rota recurrence for the number of subspaces of a finite vector space. This inter-pretation shows that the up operator on subspaces has an explicitly given recursive structure. Using the interpretation above we inductively construct an explicit orthogonal symmetric Jordan basis with respect to the up operator and write down the singular values, i.e., the ratio of the lengths of the successive vectors in the Jordan chains. The collection of all vectors in this basis of a fixed rank m forms a (common) orthogonal eigenbasis for the ...
Given a point on a Schubert variety in an orthogonal Grassmannian, we compute the multiplicity, more...
Every Grassmannian, in its Pl\ ucker embedding, is defined by quadratic polynomials. We prove a vast...
We consider a set of measures on the real line and the corresponding system of multiple orthogonal p...
This book provides a comprehensive advanced multi-linear algebra course based on the concept of Hass...
Let π be a projective unitary representation of a countable group G on a separable Hilbert space H. ...
The affine Grassmannian of SLₙ admits an embedding into the Sato Grassmannian, which further admits ...
This book provides a comprehensive advanced multi-linear algebra course based on the concept of Hass...
We show that an orthogonal basis for a finite-dimensional Hilbert space can be equivalently characte...
Lie algebra generated by m p-dimensional Grassmannian Dirac operators and m p-dimensional vector var...
We present a simple, explicit orthogonal basis of eigenvectors for the Johnson and Kneser graphs, ba...
Let pi be a projective unitary representation of a countable group G on a separable Hilbert space H....
In this contribution, we present some formalizations based on the HOL-Multivariate-Analysis session ...
AbstractA class of identities in the Grassmann–Cayley algebra which yields a large number of geometr...
In this paperwe revisit the problem of finding an orthogonal similarity transformation that puts an n...
We study the differentiable structure and the homotopy type of some spaces related to the Grassmanni...
Given a point on a Schubert variety in an orthogonal Grassmannian, we compute the multiplicity, more...
Every Grassmannian, in its Pl\ ucker embedding, is defined by quadratic polynomials. We prove a vast...
We consider a set of measures on the real line and the corresponding system of multiple orthogonal p...
This book provides a comprehensive advanced multi-linear algebra course based on the concept of Hass...
Let π be a projective unitary representation of a countable group G on a separable Hilbert space H. ...
The affine Grassmannian of SLₙ admits an embedding into the Sato Grassmannian, which further admits ...
This book provides a comprehensive advanced multi-linear algebra course based on the concept of Hass...
We show that an orthogonal basis for a finite-dimensional Hilbert space can be equivalently characte...
Lie algebra generated by m p-dimensional Grassmannian Dirac operators and m p-dimensional vector var...
We present a simple, explicit orthogonal basis of eigenvectors for the Johnson and Kneser graphs, ba...
Let pi be a projective unitary representation of a countable group G on a separable Hilbert space H....
In this contribution, we present some formalizations based on the HOL-Multivariate-Analysis session ...
AbstractA class of identities in the Grassmann–Cayley algebra which yields a large number of geometr...
In this paperwe revisit the problem of finding an orthogonal similarity transformation that puts an n...
We study the differentiable structure and the homotopy type of some spaces related to the Grassmanni...
Given a point on a Schubert variety in an orthogonal Grassmannian, we compute the multiplicity, more...
Every Grassmannian, in its Pl\ ucker embedding, is defined by quadratic polynomials. We prove a vast...
We consider a set of measures on the real line and the corresponding system of multiple orthogonal p...