yurij linnik (15 risultati)

Hardcover/Hardback. Condizione: Fair. Stikhi, voshedshie v novyj sbornik izvestnogo karelskogo poeta, posvyashcheny neprekhodyashchim tsennostyam vysokikh dukhovnykh idealov, nravstvennym poiskam nashego sovremennika.

Hardcover/Hardback. Condizione: Good. Stikhi, voshedshie v novyj sbornik izvestnogo karelskogo poeta, posvyashcheny neprekhodyashchim tsennostyam vysokikh dukhovnykh idealov, nravstvennym poiskam nashego sovremennika.

Condizione: New. In.

Condizione: New. pp. 208.

Paperback. Condizione: Brand New. reprint edition. 208 pages. 9.25x6.10x0.47 inches. In Stock.

Taschenbuch. Condizione: Neu. Druck auf Anfrage Neuware - Printed after ordering - The applications of ergodic theory to metric number theory are well known; part of the latter theory turns out to be essentially a special case of general ergodic theorems. In the present book other applications of ergodic concepts are presented. Constructing 'flows' of integral points on certain algebraic manifolds given by systems of integral polynomials, we are able to prove individual ergodic theorems and mixing theorems in certain cases. These theorems permit asymptotic calculations of the distributions of integral points on such manifolds, and we arrive at results inaccessible up to now by the usual methods of analytic number theory. Typical in this respect is the theorem concerning the asymptotic distribution and ergodic behavior of the set of integral points on the sphere X2+ y2+z2=m for increasing m. It is not known up until now how to obtain the simple and geometrically obvious regularity of the distribution of integral points on the sphere other than by ergodic methods. Systems of diophantine equations are studied with our method, and flows of integral points introduced for this purpose turn out to be closely connected with the behavior of ideal classes of the corresponding algebraic fields, and this behavior shows certain ergodic regularity in sequences of algebraic fields. However, in this book we examine in this respect only quadratic fields in sufficient detail, studying fields of higher degrees only in chapter VII.

Hardcover. Condizione: Good. In Russian. Linnik, Yuri Vladimirovich. Book of Nature. Petrozavodsk: Karelia, 1978 All images are for identification of editions only. Several books of the same edition may be available. Please feel free to request photos of available books.SKU7625698.

Hardcover. Condizione: Good. In Russian. Linnik, Yuri Vladimirovich. Basis. Petrozavodsk: Karelia, 1979 All images are for identification of editions only. Several books of the same edition may be available. Please feel free to request photos of available books.SKU7625699.

Hardcover. Condizione: Good. In Russian. Linnik, Yuri Vladimirovich. Decompositions of random quantities and vectors. Moscow: Science, 1972. All images are for identification of editions only. Several books of the same edition may be available. Please feel free to request photos of available books.SKU7156153.

Condizione: new. Questo è un articolo print on demand.

Taschenbuch. Condizione: Neu. This item is printed on demand - it takes 3-4 days longer - Neuware -The applications of ergodic theory to metric number theory are well known; part of the latter theory turns out to be essentially a special case of general ergodic theorems. In the present book other applications of ergodic concepts are presented. Constructing 'flows' of integral points on certain algebraic manifolds given by systems of integral polynomials, we are able to prove individual ergodic theorems and mixing theorems in certain cases. These theorems permit asymptotic calculations of the distributions of integral points on such manifolds, and we arrive at results inaccessible up to now by the usual methods of analytic number theory. Typical in this respect is the theorem concerning the asymptotic distribution and ergodic behavior of the set of integral points on the sphere X2+ y2+z2=m for increasing m. It is not known up until now how to obtain the simple and geometrically obvious regularity of the distribution of integral points on the sphere other than by ergodic methods. Systems of diophantine equations are studied with our method, and flows of integral points introduced for this purpose turn out to be closely connected with the behavior of ideal classes of the corresponding algebraic fields, and this behavior shows certain ergodic regularity in sequences of algebraic fields. However, in this book we examine in this respect only quadratic fields in sufficient detail, studying fields of higher degrees only in chapter VII. 208 pp. Englisch.

Condizione: New. Print on Demand pp. 208 49:B&W 6.14 x 9.21 in or 234 x 156 mm (Royal 8vo) Perfect Bound on White w/Gloss Lam.

Condizione: New. PRINT ON DEMAND pp. 208.

Condizione: New. Dieser Artikel ist ein Print on Demand Artikel und wird nach Ihrer Bestellung fuer Sie gedruckt. The applications of ergodic theory to metric number theory are well known part of the latter theory turns out to be essentially a special case of general ergodic theorems. In the present book other applications of ergodic concepts are presented. Constructi.

Taschenbuch. Condizione: Neu. This item is printed on demand - Print on Demand Titel. Neuware -The applications of ergodic theory to metric number theory are well known; part of the latter theory turns out to be essentially a special case of general ergodic theorems. In the present book other applications of ergodic concepts are presented. Constructing 'flows' of integral points on certain algebraic manifolds given by systems of integral polynomials, we are able to prove individual ergodic theorems and mixing theorems in certain cases. These theorems permit asymptotic calculations of the distributions of integral points on such manifolds, and we arrive at results inaccessible up to now by the usual methods of analytic number theory. Typical in this respect is the theorem concerning the asymptotic distribution and ergodic behavior of the set of integral points on the sphere X2+ y2+z2=m for increasing m. It is not known up until now how to obtain the simple and geometrically obvious regularity of the distribution of integral points on the sphere other than by ergodic methods. Systems of diophantine equations are studied with our method, and flows of integral points introduced for this purpose turn out to be closely connected with the behavior of ideal classes of the corresponding algebraic fields, and this behavior shows certain ergodic regularity in sequences of algebraic fields. However, in this book we examine in this respect only quadratic fields in sufficient detail, studying fields of higher degrees only in chapter VII.Springer-Verlag KG, Sachsenplatz 4-6, 1201 Wien 208 pp. Englisch.