REFERENCES
- D. Arov and I. Gavrilyuk ( 1993 ). A method for solving initial value problems for linear differential equations in Hilbert space based on the Cayley transform . Numer. Funct. Anal. Optimiz. 14 ( 5&6 ): 459 – 473 .
- D.Z. Arov and M.A. Nudelman ( 1996 ). Passive linear stationary dynamical scattering systems with continuous time . Integral Equations Operator Theory 24 : 1 – 45 .
- J. Ball and O.J. Staffans ( 2006 ). Conservative state-space realizations of dissipative system behaviors . Integral Equations Operator Theory 54 : 151 – 213 .
- D. Braess ( 2001 ). Finite Elements. Theory, Fast Solvers and Applications in Solid Mechanics . Cambridge University Press , Cambridge .
- M.S. Brodskii˘ ( 1971 ). On operator colligations and their characteristic functions . Soviet Mat. Dokl. 12 : 696 – 700 .
- M.S. Brodskii˘ ( 1971 ). Triangular and Jordan Representations of Linear Operators . Vol. 32 . American Mathematical Society , Providence , RI .
- M.S. Brodskii˘ ( 1978 ). Unitary operator colligations and their characteristic functions . Russian Math. Surveys 33 ( 4 ): 159 – 191 .
- B. Dacorognan ( 1989 ). Direct Methods in the Calculus of Variations . Springer Verlag , Berlin .
- I.P. Gavrilyuk ( 1996 ). An algorithmic representation of fractional powers of positive operators . Numer. Funct. Anal. Optimiz. 17 ( 3–4 ): 293 – 305 .
- I.P. Gavrilyuk ( 1999 ). A class of fully discrete approximations for the first order differential equations in Banach spaces with uniform estimates on the whole of ℝ+ . Numer. Funct. Anal. Optimiz. 20 ( 7&8 ): 675 – 693 .
- I.P. Gavrilyuk ( 1999 ). Strongly P-positive operators and explicit representations of the solutions of initial value problems for second-order differential equations in Banach space . J. Math. Anal. Appl. 236 ( 2 ): 327 – 349 .
- I.P. Gavrilyuk and V.L. Makarov ( 1994 ). The Cayley transform and the solution of an initial value problem for a first order differential equation with an unbounded operator coefficient in Hilbert space . Numer. Funct. Anal. Optimiz. 15 ( 5&6 ): 583 – 598 .
- I.P. Gavrilyuk and V.L. Makarov ( 1996 ). Representation and approximation for the solution of second order differential equations with unbounded operator coefficients in Hilbert space . Zeitschrift für Angewandte Mathematik und Mechanik 76 ( 2 ): 527 – 528 .
- I.P. Gavrilyuk and V.L. Makarov (1996). Representation and approximation of the solution of an initial value problem for a first order differential equation in Banach spaces. Zeitschrift für Analysis und ihre Anwendungen 15(2):495–527.
- I.P. Gavrilyuk and V.L. Makarov ( 1998 ). Exact and approximate solutions of some operator equations based on the Cayley transform . Linear Algebra Appl. 282 ( 1–3 ): 97 – 121 .
- I.P. Gavrilyuk and V.L. Makarov ( 1999 ). Explicit and approximate solutions of second order elliptic differential equations in Hilbert and Banach spaces . Numer. Funct. Anal. Optimiz. 20 ( 7&8 ): 695 – 715 .
- I.P. Gavrilyuk and V.L. Makarov ( 1999 ). Explicit and approximate solutions of second-order evolution differential equations in Hilbert space . Numer. Methods Partial Differential Equations 15 ( 1 ): 111 – 131 .
- I.P. Gavrilyuk and V.L. Makarov ( 2004 ). Algorithms without accuracy saturation for evolution Equations in Hilbert and Banach spaces . Math. Computat. 74 ( 250 ): 555 – 583 .
- V.I. Gorbachuk and M.L. Gorbachuk ( 1991 ). Boundary Value Problems for Operator Differential Equations . Vol. 48 of Mathematics and Its Applications (Soviet Series) . Kluwer Academic Publishers Group , Dordrecht .
- E. Hairer , C. Lubich , and G. Wanner ( 2002 ). Geometric Numerical Integration: Structure–Preserving Algorithms for Ordinary Differential Equations . Springer-Verlag , Berlin .
- V. Havu and J. Malinen . Laplace and Cayley transforms – an approximation point of view . In Proceedings of the Joint 44th IEEE Conference on Decision and Control and European Control Conference (CDC-ECC’05) , Seville , 2005 .
- M.S. Livšic and A.A. Yantsevich ( 1977 ). Operator Colligations in Hilbert Space . John Wiley & Sons , New York .
- M.S. Livšic ( 1966 ). Operators, Vibrations, Waves. Open Systems . Nauka , Moscow .
- J. Malinen ( 2005 ). Conservativity and time-flow invertiblity of boundary control systems . In Proceedings of the Joint 44th IEEE Conference on Decision and Control and European Control Conference (CDC-ECC’05) , Seville .
- J. Malinen , O.J. Staffans , and G. Weiss ( 2006 ). When is a linear system conservative? Q. Appl. Math. 64 : 61 – 91 .
- J. Malinen and O.J. Staffans ( 2006 ). Conservativity of boundary control systems . J. Differential Equations 231 ( 1 ): 290 – 312 .
- J. Malinen and O.J. Staffans ( 2007 ). Impedance passive and conservative boundary control systems . Complex Analysis and Operator Theory 2 ( 1 ).
- R. Ober and S. Montgomery-Smith ( 1990 ). Bilinear transformation of infinite-dimensional state-space systems and balanced realizations of nonrational transfer functions . SIAM J. Control Optimiz. 28 ( 2 ): 438 – 465 .
- J.D. Powell , G.F. Franklin and M.L. Workman ( 1990 ). Digital Control of Dynamic Systems . Addison-Wesley , Reading , MA .
- Yu.L. Smuljan ( 1986 ). Invariant subspaces of semigroups and Lax–Phillips scheme . Dep. in VINITI, No. 8009-B86, Odessa (A private translation by Daniela Toshkova, 2001) .
- O.J. Staffans ( 2001 ). J-energy preserving well-posed linear systems . Int. J. Appl. Math. Comput. Sci. 11 : 1361 – 1378 .
- O.J. Staffans ( 2002 ). Passive and conservative continuous-time impedance and scattering systems. Part I: Well-posed systems . Math. Control, Signals Systems 15 : 291 – 315 .
- O.J. Staffans ( 2004 ). Well-Posed Linear Systems . Cambridge University Press , Cambridge .
- O.J. Staffans and G. Weiss ( 2002 ). Transfer functions of regular linear systems, Part II: The system operator and the Lax – Phillips semigroup . Trans. Am. Math. Soc. 354 ( 8 ): 3229 – 3262 .
- O.J. Staffans and G. Weiss ( 2004 ). Transfer functions of regular linear systems, Part III: Inversions and duality . Integral Equations Operator Theory 49 ( 4 ): 517 – 558 .
- B. Sz.-Nagy and C. Foias ( 1970 ). Harmonic Analysis of Operators on Hilbert Space . North-Holland Publishing Company , Amsterdam .
- M. Tucsnak and G. Weiss ( 2003 ). How to get a conservative well-posed linear system out of thin air. II. Controllability and stability . SIAM J. Control Optimiz. 42 ( 3 ): 907 – 935 .
- G. Weiss ( 1994 ). Transfer functions of regular linear systems, Part I: Characterizations of regularity . Trans. Am. Math. Soc. 342 ( 2 ): 827 – 854 .
- G. Weiss and M. Tucsnak ( 2003 ). How to get a conservative well-posed linear system out of thin air. I. Well-posedness and energy balance . ESAIM. Control, Optimisation and Calculus of Variations 9 : 247 – 274 .