Shintani Zeta Functions (London Mathematical Society Lecture Note Series Book 183) by Akihiko Yukie (PDF)

    8

     

    Ebook Info

    • Published: 1994
    • Number of pages:
    • Format: PDF
    • File Size: 2.95 MB
    • Authors: Akihiko Yukie

    Description

    The theory of prehomogeneous vector spaces is a relatively new subject although its origin can be traced back through the works of Siegel to Gauss. The study of the zeta functions related to prehomogeneous vector spaces can yield interesting information on the asymptotic properties of associated objects, such as field extensions and ideal classes. This is amongst the first books on this topic, and represents the author’s deep study of prehomogeneous vector spaces. Here the author’s aim is to generalise Shintani’s approach from the viewpoint of geometric invariant theory, and in some special cases he also determines not only the pole structure but also the principal part of the zeta function. This book will be of great interest to all serious workers in analytic number theory.

    User’s Reviews

    Reviews from Amazon users which were colected at the time this book was published on the website:

    Keywords

    Free Download Shintani Zeta Functions (London Mathematical Society Lecture Note Series Book 183) in PDF format
    Shintani Zeta Functions (London Mathematical Society Lecture Note Series Book 183) PDF Free Download
    Download Shintani Zeta Functions (London Mathematical Society Lecture Note Series Book 183) 1994 PDF Free
    Shintani Zeta Functions (London Mathematical Society Lecture Note Series Book 183) 1994 PDF Free Download
    Download Shintani Zeta Functions (London Mathematical Society Lecture Note Series Book 183) PDF
    Free Download Ebook Shintani Zeta Functions (London Mathematical Society Lecture Note Series Book 183)

    Previous articleHandbook of Special Functions: Derivatives, Integrals, Series and Other Formulas 1st Edition by Yury A. Brychkov (PDF)
    Next articleApplied Pseudoanalytic Function Theory (Frontiers in Mathematics) 2009th Edition by Vladislav V. Kravchenko (PDF)