04041nam 22005895 450 991079923300332120240102172854.0981-9909-10-410.1007/978-981-99-0910-0(CKB)29526685300041(DE-He213)978-981-99-0910-0(MiAaPQ)EBC31094165(Au-PeEL)EBL31094165(EXLCZ)992952668530004120240102d2023 u| 0engur|||||||||||txtrdacontentcrdamediacrrdacarrierThe Theory of Zeta-Functions of Root Systems[electronic resource] /by Yasushi Komori, Kohji Matsumoto, Hirofumi Tsumura1st ed. 2023.Singapore :Springer Nature Singapore :Imprint: Springer,2023.1 online resource (IX, 414 p. 13 illus.) Springer Monographs in Mathematics,2196-99229789819909094 Introduction -- Fundamentals of the theory of Lie algebras and root systems -- Definitions and examples -- Values at positive even integer points -- Convex polytopes and the rationality -- The recursive structure -- The meromorphic continuation -- Functional relations (I) -- Functional relations (II) -- Poincar´e polynomials and values at integer points -- The case of the exceptional algebra G2 -- Applications to multiple zeta values (I) -- Applications to multiple zeta values (II) -- L-functions -- Zeta-functions of Lie groups -- Lattice sums of hyperplane arrangements -- Miscellaneous results.The contents of this book was created by the authors as a simultaneous generalization of Witten zeta-functions, Mordell–Tornheim multiple zeta-functions, and Euler–Zagier multiple zeta-functions. Zeta-functions of root systems are defined by certain multiple series, given in terms of root systems. Therefore, they intrinsically have the action of associated Weyl groups. The exposition begins with a brief introduction to the theory of Lie algebras and root systems and then provides the definition of zeta-functions of root systems, explicit examples associated with various simple Lie algebras, meromorphic continuation and recursive analytic structure described by Dynkin diagrams, special values at integer points, functional relations, and the background given by the action of Weyl groups. In particular, an explicit form of Witten’s volume formula is provided. It is shown that various relations among special values of Euler–Zagier multiple zeta-functions—which usually are called multiple zeta values (MZVs) and are quite important in connection with Zagier’s conjecture—are just special cases of various functional relations among zeta-functions of root systems. The authors further provide other applications to the theory of MZVs and also introduce generalizations with Dirichlet characters, and with certain congruence conditions. The book concludes with a brief description of other relevant topics.Springer Monographs in Mathematics,2196-9922Number theoryGroup theoryFunctions of complex variablesNumber TheoryGroup Theory and GeneralizationsFunctions of a Complex VariableNumber theory.Group theory.Functions of complex variables.Number Theory.Group Theory and Generalizations.Functions of a Complex Variable.512.7Komori Yasushiauthttp://id.loc.gov/vocabulary/relators/aut1587639Matsumoto Kohjiauthttp://id.loc.gov/vocabulary/relators/autTsumura Hirofumiauthttp://id.loc.gov/vocabulary/relators/autMiAaPQMiAaPQMiAaPQBOOK9910799233003321The Theory of Zeta-Functions of Root Systems3875878UNINA