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Theory of groups and symmetriesrepre...

Isaev, Alexey P., (1957-)

Theory of groups and symmetriesrepresentations of groups and lie algebras, applications /

紀錄類型:	書目-電子資源 : Monograph/item
正題名/作者:	Theory of groups and symmetriesAlexey P. Isaev, V. Aalery A. Rubakov.
其他題名:	representations of groups and lie algebras, applications /
作者:	Isaev, Alexey P.,
其他作者:	Rubakov, V. A.
出版者:	Singapore :World Scientific,c2021.
面頁冊數:	1 online resource (xiv, 600 p.)
標題:	Group theory.
電子資源:	https://www.worldscientific.com/worldscibooks/10.1142/11749#t=toc
ISBN:	9789811217418$q(ebook)

Theory of groups and symmetriesrepresentations of groups and lie algebras, applications /
Isaev, Alexey P.,1957-

Theory of groups and symmetriesrepresentations of groups and lie algebras, applications /[electronic resource] :Alexey P. Isaev, V. Aalery A. Rubakov. - 1st ed. - Singapore :World Scientific,c2021. - 1 online resource (xiv, 600 p.)

Includes bibliographical references and index.

"This book is a sequel to the book by the same authors entitled Theory of Groups and Symmetries: Finite Groups, Lie Groups, and Lie Algebras. The presentation begins with the Dirac notation, which is illustrated by boson and fermion oscillator algebras and also Grassmann algebra. Then detailed account of finite-dimensional representations of groups SL(2, C) and SU(2) and their Lie algebras is presented. The general theory of finite-dimensional irreducible representations of simple Lie algebras based on the construction of highest weight representations is given. The classification of all finite-dimensional irreducible representations of the Lie algebras of the classical series sℓ(n, C), so(n, C) and sp(2r, C) is exposed. Finite-dimensional irreducible representations of linear groups SL(N, C) and their compact forms SU(N) are constructed on the basis of the Schur-Weyl duality. A special role here is played by the theory of representations of the symmetric group algebra C[Sr] (Schur-Frobenius theory, Okounkov-Vershik approach), based on combinatorics of Young diagrams and Young tableaux. Similar construction is given for pseudo-orthogonal groups O(p, q) and SO(p, q), including Lorentz groups O(1, N-1) and SO(1, N-1), and their Lie algebras, as well as symplectic groups Sp(p, q). The representation theory of Brauer algebra (centralizer algebra of SO(p, q) and Sp(p, q) groups in tensor representations) is discussed. Finally, the covering groups Spin(p, q) for pseudo-orthogonal groups SO(p, q) are studied. For this purpose, Clifford algebras in spaces R^(p, q) are introduced and representations of these algebras are discussed"--Publisher's website.

Mode of access: World Wide Web.

ISBN: 9789811217418$q(ebook)Subjects--Topical Terms:

189579
Group theory.

LC Class. No.: QC20.7.G76 / I84 2020

Dewey Class. No.: 512.2

Theory of groups and symmetriesrepresentations of groups and lie algebras, applications /
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245 1 0 $a Theory of groups and symmetries $h [electronic resource] : $b representations of groups and lie algebras, applications / $c Alexey P. Isaev, V. Aalery A. Rubakov.
250 $a 1st ed.
260 $a Singapore : $b World Scientific, $c c2021.
300 $a 1 online resource (xiv, 600 p.)
504 $a Includes bibliographical references and index.
520 $a "This book is a sequel to the book by the same authors entitled Theory of Groups and Symmetries: Finite Groups, Lie Groups, and Lie Algebras. The presentation begins with the Dirac notation, which is illustrated by boson and fermion oscillator algebras and also Grassmann algebra. Then detailed account of finite-dimensional representations of groups SL(2, C) and SU(2) and their Lie algebras is presented. The general theory of finite-dimensional irreducible representations of simple Lie algebras based on the construction of highest weight representations is given. The classification of all finite-dimensional irreducible representations of the Lie algebras of the classical series sℓ(n, C), so(n, C) and sp(2r, C) is exposed. Finite-dimensional irreducible representations of linear groups SL(N, C) and their compact forms SU(N) are constructed on the basis of the Schur-Weyl duality. A special role here is played by the theory of representations of the symmetric group algebra C[Sr] (Schur-Frobenius theory, Okounkov-Vershik approach), based on combinatorics of Young diagrams and Young tableaux. Similar construction is given for pseudo-orthogonal groups O(p, q) and SO(p, q), including Lorentz groups O(1, N-1) and SO(1, N-1), and their Lie algebras, as well as symplectic groups Sp(p, q). The representation theory of Brauer algebra (centralizer algebra of SO(p, q) and Sp(p, q) groups in tensor representations) is discussed. Finally, the covering groups Spin(p, q) for pseudo-orthogonal groups SO(p, q) are studied. For this purpose, Clifford algebras in spaces R^(p, q) are introduced and representations of these algebras are discussed"--Publisher's website.
538 $a Mode of access: World Wide Web.
538 $a System requirements: Adobe Acrobat Reader.
588 $a Description based on print version record.
650 0 $a Group theory. $3 189579
650 0 $a Symmetry (Physics) $3 202528
650 0 $a Group algebras. $3 663639
650 0 $a Lie algebras. $3 191078
700 1 $a Rubakov, V. A. $3 575236
856 4 0 $u https://www.worldscientific.com/worldscibooks/10.1142/11749#t=toc