Add to ORKGLet $F$ be an infinite division ring, $V$ be a left $F$-vector space, $r>0$ be an integer. We study the structure of the representation of the linear group $\mathrm{GL}_F(V)$ in the vector space of formal finite linear combinations of $r$-dimensional vector subspaces of $V$ with coefficients in a field $K$. This gives a series of natural examples of irreducible infinite-dimensional representations of projective groups. These representations are non-smooth if $F$ is locally compact and non-discrete.Comment: v2: the results are generalized to the case of Grassmannian of infinite-dimensional subspaces; v3: Assumptions on the coefficient field are remove
Introduction\ud \ud In the representation theory of real reductive Lie groups, there are two fundame...
AbstractLet V be a 2n-dimensional vector space (n⩾1) over a field K equipped with a nondegenerate al...
AbstractWe study the irreducible complex representations of general linear groups over principal ide...
Abstract Let F be an infinite division ring, V be a left F-vector space, $$r\ge 1$$r≥...
Let be a Desarguesian (t−1)--spread of PG(rt−1,q), Π a m-dimensional subspace of PG(rt−1,q) and Λ ...
Let S be a Desarguesian (t-1)-spread of PG(rt-1,q), $\Pi$. It is known that the Plucker embedding of...
Let F(r, d) denote the moduli space of algebraic foliations of codimension one and degree d in compl...
AbstractIfFqis the finite field of characteristicpand orderq=ps, let F(q) be the category whose obje...
Notes from a series of lectures given in the Representation Theory Seminar during Fall 2010
Let G^v be a complex simple algebraic group. We describe certain morphisms of G^v (O)-equivariant c...
Let G^v be a complex simple algebraic group. We describe certain morphisms of G^v (O)-equivariant c...
Notes from a series of lectures given in the Representation Theory Seminar during Fall 2010
AbstractThe action of a connected reductive algebraic group G on G/P−, where P− is a parabolic subgr...
AbstractLet V be an infinite-dimensional vector space. We define Grassmannians of V as orbits of the...
AbstractWe consider subspace representations of stars over an algebraically closed field K. A dimens...
Introduction\ud \ud In the representation theory of real reductive Lie groups, there are two fundame...
AbstractLet V be a 2n-dimensional vector space (n⩾1) over a field K equipped with a nondegenerate al...
AbstractWe study the irreducible complex representations of general linear groups over principal ide...
Abstract Let F be an infinite division ring, V be a left F-vector space, $$r\ge 1$$r≥...
Let be a Desarguesian (t−1)--spread of PG(rt−1,q), Π a m-dimensional subspace of PG(rt−1,q) and Λ ...
Let S be a Desarguesian (t-1)-spread of PG(rt-1,q), $\Pi$. It is known that the Plucker embedding of...
Let F(r, d) denote the moduli space of algebraic foliations of codimension one and degree d in compl...
AbstractIfFqis the finite field of characteristicpand orderq=ps, let F(q) be the category whose obje...
Notes from a series of lectures given in the Representation Theory Seminar during Fall 2010
Let G^v be a complex simple algebraic group. We describe certain morphisms of G^v (O)-equivariant c...
Let G^v be a complex simple algebraic group. We describe certain morphisms of G^v (O)-equivariant c...
Notes from a series of lectures given in the Representation Theory Seminar during Fall 2010
AbstractThe action of a connected reductive algebraic group G on G/P−, where P− is a parabolic subgr...
AbstractLet V be an infinite-dimensional vector space. We define Grassmannians of V as orbits of the...
AbstractWe consider subspace representations of stars over an algebraically closed field K. A dimens...
Introduction\ud \ud In the representation theory of real reductive Lie groups, there are two fundame...
AbstractLet V be a 2n-dimensional vector space (n⩾1) over a field K equipped with a nondegenerate al...
AbstractWe study the irreducible complex representations of general linear groups over principal ide...