Zeta Functions of Groups and Rings
Sautoy, Marcus du.
Zeta Functions of Groups and Rings [electronic resource] / by Marcus du Sautoy, Luke Woodward. - XII, 212 p. online resource. - Lecture Notes in Mathematics, 1925 0075-8434 ; . - Lecture Notes in Mathematics, 1925 .
Nilpotent Groups: Explicit Examples -- Soluble Lie Rings -- Local Functional Equations -- Natural Boundaries I: Theory -- Natural Boundaries II: Algebraic Groups -- Natural Boundaries III: Nilpotent Groups.
Zeta functions have been a powerful tool in mathematics over the last two centuries. This book considers a new class of non-commutative zeta functions which encode the structure of the subgroup lattice in infinite groups. The book explores the analytic behaviour of these functions together with an investigation of functional equations. Many important examples of zeta functions are calculated and recorded providing an important data base of explicit examples and methods for calculation.
9783540747765
10.1007/978-3-540-74776-5 doi
Group theory.
Number theory.
Algebra.
Group Theory and Generalizations.
Number Theory.
Non-associative Rings and Algebras.
QA174-183
512.2
Zeta Functions of Groups and Rings [electronic resource] / by Marcus du Sautoy, Luke Woodward. - XII, 212 p. online resource. - Lecture Notes in Mathematics, 1925 0075-8434 ; . - Lecture Notes in Mathematics, 1925 .
Nilpotent Groups: Explicit Examples -- Soluble Lie Rings -- Local Functional Equations -- Natural Boundaries I: Theory -- Natural Boundaries II: Algebraic Groups -- Natural Boundaries III: Nilpotent Groups.
Zeta functions have been a powerful tool in mathematics over the last two centuries. This book considers a new class of non-commutative zeta functions which encode the structure of the subgroup lattice in infinite groups. The book explores the analytic behaviour of these functions together with an investigation of functional equations. Many important examples of zeta functions are calculated and recorded providing an important data base of explicit examples and methods for calculation.
9783540747765
10.1007/978-3-540-74776-5 doi
Group theory.
Number theory.
Algebra.
Group Theory and Generalizations.
Number Theory.
Non-associative Rings and Algebras.
QA174-183
512.2