Isolated Singular Points on Complete Intersections London Mathematical Society Lecture Note Series

Singularity theory is not a field in itself, but rather an application of algebraic geometry, analytic geometry and differential analysis. The adjective 'singular' in the title refers here to singular points of complex-analytic or algebraic varieties or mappings. A tractable (and very natural) class of singularities to study are the isolated complete intersection singularities, and much progress has been made over the past decade in understanding these and their deformations.

1. Examples of isolated singular points; 2. The milnor fibration; 3. Picard-Lefschetz formulas; 4. Critical space and discriminant space; 5. Relative monodromy; 6. Deformations; 7. Vanishing lattices, monodromy groups and adjacency; 8. The local Guass-Manin connection; 9. Applications of the local Gauss-Manin connection.