| Chapter 0. | Introduction and Preliminaries | 1 |
| 0.1 | Hilbert Space | 1 |
| 0.2 | Invariant Subspaces | 2 |
| 0.3 | Spectra of Operators | 4 |
| 0.4 | Linear Operator Equations | 7 |
| 0.5 | Additional Propositions | 9 |
| 0.6 | Notes and Remarks | 10 |
| Chapter 1. | Normal Operators | 11 |
| 1.1 | Preliminaries | 11 |
| 1.2 | Compact Normal Operators | 12 |
| 1.3 | Spectral Theorem--First Form | 13 |
| 1.4 | Spectral Theorem--Second Form | 16 |
| 1.5 | Fuglede's Theorem | 19 |
| 1.6 | The Algebra L[superscript infinity] | 21 |
| 1.7 | The Functional Calculus | 21 |
| 1.8 | Completely Normal Operators | 22 |
| 1.9 | Additional Propositions | 23 |
| 1.10 | Notes and Remarks | 25 |
| Chapter 2. | Analytic Functions of Operators | 26 |
| 2.1 | The Functional Calculus | 26 |
| 2.2 | The Riesz Decomposition Theorem | 31 |
| 2.3 | Invariant Subspaces of Analytic Functions of Operators | 32 |
| 2.4 | Additional Propositions | 33 |
| 2.5 | Notes and Remarks | 34 |
| Chapter 3. | Shift Operators | 36 |
| 3.1 | Shifts of Multiplicity 1 | 36 |
| 3.2 | Invariant Subspaces of Shifts of Multiplicity 1 | 38 |
| 3.3 | Shifts of Arbitrary Multiplicity | 46 |
| 3.4 | Invariant Subspaces of Shifts | 50 |
| 3.5 | Parts of Shifts | 53 |
| 3.6 | Additional Propositions | 57 |
| 3.7 | Notes and Remarks | 59 |
| Chapter 4. | Examples of Invariant Subspace Lattices | 60 |
| 4.1 | Preliminaries | 60 |
| 4.2 | Algebraic Operators | 62 |
| 4.3 | Lattices of Normal Operators | 64 |
| 4.4 | Two Unicellular Operators | 66 |
| 4.5 | Direct Products of Attainable Lattices | 72 |
| 4.6 | Attainable Ordinal Sums | 75 |
| 4.7 | Transitive Lattices | 78 |
| 4.8 | Additional Propositions | 81 |
| 4.9 | Notes and Remarks | 82 |
| Chapter 5. | Compact Operators | 84 |
| 5.1 | Existence of Invariant Subspaces | 84 |
| 5.2 | Normality and Lat A | 87 |
| 5.3 | Spectrum and Lat A | 88 |
| 5.4 | Lattices of Compact Operators | 90 |
| 5.5 | Additional Propositions | 92 |
| 5.6 | Notes and Remarks | 93 |
| Chapter 6. | Existence of Invariant and Hyperinvariant Subspaces | 95 |
| 6.1 | Operators on Other Spaces | 95 |
| 6.2 | Perturbations of Normal Operators | 97 |
| 6.3 | Quasi-similarity and Invariant Subspaces | 108 |
| 6.4 | Hyperinvariant Subspaces | 110 |
| 6.5 | Additional Propositions | 113 |
| 6.6 | Notes and Remarks | 114 |
| Chapter 7. | Certain Results on von Neumann Algebras | 117 |
| 7.1 | Preliminaries | 117 |
| 7.2 | Commutants | 118 |
| 7.3 | The Algebra B (H) | 120 |
| 7.4 | Abelian von Neumann Algebras | 122 |
| 7.5 | The Class of n-normal Operators | 127 |
| 7.6 | Additional Propositions | 136 |
| 7.7 | Notes and Remarks | 136 |
| Chapter 8. | Transitive Operator Algebras | 138 |
| 8.1 | Strictly Transitive Algebras | 138 |
| 8.2 | Partial Solutions of the Transitive Algebra Problem | 142 |
| 8.3 | Generators of B (H) | 160 |
| 8.4 | Additional Propositions | 163 |
| 8.5 | Notes and Remarks | 164 |
| Chapter 9. | Algebras Associated with Invariant Subspaces | 167 |
| 9.1 | Reductive Algebras | 167 |
| 9.2 | Reflexive Operator Algebras | 177 |
| 9.3 | Triangular Operator Algebras | 185 |
| 9.4 | Additional Propositions | 188 |
| 9.5 | Notes and Remarks | 189 |
| Chapter 10. | Some Unsolved Problems | 192 |
| 10.1 | Normal Operators | 192 |
| 10.2 | Attainable Lattices | 193 |
| 10.3 | Existence of Invariant Subspaces | 194 |
| 10.4 | Reducing Subspaces and von Neumann Algebras | 195 |
| 10.5 | Transitive and Reductive Algebras | 196 |
| 10.6 | Reflexive Algebras | 197 |
| 10.7 | Triangular Algebras | 198 |
| References | 199 |
| List of Symbols | 211 |
| Author Index | 212 |
| Subject Index | 215 |
| Chapter 11. | Some Subsequent Developments | 221 |
| 11.1 | Normal Operators | 221 |
| 11.2 | Attainable Lattices | 222 |
| 11.3 | Existence of Invariant Subspaces | 222 |
| 11.4 | Reducing Subspaces and von Neumann algebras | 225 |
| 11.5 | Transitive and Reductive Algebras | 225 |
| 11.6 | Reflexive Algebras | 227 |
| 11.7 | Triangular Operator Algebras | 228 |
| Additional References | 231 |
