About this book series

SpringerBriefs are characterized in general by their size (50–125 pages) and fast production time (2–3 months compared to 6 months for a monograph).

Briefs are available in print but are intended as a primarily electronic publication to be included in Springer's e-book package.

Typical works might include:

An extended survey of a field

A link between new research papers published in journal articles

A presentation of core concepts that doctoral students must understand in order to make independent contributions

Lecture notes making a specialist topic accessible for non-specialist readers.

SpringerBriefs in Mathematical Physics showcase, in a compact format, topics of current relevance in the field of mathematical physics. Published titles will encompass all areas of theoretical and mathematical physics. This series is intended for mathematicians, physicists, and other scientists, as well as doctoral students in related areas.

Editorial Board

Nathanaël Berestycki University of Vienna, Austria)

Mihalis Dafermos (Princeton University, US)

Atsuo Kuniba (University of Tokyo, Japan)

Matilde Marcolli (CALTECH, US)

Bruno Nachtergaele (UC Davis, US)

Hal Tasaki (Gakushuin University, Japan)

Springer Briefs in a nutshell

SpringerBriefs specifications vary depending on the title. In general, each Brief will have:

50 – 125 published pages, including all tables, figures, and references

Softcover binding

Copyright to remain in author's name

Versions in print, eBook, and MyCopy

Electronic ISSN
2197-1765
Print ISSN
2197-1757
Series Editor
  • Nathanaël Berestycki,
  • Mihalis Dafermos,
  • Atsuo Kuniba,
  • Matilde Marcolli,
  • Bruno Nachtergaele,
  • Hal Tasaki

Book titles in this series

  1. Macdonald Polynomials

    Commuting Family of q-Difference Operators and Their Joint Eigenfunctions

    Authors:
    • Masatoshi Noumi
    • Copyright: 2023

    Available Renditions

    • Soft cover
    • eBook

Abstracted and indexed in

  1. Mathematical Reviews
  2. SCImago
  3. SCOPUS
  4. zbMATH