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The Gohberg Anniversary Collection. Volume II: Topics in Analysis and Operator Theory (Operator Theory: Advances and Applications, Vol. 41)
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The Gohberg Anniversary Collection
ISBN: 9783034899758 bzw. 3034899750, in Deutsch, Birkhäuser, Taschenbuch, neu.
buecher.de GmbH & Co. KG, [1].
In this article we shall use two special classes of reproducing kernel Hilbert spaces (which originate in the work of de Branges [dB) and de Branges-Rovnyak [dBRl), respectively) to solve matrix versions of a number of classical interpolation problems. Enroute we shall reinterpret de Branges' characterization of the first of these spaces, when it is finite dimensional, in terms of matrix equations of the Liapunov and Stein type and shall subsequently draw some general conclusions on rational m x m matrix valued functions which are "J unitary" A.e. on either the circle or the line. We shall also make some connections with the notation of displacement rank which has been introduced and extensively studied by Kailath and a number of his colleagues as well as the one used by Heinig and Rost [HR). The first of the two classes of spaces alluded to above is distinguished by a reproducing kernel of the special form K (.) = J - U(')JU(w)* (Ll) w Pw(') , in which J is a constant m x m signature matrix and U is an m x m J inner matrix valued function over +, where + is equal to either the open unit disc ID or the open upper half plane (1)+ and Pw(') is defined in the table below.Softcover reprint of the original 1st ed. 1989. 2011. ix, 547 S. 235 mmVersandfertig in 3-5 Tagen, Softcover.
The Gohberg Anniversary Collection (2011)
ISBN: 9783034899758 bzw. 3034899750, in Deutsch, Birkhäuser Nov 2011, Taschenbuch, neu, Nachdruck.
This item is printed on demand - Print on Demand Titel. Neuware - In this article we shall use two special classes of reproducing kernel Hilbert spaces (which originate in the work of de Branges [dB) and de Branges-Rovnyak [dBRl), respectively) to solve matrix versions of a number of classical interpolation problems. Enroute we shall reinterpret de Branges' characterization of the first of these spaces, when it is finite dimensional, in terms of matrix equations of the Liapunov and Stein type and shall subsequently draw some general conclusions on rational m x m matrix valued functions which are 'J unitary' A.e. on either the circle or the line. We shall also make some connections with the notation of displacement rank which has been introduced and extensively studied by Kailath and a number of his colleagues as well as the one used by Heinig and Rost [HR). The first of the two classes of spaces alluded to above is distinguished by a reproducing kernel of the special form K (.) = J - U(')JU(w) (Ll) w Pw(') , in which J is a constant m x m signature matrix and U is an m x m J inner matrix valued function over ~+, where ~+ is equal to either the open unit disc ID or the open upper half plane (1)+ and Pw(') is defined in the table below. 547 pp. Englisch.
The Gohberg Anniversary Collection
ISBN: 9783764323080 bzw. 3764323086, in Deutsch, Birkhäuser, gebundenes Buch, neu.
buecher.de GmbH & Co. KG, [1].
In this article we shall use two special classes of reproducing kernel Hilbert spaces (which originate in the work of de Branges [dB) and de Branges-Rovnyak [dBRl), respectively) to solve matrix versions of a number of classical interpolation problems. Enroute we shall reinterpret de Branges' characterization of the first of these spaces, when it is finite dimensional, in terms of matrix equations of the Liapunov and Stein type and shall subsequently draw some general conclusions on rational m x m matrix valued functions which are "J unitary" A.e. on either the circle or the line. We shall also make some connections with the notation of displacement rank which has been introduced and extensively studied by Kailath and a number of his colleagues as well as the one used by Heinig and Rost [HR). The first of the two classes of spaces alluded to above is distinguished by a reproducing kernel of the special form K (.) = J - U(')JU(w)* (Ll) w Pw(') , in which J is a constant m x m signature matrix and U is an m x m J inner matrix valued function over +, where + is equal to either the open unit disc ID or the open upper half plane (1)+ and Pw(') is defined in the table below.ix, 547 S. 254 mmVersandfertig in 3-5 Tagen, Hardcover.
The Gohberg Anniversary Collection
ISBN: 9783764323080 bzw. 3764323086, vermutlich in Englisch, Springer Nature, gebundenes Buch, neu.
In this article we shall use two special classes of reproducing kernel Hilbert spaces (which originate in the work of de Branges [dB) and de Branges-Rovnyak [dBRl), respectively) to solve matrix versions of a number of classical interpolation problems. Enroute we shall reinterpret de Branges' characterization of the first of these spaces, when it is finite dimensional, in terms of matrix equations of the Liapunov and Stein type and shall subsequently draw some general conclusions on rational m x m matrix valued functions which are "J unitary" A.e. on either the circle or the line. We shall also make some connections with the notation of displacement rank which has been introduced and extensively studied by Kailath and a number of his colleagues as well as the one used by Heinig and Rost [HR). The first of the two classes of spaces alluded to above is distinguished by a reproducing kernel of the special form K (>.) = J - U(>')JU(w)* (Ll) w Pw(>') , in which J is a constant m x m signature matrix and U is an m x m J inner matrix valued function over ~+, where ~+ is equal to either the open unit disc ID or the open upper half plane (1)+ and Pw(>') is defined in the table below. Hard cover.
The Gohberg Anniversary Collection
ISBN: 9783034899758 bzw. 3034899750, vermutlich in Englisch, Springer Nature, Taschenbuch, neu.
In this article we shall use two special classes of reproducing kernel Hilbert spaces (which originate in the work of de Branges [dB) and de Branges-Rovnyak [dBRl), respectively) to solve matrix versions of a number of classical interpolation problems. Enroute we shall reinterpret de Branges' characterization of the first of these spaces, when it is finite dimensional, in terms of matrix equations of the Liapunov and Stein type and shall subsequently draw some general conclusions on rational m x m matrix valued functions which are "J unitary" A.e. on either the circle or the line. We shall also make some connections with the notation of displacement rank which has been introduced and extensively studied by Kailath and a number of his colleagues as well as the one used by Heinig and Rost [HR). The first of the two classes of spaces alluded to above is distinguished by a reproducing kernel of the special form K (>.) = J - U(>')JU(w)* (Ll) w Pw(>') , in which J is a constant m x m signature matrix and U is an m x m J inner matrix valued function over ~+, where ~+ is equal to either the open unit disc ID or the open upper half plane (1)+ and Pw(>') is defined in the table below. Soft cover.
The Gohberg Anniversary Collection by Seymour Goldberg Paperback | Indigo Chapters
ISBN: 9783034899758 bzw. 3034899750, vermutlich in Englisch, Taschenbuch, neu.
In this article we shall use two special classes of reproducing kernel Hilbert spaces (which originate in the work of de Branges [dB) and de Branges-Rovnyak [dBRl), respectively) to solve matrix versions of a number of classical interpolation problems. Enroute we shall reinterpret de Branges'' characterization of the first of these spaces, when it is finite dimensional, in terms of matrix equations of the Liapunov and Stein type and shall subsequently draw some general conclusions on rational m x m matrix valued functions which are ""J unitary"" A. e. on either the circle or the line. We shall also make some connections with the notation of displacement rank which has been introduced and extensively studied by Kailath and a number of his colleagues as well as the one used by Heinig and Rost [HR). The first of the two classes of spaces alluded to above is distinguished by a reproducing kernel of the special form K (>.) = J - U(>'')JU(w)* (Ll) w Pw(>'') , in which J is a constant m x m signature matrix and U is an m x m J inner matrix valued function over ~+, where ~+ is equal to either the open unit disc ID or the open upper half plane (1)+ and Pw(>'') is defined in the table below. | The Gohberg Anniversary Collection by Seymour Goldberg Paperback | Indigo Chapters.
The Gohberg Anniversary Collection: Bd. 2 The Gohberg Anniversary Collection
ISBN: 9783764323080 bzw. 3764323086, Band: 2, in Deutsch, Birkhäuser, neu.
1989, 560 Seiten, Maße: 15,5 x 23,5 cm, Gebunden, Englisch, ""This is an extended second edition of 'The Topology of Torus Actions on Symplectic Manifolds' published in this series in 1991. The material and references have been updated. Symplectic manifolds and torus actions are investigated, with numerous examples of torus actions, for instance on some moduli spaces. Although the book is still centered on convexity theorems, it contains much more results, proofs and examples. Chapter I deals with Lie group actions on manifolds. In Chapters II and III, symplectic geometry and Hamiltonian group actions are introduced, especially torus actions and action-angle variables. The core of the book is Chapter IV which is devoted to applications of Morse theory to Hamiltonian group actions, including convexity theorems. As a family of examples of symplectic manifolds, moduli spaces of flat connections are discussed in Chapter V. Then, Chapter VI centers on the Duistermaat-Heckman theorem. In Chapter VII, a topological construction of complex toric varieties is presented, and t.
The Gohberg Anniversary Collection
ISBN: 9783764323080 bzw. 3764323086, in Deutsch, Birkhäuser, gebundenes Buch, neu.
buecher.de GmbH & Co. KG, [1].
This is an extended second edition of 'The Topology of Torus Actions on Symplectic Manifolds' published in this series in 1991. The material and references have been updated. Symplectic manifolds and torus actions are investigated, with numerous examples of torus actions, for instance on some moduli spaces. Although the book is still centered on convexity theorems, it contains much more results, proofs and examples. Chapter I deals with Lie group actions on manifolds. In Chapters II and III, symplectic geometry and Hamiltonian group actions are introduced, especially torus actions and action-angle variables. The core of the book is Chapter IV which is devoted to applications of Morse theory to Hamiltonian group actions, including convexity theorems. As a family of examples of symplectic manifolds, moduli spaces of flat connections are discussed in Chapter V. Then, Chapter VI centers on the Duistermaat-Heckman theorem. In Chapter VII, a topological construction of complex toric varieties is presented, and the last chapter illustrates the introduced methods for Hamiltonian circle actions on 4-manifolds.235 mmVersandfertig in 3-5 Tagen, Hardcover.
The Gohberg Anniversary Collection: Volume II: Topics in Analysis and Operator Theory: 2 (Operator Theory: Advances and Applications) (2011)
ISBN: 9783034899758 bzw. 3034899750, in Deutsch, Birkhäuser, Taschenbuch, neu, Nachdruck.
This item is printed on demand for shipment within 3 working days.
The Gohberg Anniversary Collection: Volume II: Topics in Analysis and Operator Theory: 2 (Operator Theory: Advances and Applications) (2011)
ISBN: 9783034899758 bzw. 3034899750, in Deutsch, Birkhäuser, Taschenbuch, neu, Nachdruck.
This item is printed on demand for shipment within 3 working days.