Add to ORKGIn Part I of this paper ([14]), we have formulated the infinitesimal mixed Torelli problem for an algebraic surface with ordinary singularities S. In this Part II, we formulate the cohomological infinitesimal mixed Torelli problem for such S, which enable us to deal with the problem more easily. We give some cohomological sufficient conditions under which the infinitesimal mixed Torelli problem is affirmatively solved. We also give some examples
In recent papers we proved a special case of a variant of Pink's Conjecture for a variety inside a s...
This thesis is dedicated to the article of Beauville (Le nombre minimum de fibres singulières d’une ...
We prove that the first order deformations of two smooth projective K3 surfaces are derived equivale...
In Part I of this paper ([14]), we have formulated the infinitesimal mixed Torelli problem for an al...
In this paper, we formulate the infinitesimal mixed Torelli problem for an algebraic surface S with ...
According to P. Griffiths, an important problem in higher-dimensional geometry is to find classes of...
We solve the infinitesimal Torelli problem for 3-dimensional quasi-smooth ℚ-Fano hypersurfaces with ...
In this thesis we prove the infinitesimal Torelli theorem for certain classes of irregular varietie...
In this note I want to show how a careful analysis of Reider's beautiful constructions in [R] l...
This article is a report of the present situation of the Torelli type problem for surfaces of genera...
Let X be a complex projective manifold. One can associate to X its cohomological data (for instance,...
We generalize the classical approach of describing the infinitesimal Torelli map in terms of multipl...
In this book, Riemann surfaces of infinite genus are constructed geometrically by pasting together p...
peer reviewedLet X be a smooth Fano variety and Ku(X) its Kuznetsov component. A Torelli theorem for...
In recent papers we proved a special case of a variant of Pink's Conjecture for a variety inside a s...
In recent papers we proved a special case of a variant of Pink's Conjecture for a variety inside a s...
This thesis is dedicated to the article of Beauville (Le nombre minimum de fibres singulières d’une ...
We prove that the first order deformations of two smooth projective K3 surfaces are derived equivale...
In Part I of this paper ([14]), we have formulated the infinitesimal mixed Torelli problem for an al...
In this paper, we formulate the infinitesimal mixed Torelli problem for an algebraic surface S with ...
According to P. Griffiths, an important problem in higher-dimensional geometry is to find classes of...
We solve the infinitesimal Torelli problem for 3-dimensional quasi-smooth ℚ-Fano hypersurfaces with ...
In this thesis we prove the infinitesimal Torelli theorem for certain classes of irregular varietie...
In this note I want to show how a careful analysis of Reider's beautiful constructions in [R] l...
This article is a report of the present situation of the Torelli type problem for surfaces of genera...
Let X be a complex projective manifold. One can associate to X its cohomological data (for instance,...
We generalize the classical approach of describing the infinitesimal Torelli map in terms of multipl...
In this book, Riemann surfaces of infinite genus are constructed geometrically by pasting together p...
peer reviewedLet X be a smooth Fano variety and Ku(X) its Kuznetsov component. A Torelli theorem for...
In recent papers we proved a special case of a variant of Pink's Conjecture for a variety inside a s...
In recent papers we proved a special case of a variant of Pink's Conjecture for a variety inside a s...
This thesis is dedicated to the article of Beauville (Le nombre minimum de fibres singulières d’une ...
We prove that the first order deformations of two smooth projective K3 surfaces are derived equivale...