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Kieli

1000 tulosta hakusanalla Jordan Drye

Järjestä

Jordan, H: Kritische Beiträge zur Geschichte der lateinische

Antigonos Verlag

2024

sidottu

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Jordan, J: Bericht über die Feier des 18. und 22. Februar 18

Antigonos Verlag

2025

nidottu

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Jordan, W: Litthauische Volkslieder und Sagen

Antigonos Verlag

2025

nidottu

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Jordan, J: Jahrbücher für slawische Literatur, Kunst und Wis

Antigonos Verlag

2025

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Jordan, W: Litthauische Volkslieder und Sagen

Antigonos Verlag

2025

sidottu

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Jordan, J: Jahrbücher für slawische Literatur, Kunst und Wis

Antigonos Verlag

2025

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Jordan, W: Nibelunge - Sigfridsage

Antigonos Verlag

2025

nidottu

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Jordan, W: Nibelunge - Sigfridsage

Antigonos Verlag

2025

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Jordan Pairs

O.G. Loos

Springer-Verlag Berlin and Heidelberg GmbH Co. K

1975

nidottu

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Jordan Triple Systems by the Grid Approach

Erhard Neher

Springer-Verlag Berlin and Heidelberg GmbH Co. K

1987

nidottu

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Grids are special families of tripotents in Jordan triple systems. This research monograph presents a theory of grids including their classification and coordinization of their cover. Among the applications given are - classification of simple Jordan triple systems covered by a grid, reproving and extending most of the known classification theorems for Jordan algebras and Jordan pairs - a Jordan-theoretic interpretation of the geometry of the 27 lines on a cubic surface - structure theories for Hilbert-triples and JBW*-triples, the Jordan analogues of Hilbert-triples and W*-algebras which describe certain symmetric Banach manifolds. The notes are essentially self-contained and independent of the structure theory of Jordan algebras and Jordan pairs. They can be read by anyone with a basic knowledge in algebraic geometry or functional analysis. The book is intended to serve both as a reference for researchers in Jordan theory and as an introductory textbook for newcomers to the subject.

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Jordan Algebras and Algebraic Groups

Tonny A. Springer

Springer-Verlag Berlin and Heidelberg GmbH Co. K

1997

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This volume, part of the "Springer Classics in Mathematics" series, looks at Jordan algebras. Issues discussed include preliminaries, J-structures, the quadratic map of a J-structure, the minimum polynomial of an element, and rationality questions.

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Jordan algebras, Jordan coalgebras and unification theories

Florin-Felix Nichita

Editions Universitaires Europeennes

2017

pokkari

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This book is intended as a primer on non-associative structures and related structures. It presents new insight into the theory of Jordan algebras. Graduate students may use it as a source of inspiration for their theses, and researchers might find in it some open problems. In modern mathematics, an important notion is that of non-associative structure. This kind of structures is characterized by the fact the product of elements verifies a more general law than the associativity law. In the beginning, mathematics was associative and commutative, then (after the invention of matrices) it became associative and non-commutative, and now (after the invention of non-associative structures) it becomes non-associative and non-commutative.

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Jordan-Algebren

Hel Braun; Max Koecher

Springer-Verlag Berlin and Heidelberg GmbH Co. K

2012

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Kommutative Algebren, in denen als Ersatz des Assoziativgesetzes 2 2 die Identitat (u v) u = u (v u) gilt, wurden erstmals von P. JORDAN im Jahre 1932 im Zusammenhang mit Fragen der Quantentheorie untersucht. Die Autoren P. JORDAN, J. VON NEUMANN und E. WIGNER gaben bald darauf eine Strukturtheorie der formal-reellen "Jordan- Algebren". AnschlieBend waren die Jordan-Algebren Gegenstand zahl- reicher rein algebraischer Untersuchungen. Man verdankt hier ins- besondere A. A. ALBERT und N. JACOBSON interessante und tiefliegende Ergebnisse. Die Einzelheiten der Entwicklung der Theorie der Jordan- Algebren kann man recht gut dem (von uns moglichst vollstandig angegebenen) Literaturverzeichnis entnehmen. Es sind darin auch die- jenigen Publikationen aufgenommen worden, die sich nicht in den Rahmen des vorliegenden Buches einfligen. Dieses Literaturverzeichnis umfaBt die Publikationen fiber nicht-assoziative Algebren mit AusschluB der Lie-Algebren. Jordan-Algebren und alternative Algebren haben mehr noch als Lie-Algebren den AnstoB zum Studium allgemeiner nicht-assoziativer Algebren gegeben. In letzter Zeit ergaben sich neben neuen algebraischen Aspekten auch Anwendungen der Jordan-Algebren auf Teile der Analysis. Damit stehen die Jordan-Algebren erganzend neben den Lie-Algebren. Die Autoren gelangten zu den Jordan-Algebren, indem sie von Problem en der Analysis, genauer von der systematischen Untersuchung derjenigen homogenen Bereiche ausgingen, die der Theorie der Modul- funktionen in mehreren Variablen zugrunde liegen. Die von ihnen zunachst im Hinblick auf diese Anwendungen entwickelten Methoden erwiesen sich dann auch flir Jordan-Algebren fiber beliebigen Korpern als adaquat. Bei der Gestaltung dieser Gedankengange wurden die Autoren von E. ARTIN in dessen letzten Lebensjahren tatkraftig unterstfitzt.

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Jordan von Giano und Thomas von Eccleston - ein Vergleich zweier Chronisten und Minderbrüder des Franziskanerordens

Stefan Gnehrich

Grin Publishing

2013

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Jordan and the World Trading System

Bashar H. Malkawi

GRIN Verlag

2019

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Jordan Road Map 1:700 000

FREYTAG-BERNDT

2014

kartta, viikattu

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freytagberndt maps are available for many countries and regions in the world. In addition to the precise cartography each map also includes a lot of additional information about the region covered.

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