Add to ORKGThe Donagi-Markman cubic is the differential of the period map for algebraic completely integrable systems. Here we prove a formula for the cubic in the case of Hitchin’s system for arbitrary semisimple g. This was originally stated (without proof) by Pantev for sln
AbstractIntegrability and linearizability of polynomial differential systems are studied. The comput...
Let $K$ be a number field or the function field of a curve over an algebraically closed field of cha...
AbstractThis paper is concerned with the monotonicity of the period function for families of quadrat...
The Donagi-Markman cubic is the differential of the period map for algebraic completely integrable s...
Donagi and Markman (1993) have shown that the infinitesimal period map for an algebraic completely i...
Donagi and Markman (1993) have shown that the infinitesimal period map for an algebraic completely i...
Hep-th--95-10143Consiglio Nazionale delle Ricerche (CNR). Biblioteca Centrale / CNR - Consiglio Nazi...
There are several approaches to studying moduli spaces; the most well-known in algebraic geometry is...
AbstractWe study the number of periodic points in symbolic dynamical systems; we prove the following...
We give sufficient conditions in terms of the Melnikov functions in order that an analytic or a poly...
The secant variety of the Veronese surface is a singular cubic fourfold. The degeneration of Hodge s...
In this article we study the period map for a family of K3 surfaces which is given by the anticanon-...
There are several approaches to studying moduli spaces; the most well-known in algebraic geometry is...
In this paper, we study the period mappings for the families of K3 surfaces derived from the three-d...
In an earlier paper (Adv. Appl. Math. 29 (2002), 137{151) on the determinants of certain period matr...
AbstractIntegrability and linearizability of polynomial differential systems are studied. The comput...
Let $K$ be a number field or the function field of a curve over an algebraically closed field of cha...
AbstractThis paper is concerned with the monotonicity of the period function for families of quadrat...
The Donagi-Markman cubic is the differential of the period map for algebraic completely integrable s...
Donagi and Markman (1993) have shown that the infinitesimal period map for an algebraic completely i...
Donagi and Markman (1993) have shown that the infinitesimal period map for an algebraic completely i...
Hep-th--95-10143Consiglio Nazionale delle Ricerche (CNR). Biblioteca Centrale / CNR - Consiglio Nazi...
There are several approaches to studying moduli spaces; the most well-known in algebraic geometry is...
AbstractWe study the number of periodic points in symbolic dynamical systems; we prove the following...
We give sufficient conditions in terms of the Melnikov functions in order that an analytic or a poly...
The secant variety of the Veronese surface is a singular cubic fourfold. The degeneration of Hodge s...
In this article we study the period map for a family of K3 surfaces which is given by the anticanon-...
There are several approaches to studying moduli spaces; the most well-known in algebraic geometry is...
In this paper, we study the period mappings for the families of K3 surfaces derived from the three-d...
In an earlier paper (Adv. Appl. Math. 29 (2002), 137{151) on the determinants of certain period matr...
AbstractIntegrability and linearizability of polynomial differential systems are studied. The comput...
Let $K$ be a number field or the function field of a curve over an algebraically closed field of cha...
AbstractThis paper is concerned with the monotonicity of the period function for families of quadrat...