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This work covers three important aspects of monomials ideals in the three chapters "Stanley decompositions" by Jürgen Herzog, "Edge ideals" by Adam Van Tuyl and "Local cohomology" by Josep Álvarez Montaner. The chapters, written by top experts, include computer tutorials that emphasize the computational aspects of the respective areas. Monomial ideals and algebras are, in a sense, among the simplest structures in commutative algebra and the main objects of combinatorial commutative algebra. Also, they are of major importance for at least three reasons. Firstly, Gröbner basis theory allows us to treat certain problems on general polynomial ideals by means of monomial ideals. Secondly, the combinatorial structure of monomial ideals connects them to other combinatorial structures and allows us to solve problems on both sides of this correspondence using the techniques of each of the respective areas. And thirdly, the combinatorial nature of monomial ideals also makes them particularly well suited to the development of algorithms to work with them and then generate algorithms for more general structures.
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This work covers three important aspects of monomials ideals in the three chapters "Stanley decompositions" by Jürgen Herzog, "Edge ideals" by Adam Van Tuyl and "Local cohomology" by Josep Álvarez Montaner. The chapters, written by top experts, include computer tutorials that emphasize the computational aspects of the respective areas. Monomial ideals and algebras are, in a sense, among the simplest structures in commutative algebra and the main objects of combinatorial commutative algebra. Also, they are of major importance for at least three reasons. Firstly, Gröbner basis theory allows us to treat certain problems on general polynomial ideals by means of monomial ideals. Secondly, the combinatorial structure of monomial ideals connects them to other combinatorial structures and allows us to solve problems on both sides of this correspondence using the techniques of each of the respective areas. And thirdly, the combinatorial nature of monomial ideals also makes them particularly well suited to the development of algorithms to work with them and then generate algorithms for more general structures.
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Monomial Ideals, Computations and Applications.
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Berlin, Heidelberg, Springer., 2013
ISBN 10: 3642387411
ISBN 13: 9783642387418
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MONOMIAL IDEALS, COMPUTATIONS AND APPLICATIONS
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Monomial Ideals, Computations and Applications
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Springer Berlin Heidelberg Sep 2013, 2013
ISBN 10: 3642387411
ISBN 13: 9783642387418
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Taschenbuch. Zustand: Neu. This item is printed on demand - it takes 3-4 days longer - Neuware -This work covers three important aspects of monomials ideals in the three chapters 'Stanley decompositions' by Jürgen Herzog, 'Edge ideals' by Adam Van Tuyl and 'Local cohomology' by Josep Álvarez Montaner. The chapters, written by top experts, include computer tutorials that emphasize the computational aspects of the respective areas. Monomial ideals and algebras are, in a sense, among the simplest structures in commutative algebra and the main objects of combinatorial commutative algebra. Also, they are of major importance for at least three reasons. Firstly, Gröbner basis theory allows us to treat certain problems on general polynomial ideals by means of monomial ideals. Secondly, the combinatorial structure of monomial ideals connects them to other combinatorial structures and allows us to solve problems on both sides of this correspondence using the techniques of each of the respective areas. And thirdly, the combinatorial nature of monomial ideals also makes them particularly well suited to the development of algorithms to work with them and then generate algorithms for more general structures. 208 pp. Englisch. Bestandsnummer des Verkäufers 9783642387418
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Monomial Ideals, Computations and Applications
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Monomial Ideals, Computations and Applications
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Monomial Ideals, Computations and Applications
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Zustand: New. PRINT ON DEMAND pp. 210. Bestandsnummer des Verkäufers 1897107246
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Monomial Ideals, Computations and Applications
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Paperback. Zustand: Brand New. 2013 edition. 210 pages. 9.00x6.00x0.45 inches. In Stock. Bestandsnummer des Verkäufers 3642387411
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Monomial Ideals, Computations and Applications
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Zustand: New. Dieser Artikel ist ein Print on Demand Artikel und wird nach Ihrer Bestellung fuer Sie gedruckt. Chapters cover leading-edge aspects of the theory of monomial ideals written by top researchers in their fieldsIncludes computer tutorials that highlight the computational aspects of the areaCarefully written introductions to topics of current re. Bestandsnummer des Verkäufers 5059070
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Monomial Ideals, Computations and Applications
ISBN 10: 3642387411
ISBN 13: 9783642387418
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Taschenbuch. Zustand: Neu. Neuware -This work covers three important aspects of monomials ideals in the three chapters 'Stanley decompositions' by Jürgen Herzog, 'Edge ideals' by Adam Van Tuyl and 'Local cohomology' by Josep Álvarez Montaner. The chapters, written by top experts, include computer tutorials that emphasize the computational aspects of the respective areas. Monomial ideals and algebras are, in a sense, among the simplest structures in commutative algebra and the main objects of combinatorial commutative algebra. Also, they are of major importance for at least three reasons. Firstly, Gröbner basis theory allows us to treat certain problems on general polynomial ideals by means of monomial ideals. Secondly, the combinatorial structure of monomial ideals connects them to other combinatorial structures and allows us to solve problems on both sides of this correspondence using the techniques of each of the respective areas. And thirdly, the combinatorial nature of monomial ideals also makes them particularly well suited to the development of algorithms to work with them and then generate algorithms for more general structures.Springer Verlag GmbH, Tiergartenstr. 17, 69121 Heidelberg 208 pp. Englisch. Bestandsnummer des Verkäufers 9783642387418
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Monomial Ideals, Computations and Applications
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Taschenbuch. Zustand: Neu. Druck auf Anfrage Neuware - Printed after ordering - This work covers three important aspects of monomials ideals in the three chapters 'Stanley decompositions' by Jürgen Herzog, 'Edge ideals' by Adam Van Tuyl and 'Local cohomology' by Josep Álvarez Montaner. The chapters, written by top experts, include computer tutorials that emphasize the computational aspects of the respective areas. Monomial ideals and algebras are, in a sense, among the simplest structures in commutative algebra and the main objects of combinatorial commutative algebra. Also, they are of major importance for at least three reasons. Firstly, Gröbner basis theory allows us to treat certain problems on general polynomial ideals by means of monomial ideals. Secondly, the combinatorial structure of monomial ideals connects them to other combinatorial structures and allows us to solve problems on both sides of this correspondence using the techniques of each of the respective areas. And thirdly, the combinatorial nature of monomial ideals also makes them particularly well suited to the development of algorithms to work with them and then generate algorithms for more general structures. Bestandsnummer des Verkäufers 9783642387418
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