Add to ORKGWe study families of linear spaces in projective space whose union is a proper subvariety X of the expected dimension. We establish relations between configurations of focal points and the existence or non- existence of a fixed tangent space to X along a general element of the family. We apply our results to the classification of ruled 3-dimensional varieties
Summary. In the classes of projective spaces, defined in terms of collinearity, introduced in the ar...
SummaryIn this paper, mP will denote a projective space of dimension m, and (m,n)P will denote a dou...
According to the classification resulting from the successive contributions by Bertini, Del Pezzo a...
We define some linear spaces on the set of all proper subspaces of a triple system S(γ2,3,v). The co...
Providing an introduction to both classical and modern techniques in projective algebraic geometry, ...
We assume that there is given a finite family of protective subspaces in certain projective space. O...
We prove a conjecture stated by Catalisano, Geramita, and Gimigliano in 2002, which claims that the ...
We consider the variety F of /:-dimensional linear projective sub-spaces lying on a generic projecti...
These notes summarize part of my research work as a SAGA postdoctoral fellow. We study a class of po...
Summary. In the class of all collinearity structures a subclass of (dimension free) projective space...
We assume that there is given a finite family of protective subspaces in certain projective space. O...
We define the splash of a subgeometry on a projective line, extending the definition of [1] to gener...
We study smooth projective varieties X ⊆ PN of dimension n ≥ 3, such that for some linear (N-n+1)-di...
Given a variety X embedded in a projective space PV , the (k - 1)-st secant variety of X, denoted kX...
After presenting the main notions and results about congruences of k-planes, we dwell upon congruenc...
Summary. In the classes of projective spaces, defined in terms of collinearity, introduced in the ar...
SummaryIn this paper, mP will denote a projective space of dimension m, and (m,n)P will denote a dou...
According to the classification resulting from the successive contributions by Bertini, Del Pezzo a...
We define some linear spaces on the set of all proper subspaces of a triple system S(γ2,3,v). The co...
Providing an introduction to both classical and modern techniques in projective algebraic geometry, ...
We assume that there is given a finite family of protective subspaces in certain projective space. O...
We prove a conjecture stated by Catalisano, Geramita, and Gimigliano in 2002, which claims that the ...
We consider the variety F of /:-dimensional linear projective sub-spaces lying on a generic projecti...
These notes summarize part of my research work as a SAGA postdoctoral fellow. We study a class of po...
Summary. In the class of all collinearity structures a subclass of (dimension free) projective space...
We assume that there is given a finite family of protective subspaces in certain projective space. O...
We define the splash of a subgeometry on a projective line, extending the definition of [1] to gener...
We study smooth projective varieties X ⊆ PN of dimension n ≥ 3, such that for some linear (N-n+1)-di...
Given a variety X embedded in a projective space PV , the (k - 1)-st secant variety of X, denoted kX...
After presenting the main notions and results about congruences of k-planes, we dwell upon congruenc...
Summary. In the classes of projective spaces, defined in terms of collinearity, introduced in the ar...
SummaryIn this paper, mP will denote a projective space of dimension m, and (m,n)P will denote a dou...
According to the classification resulting from the successive contributions by Bertini, Del Pezzo a...