Table of Contents

1: Pontryagin Spaces and Operator Colligations.- 1.1 Reproducing kernel Pontryagin spaces.- 1.2 Operator colligations.- 1.3 Julia operators and contractions.- 1.4 Extension of densely defined linear relations.- 1.5 Complementation and reproducing kernels.- 2: Schur Functions and their Canonical Realizations.- 2.1 Pontryagin spacesℵ(S),—($$ \widetilde{S} $$ ), and D(S).- 2.2 Canonical coisometric and isometric realizations.- 2.3 Canonical unitary realization.- 2.4 Unitary dilations of coisometric and isometric colligations.- 2.5 Classes SK(F,B).- 3: The State Spaces.- 3.1 Invariance under difference quotients.- 3.2 Spaces—(S).- 3.3 Spaces—$$ \widetilde{S} $$.- 3.4 Spaces D(S).- 3.5 Examples and miscellaneous results.- 4: Structural Properties.- 4.1 Factorization and invariant subspaces.- 4.2 Kreîn-Langer factorization.- 4.3 The Potapov-Ginzburg transform.- 4.4 Applications to the realization theory.- 4.5 Canonical models.- Epilogue: Open Questions and Directions for Further Work.- Appendix: Some Finite-Dimensional Spaces.- Notes.- References.- Notation Index.- Author Index.