Enriques Surfaces I

0. Preliminaries.- S1. Double covers.- S2. Rational double points.- S3. Del Pezzo surfaces.- S4. Symmetric quartic Del Pezzo surfaces.- S5. Symmetric cubic Del Pezzo surfaces.- S6. Prym canonical maps.- S7. The Picard scheme.- Bibliographical notes.- I. Enriques surfaces: generalities.- S1. Classification of algebraic surfaces.- S2. The Picard group.- S3. The K3-cover.- S4. Differential invariants.- S5. Riemann-Roch and a vanishing theorem.- S6. Examples.- Bibliographical notes.- II. Lattices and root bases.- S1. Generalities.- S2. Root bases and their Weyl groups.- S3. Root bases of finite and affine type.- S4. Root bases of hyperbolic type.- S5. The Enriques lattice.- S6. The Reye lattice.- S7. The function ?M.- S8. 2-congruence subgroups of finite Weyl groups.- S9. The factor group W/W(2).- S10. The structure of W(2).- Bibliographical notes.- Tables.- III. The geometry of the Enriques lattice..- S1. Divisors of canonical type.- S2. The nodal chamber.- S3. Canonical r-sequences and U[r]-markings.- S4. U-markings.- S5. U[3]-markings.- S6. Linear systems |C| with C2 ? 10.- Bibliographical notes.- IV. Projective models..- S1. Preliminaries.- S2. Linear systems on K3-surfaces.- S3. Numerical connectedness.- S4. Base-points.- S5. Hyperelliptic maps.- S6. Birational maps.- S7. Superelliptic maps.- S8. The branch locus of superelliptic maps.- S9. Projective models of degree ?10.- S10. Applications to linear systems.- Appendix. A theorem of Igor Reider.- Bibliographical notes.- V. Genus 1 fibrations..- S1. Genus 1 fibrations:generalities.- S2. The Picard group.- S3. Jacobian fibrations.- S4. Ogg-Shafarevich theory.- S5. Weierstrass models.- S6. Genus 1 fibrations on rational surfaces.- S7. Genus 1 fibrations on Enriques surfaces.- Bibliographical notes.- Glossary ofnotations.