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  • 1
    Online Resource
    Online Resource
    Berlin [u.a.] : Springer
    UID:
    b3kat_BV041963559
    Format: 1 Online-Ressource
    ISBN: 9783540558705
    Series Statement: Lecture notes in mathematics 1516
    Additional Edition: Erscheint auch als Druckausgabe ISBN 978-3-540-47300-8
    Language: English
    Keywords: Mehrdimensionale Interpolation ; Birkhoff-Interpolation ; Mehrdimensionale Interpolation ; Interpolation ; Hochschulschrift
    Author information: Lorentz, Rudolph A. 1943-
    Library Location Call Number Volume/Issue/Year Availability
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  • 2
    Online Resource
    Online Resource
    Berlin, Heidelberg :Springer Berlin Heidelberg :
    UID:
    almahu_9947921563202882
    Format: X, 198 p. , online resource.
    ISBN: 9783540473008
    Series Statement: Lecture Notes in Mathematics, 1516
    Content: The subject of this book is Lagrange, Hermite and Birkhoff (lacunary Hermite) interpolation by multivariate algebraic polynomials. It unifies and extends a new algorithmic approach to this subject which was introduced and developed by G.G. Lorentz and the author. One particularly interesting feature of this algorithmic approach is that it obviates the necessity of finding a formula for the Vandermonde determinant of a multivariate interpolation in order to determine its regularity (which formulas are practically unknown anyways) by determining the regularity through simple geometric manipulations in the Euclidean space. Although interpolation is a classical problem, it is surprising how little is known about its basic properties in the multivariate case. The book therefore starts by exploring its fundamental properties and its limitations. The main part of the book is devoted to a complete and detailed elaboration of the new technique. A chapter with an extensive selection of finite elements follows as well as a chapter with formulas for Vandermonde determinants. Finally, the technique is applied to non-standard interpolations. The book is principally oriented to specialists in the field. However, since all the proofs are presented in full detail and since examples are profuse, a wider audience with a basic knowledge of analysis and linear algebra will draw profit from it. Indeed, the fundamental nature of multivariate nature of multivariate interpolation is reflected by the fact that readers coming from the disparate fields of algebraic geometry (singularities of surfaces), of finite elements and of CAGD will also all find useful information here.
    Note: Univariate interpolation -- Basic properties of Birkhoff interpolation -- Singular interpolation schemes -- Shifts and coalescences -- Decomposition theorems -- Reduction -- Examples -- Uniform Hermite interpolation of tensor-product type -- Uniform Hermite interpolation of type total degree -- Vandermonde determinants -- A theorem of Severi -- Kergin interpolation via Birkhoff interpolation.
    In: Springer eBooks
    Additional Edition: Printed edition: ISBN 9783540558705
    Language: English
    Subjects: Mathematics
    RVK:
    URL: Volltext  (lizenzpflichtig)
    URL: Volltext  (Deutschlandweit zugänglich)
    URL: Cover
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  • 3
    Book
    Book
    Berlin [u.a.] : Springer
    UID:
    b3kat_BV005498039
    Format: IX, 192 S. , graph. Darst.
    ISBN: 3540558705 , 0387558705
    Series Statement: Lecture notes in mathematics 1516
    Language: English
    Subjects: Mathematics
    RVK:
    Keywords: Mehrdimensionale Interpolation ; Birkhoff-Interpolation ; Mehrdimensionale Interpolation ; Interpolation ; Hochschulschrift
    Author information: Lorentz, Rudolph A. 1943-
    Library Location Call Number Volume/Issue/Year Availability
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  • 4
    Book
    Book
    Berlin [u.a.] :Springer,
    UID:
    almahu_BV005498039
    Format: IX, 192 S. : graph. Darst.
    ISBN: 3-540-55870-5 , 0-387-55870-5
    Series Statement: Lecture notes in mathematics 1516
    Language: English
    Subjects: Mathematics
    RVK:
    Keywords: Mehrdimensionale Interpolation ; Birkhoff-Interpolation ; Mehrdimensionale Interpolation ; Interpolation ; Hochschulschrift ; Hochschulschrift
    Author information: Lorentz, Rudolph A., 1943-
    Library Location Call Number Volume/Issue/Year Availability
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  • 5
    Online Resource
    Online Resource
    Berlin, Heidelberg :Springer Berlin Heidelberg :
    UID:
    almafu_9959185996902883
    Format: 1 online resource (X, 198 p.)
    Edition: 1st ed. 1992.
    Edition: Online edition Springer Lecture Notes Archive ; 041142-5
    ISBN: 3-540-47300-9
    Series Statement: Lecture Notes in Mathematics, 1516
    Content: The subject of this book is Lagrange, Hermite and Birkhoff (lacunary Hermite) interpolation by multivariate algebraic polynomials. It unifies and extends a new algorithmic approach to this subject which was introduced and developed by G.G. Lorentz and the author. One particularly interesting feature of this algorithmic approach is that it obviates the necessity of finding a formula for the Vandermonde determinant of a multivariate interpolation in order to determine its regularity (which formulas are practically unknown anyways) by determining the regularity through simple geometric manipulations in the Euclidean space. Although interpolation is a classical problem, it is surprising how little is known about its basic properties in the multivariate case. The book therefore starts by exploring its fundamental properties and its limitations. The main part of the book is devoted to a complete and detailed elaboration of the new technique. A chapter with an extensive selection of finite elements follows as well as a chapter with formulas for Vandermonde determinants. Finally, the technique is applied to non-standard interpolations. The book is principally oriented to specialists in the field. However, since all the proofs are presented in full detail and since examples are profuse, a wider audience with a basic knowledge of analysis and linear algebra will draw profit from it. Indeed, the fundamental nature of multivariate nature of multivariate interpolation is reflected by the fact that readers coming from the disparate fields of algebraic geometry (singularities of surfaces), of finite elements and of CAGD will also all find useful information here.
    Note: Univariate interpolation -- Basic properties of Birkhoff interpolation -- Singular interpolation schemes -- Shifts and coalescences -- Decomposition theorems -- Reduction -- Examples -- Uniform Hermite interpolation of tensor-product type -- Uniform Hermite interpolation of type total degree -- Vandermonde determinants -- A theorem of Severi -- Kergin interpolation via Birkhoff interpolation.
    In: Springer eBooks
    Additional Edition: ISBN 0-387-55870-5
    Additional Edition: ISBN 3-540-55870-5
    Language: English
    Library Location Call Number Volume/Issue/Year Availability
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  • 6
    UID:
    gbv_119275627
    Format: IX, 192 S , graph. Darst
    ISBN: 9783540558705 , 3540558705 , 0387558705
    Series Statement: Lecture notes in mathematics 1516
    Note: Literaturverz. S. 171-189 , Zugl.: Duisburg, Univ., Hab.-Schr. : 1991
    Additional Edition: Online-Ausg. Lorentz, Rudolph A., 1943 - Multivariate Birkhoff Interpolation Berlin, Heidelberg : Springer Berlin Heidelberg, 1992 ISBN 9783540473008
    Additional Edition: ISBN 9783540558705
    Language: English
    Subjects: Mathematics
    RVK:
    Keywords: Mehrdimensionale Interpolation ; Birkhoff-Interpolation
    URL: Cover
    Author information: Lorentz, Rudolph A. 1943-
    Library Location Call Number Volume/Issue/Year Availability
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  • 7
    Online Resource
    Online Resource
    Berlin, Heidelberg :Springer Berlin Heidelberg :
    UID:
    edoccha_9959185996902883
    Format: 1 online resource (X, 198 p.)
    Edition: 1st ed. 1992.
    Edition: Online edition Springer Lecture Notes Archive ; 041142-5
    ISBN: 3-540-47300-9
    Series Statement: Lecture Notes in Mathematics, 1516
    Content: The subject of this book is Lagrange, Hermite and Birkhoff (lacunary Hermite) interpolation by multivariate algebraic polynomials. It unifies and extends a new algorithmic approach to this subject which was introduced and developed by G.G. Lorentz and the author. One particularly interesting feature of this algorithmic approach is that it obviates the necessity of finding a formula for the Vandermonde determinant of a multivariate interpolation in order to determine its regularity (which formulas are practically unknown anyways) by determining the regularity through simple geometric manipulations in the Euclidean space. Although interpolation is a classical problem, it is surprising how little is known about its basic properties in the multivariate case. The book therefore starts by exploring its fundamental properties and its limitations. The main part of the book is devoted to a complete and detailed elaboration of the new technique. A chapter with an extensive selection of finite elements follows as well as a chapter with formulas for Vandermonde determinants. Finally, the technique is applied to non-standard interpolations. The book is principally oriented to specialists in the field. However, since all the proofs are presented in full detail and since examples are profuse, a wider audience with a basic knowledge of analysis and linear algebra will draw profit from it. Indeed, the fundamental nature of multivariate nature of multivariate interpolation is reflected by the fact that readers coming from the disparate fields of algebraic geometry (singularities of surfaces), of finite elements and of CAGD will also all find useful information here.
    Note: Univariate interpolation -- Basic properties of Birkhoff interpolation -- Singular interpolation schemes -- Shifts and coalescences -- Decomposition theorems -- Reduction -- Examples -- Uniform Hermite interpolation of tensor-product type -- Uniform Hermite interpolation of type total degree -- Vandermonde determinants -- A theorem of Severi -- Kergin interpolation via Birkhoff interpolation.
    In: Springer eBooks
    Additional Edition: ISBN 0-387-55870-5
    Additional Edition: ISBN 3-540-55870-5
    Language: English
    Library Location Call Number Volume/Issue/Year Availability
    BibTip Others were also interested in ...
  • 8
    Online Resource
    Online Resource
    Berlin, Heidelberg :Springer Berlin Heidelberg :
    UID:
    edocfu_9959185996902883
    Format: 1 online resource (X, 198 p.)
    Edition: 1st ed. 1992.
    Edition: Online edition Springer Lecture Notes Archive ; 041142-5
    ISBN: 3-540-47300-9
    Series Statement: Lecture Notes in Mathematics, 1516
    Content: The subject of this book is Lagrange, Hermite and Birkhoff (lacunary Hermite) interpolation by multivariate algebraic polynomials. It unifies and extends a new algorithmic approach to this subject which was introduced and developed by G.G. Lorentz and the author. One particularly interesting feature of this algorithmic approach is that it obviates the necessity of finding a formula for the Vandermonde determinant of a multivariate interpolation in order to determine its regularity (which formulas are practically unknown anyways) by determining the regularity through simple geometric manipulations in the Euclidean space. Although interpolation is a classical problem, it is surprising how little is known about its basic properties in the multivariate case. The book therefore starts by exploring its fundamental properties and its limitations. The main part of the book is devoted to a complete and detailed elaboration of the new technique. A chapter with an extensive selection of finite elements follows as well as a chapter with formulas for Vandermonde determinants. Finally, the technique is applied to non-standard interpolations. The book is principally oriented to specialists in the field. However, since all the proofs are presented in full detail and since examples are profuse, a wider audience with a basic knowledge of analysis and linear algebra will draw profit from it. Indeed, the fundamental nature of multivariate nature of multivariate interpolation is reflected by the fact that readers coming from the disparate fields of algebraic geometry (singularities of surfaces), of finite elements and of CAGD will also all find useful information here.
    Note: Univariate interpolation -- Basic properties of Birkhoff interpolation -- Singular interpolation schemes -- Shifts and coalescences -- Decomposition theorems -- Reduction -- Examples -- Uniform Hermite interpolation of tensor-product type -- Uniform Hermite interpolation of type total degree -- Vandermonde determinants -- A theorem of Severi -- Kergin interpolation via Birkhoff interpolation.
    In: Springer eBooks
    Additional Edition: ISBN 0-387-55870-5
    Additional Edition: ISBN 3-540-55870-5
    Language: English
    Library Location Call Number Volume/Issue/Year Availability
    BibTip Others were also interested in ...
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