Liaison, Schottky Problem and Invariant Theory

Part I. Federico Gaeta

1. Federico Gaeta, Among the Last Classics
Ignacio Sols

2. Federico Gaeta and His Italian Heritage
Ciro Ciliberto

3. Articles Published by Federico Gaeta

Part II. Linkage Theory

4. Gaeta’s Work on Liaison Theory: An Appreciation
Rosa M. Miró-Roig

5. Symmetric Ladders and G-biliaison
Elisa Gorla

6. Liaison Invariants and the Hilbert Scheme of Codimension 2 Subschemes in ℙ
n + 2


Jan O. Kleppe

7. Minimal Links and a Result of Gaeta
Juan Migliore, Uwe Nagel

8. On the Existence of Maximal Rank Curves with Prescribed Hartshorne-Rao Module
Silvio Greco, Rosa Maria Miró-Roig

9. Doubling Rational Normal Curves
Roberto Notari, Ignacio Ojeda, Maria Luisa Spreafico

Part III. The Schottky Problem

10. Survey on the Schottky Problem
Esteban Gómez González, José M. Muñoz Porras

11. Abelian Solutions of the Soliton Equations and Geometry of Abelian Varieties
I. Krichever, T. Shiota

12. A Special Case of the Γ00 Conjecture
Samuel Grushevsky

Part IV. Computation in Algebraic Geometry

13. Federico Gaeta: His Last Ten Years of Mathematical Activity
María Emilia Alonso García

14. Covariants Vanishing on Totally Decomposable Forms
Emmanuel Briand

15. Symmetric Functions and Secant Spaces of Rational Normal Curves
Federico Gaeta

Nyckelord: Mathematics, Algebraic Geometry