Front Matter
 Chapter 1 Examples of Isolated Singular Points
  1.A Hypersurface singularities
  1.B Complete intersections
  1.C Quotient singularities
  1.D Quasi-conical singularities
  1.E Cusp singularities
 Chapter 2 The Milnor Fibration
  2.A The link of an isolated singularity
  2.B Good representatives
  2.C Geometric monodromy
  2.D*Excellent representatives
 Chapter 3 Picard-Lefschetz Formulae
  3.A Monodromy of a quadratic singularity (local case)
  3.B Monodromy of a quadratic singularity (global case)
 Chapter 4 Critical Space and Discriminant Space
  4.A The critical space
  4.B The Thom singularity manifolds
  4.C Development of the discriminant locus
  4.D The discriminant space
  4.E Appendix: Fitting ideals
 Chapter 5 Relative Monodromy
  5.A The basic construction
  5.B The homotopy type of the Milnor fiber
  5.C The monodromy theorem
 Chapter 6 Deformations
  6.A Relative differentials
  6.B The Kodaira-Spencer map
  6.C Versal deformations
  6.D Some analytic properties of versal deformations
 Chapter 7 Vanishing Lattices, Monodromy Groups and Adjacency
  7.A The fundamental group of a hypersurface complement
  7.B The monodromy group
  7.C Adjacency
  7.D A partial classification
 Chapter 8 The Local Gauß-Manin Connection
  8.A De Rham cohomology of good representatives
  8.B The Gaus-Manin connection
  8.C The complete intersection case
 Chapter 9 Applications of the Local Gauß-Manin Connection
  9.A Milnor number and Tjurina number
  9.B Singularities with good C×-action
  9.C A period mapping
 Bibliography
 Index of Notations
 Subject Index
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