In our previous paper we have elaborated a certain signed count of real lines on real projective n-dimensional hypersurfaces of degree 2n-1. Contrary to the honest "cardinal" count, it is independent of the choice of a hypersurface, and by this reason provides a strong lower bound on the honest count. In this count the contribution of a line is its local input to the Euler number of a certain auxiliary vector bundle. The aim of this paper is to present other, in a sense more geometric, interpretations of this local input. One of them results from a generalization of Segre species of real lines on cubic surfaces and another from a generalization of Welschinger weights of real lines on quintic threefolds
We enrich the classical count that there are two complex lines meeting four lines in space to an equ...
In this thesis we discuss the enumerative geometry problem of counting lines on projective hypersurf...
International audienceWe establish the enumerativity of (original and modified) Welschinger invarian...
In our previous paper [5] we have elaborated a certain signed count of real lines on real hypersurfa...
A classical result due to Segre states that on a real cubic surface in ℙ ℝ 3 $\mathbb {P}^3_\mathbb ...
International audienceWe show that a generic real projective n-dimensional hypersurface of degree 2n...
We provide a geometric interpretation of the local contribution of a line to the count of lines on a...
We first recall Solomon's relations for Welschinger's invariants counting real curves in real symple...
International audienceWe compute the purely real Welschinger invariants, both original and modified,...
Moduli spaces of stable sheaves on smooth projective surfaces are in general singular. Nonetheless, ...
© 2015, Institute for Mathematical Sciences (IMS), Stony Brook University, NY.We show that a generic...
We propose two systems of "intrinsic" signs for counting such curves. In both cases the result acqui...
We show that a generic real projective n-dimensional hypersurface of odd degree d , such that 4(n - ...
Recently, Marian-Oprea-Pandharipande established (a generalization of) Lehn's conjecture for Segre n...
International audienceWe give a recursive formula for purely real Welschinger invariants of the foll...
We enrich the classical count that there are two complex lines meeting four lines in space to an equ...
In this thesis we discuss the enumerative geometry problem of counting lines on projective hypersurf...
International audienceWe establish the enumerativity of (original and modified) Welschinger invarian...
In our previous paper [5] we have elaborated a certain signed count of real lines on real hypersurfa...
A classical result due to Segre states that on a real cubic surface in ℙ ℝ 3 $\mathbb {P}^3_\mathbb ...
International audienceWe show that a generic real projective n-dimensional hypersurface of degree 2n...
We provide a geometric interpretation of the local contribution of a line to the count of lines on a...
We first recall Solomon's relations for Welschinger's invariants counting real curves in real symple...
International audienceWe compute the purely real Welschinger invariants, both original and modified,...
Moduli spaces of stable sheaves on smooth projective surfaces are in general singular. Nonetheless, ...
© 2015, Institute for Mathematical Sciences (IMS), Stony Brook University, NY.We show that a generic...
We propose two systems of "intrinsic" signs for counting such curves. In both cases the result acqui...
We show that a generic real projective n-dimensional hypersurface of odd degree d , such that 4(n - ...
Recently, Marian-Oprea-Pandharipande established (a generalization of) Lehn's conjecture for Segre n...
International audienceWe give a recursive formula for purely real Welschinger invariants of the foll...
We enrich the classical count that there are two complex lines meeting four lines in space to an equ...
In this thesis we discuss the enumerative geometry problem of counting lines on projective hypersurf...
International audienceWe establish the enumerativity of (original and modified) Welschinger invarian...