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National Repository of Grey Literature

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	Quaternion algebras Bečka, Pavel ; Klaška, Jiří (referee) ; Kureš, Miroslav (advisor) This thesis deals with quaternion algebras. A quaternion algebra is a four dimensional vector space with basis 1, i, j, k and multiplication defined as i2 = a, j2 = b, ij = -ji = k. The thesis deals with the basic attributes of quaternion algebras, quaternion orders and maximal orders. Lastly the thesis deals with the concept of discriminant of algebras and connected terms like Hilbert symbol and Legendre symbol. Throughout the thesis we show solved problems using mathematical software SAGE. Detailed record
	Discretely normed orders of quaternionic algebras Horníček, Jan ; Skula, Ladislav (referee) ; Kureš, Miroslav (advisor) Tato práce shrnuje autorův výzkum v oblasti teorie kvaternionových algeber, jejich izomorfismů a maximálních řádů. Nový úhel pohledu na tuto problematiku je umožněn využitím pojmu diskrétní normy. Za hlavní výsledky práce je možná považovat důkaz jednoznačnosti diskrétní normy pro celá čísla, kvadratická rozšíření těles a řády kvaternionových algeber. Dále větu, která umožňuje mezi dvěma kvaternionovými algebrami konstruovat izomorfismy explicitně vyjádřené v maticovém tvaru. A v neposlední řadě důkaz existence nekonečně mnoha různých maximálních řádů kvaternionové algebry. Výsledky uvedené v této diplomové práci budou dále publikovány ve vědeckém článku. Detailed record
	Quaternion algebras Bečka, Pavel ; Klaška, Jiří (referee) ; Kureš, Miroslav (advisor) This thesis deals with quaternion algebras. A quaternion algebra is a four dimensional vector space with basis 1, i, j, k and multiplication defined as i2 = a, j2 = b, ij = -ji = k. The thesis deals with the basic attributes of quaternion algebras, quaternion orders and maximal orders. Lastly the thesis deals with the concept of discriminant of algebras and connected terms like Hilbert symbol and Legendre symbol. Throughout the thesis we show solved problems using mathematical software SAGE. Detailed record
	Discretely normed orders of quaternionic algebras Horníček, Jan ; Skula, Ladislav (referee) ; Kureš, Miroslav (advisor) Tato práce shrnuje autorův výzkum v oblasti teorie kvaternionových algeber, jejich izomorfismů a maximálních řádů. Nový úhel pohledu na tuto problematiku je umožněn využitím pojmu diskrétní normy. Za hlavní výsledky práce je možná považovat důkaz jednoznačnosti diskrétní normy pro celá čísla, kvadratická rozšíření těles a řády kvaternionových algeber. Dále větu, která umožňuje mezi dvěma kvaternionovými algebrami konstruovat izomorfismy explicitně vyjádřené v maticovém tvaru. A v neposlední řadě důkaz existence nekonečně mnoha různých maximálních řádů kvaternionové algebry. Výsledky uvedené v této diplomové práci budou dále publikovány ve vědeckém článku. Detailed record

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