Algebras and Representation Theory
Impact Factor & Key Scientometrics

Algebras and Representation Theory
Overview

Impact Factor

0.689

H Index

31

Impact Factor

0.768

I. Basic Journal Info

Country

Netherlands
Journal ISSN: 1386923X, 15729079
Publisher: Kluwer Academic Publishers
History: 1998-ongoing
Journal Hompage: Link
How to Get Published:

Research Categories

Scope/Description:

The theory of rings, algebras and their representations has evolved to be a well-defined sub-discipline of general algebra, combining its proper methodology with that of other disciplines, thus leading to a wide variety of application fields, ranging from algebraic geometry or number theory to theoretical physics and robotics. Due to this, many papers in these domains got dispersed in the scientific literature, making it extremely difficult for researchers to keep track of recent developments. Algebras and Representation Theory aims to play a unifying role in this, presenting to its reader both up-to-date information about progress within the field of rings, algebras and their representations as well as clarifying relationships with other fields. To realize this aim Algebras and Representation Theory will publish carefully refereed papers relating, in its broadest sense, to the structure of algebras, including Lie algebras and superalgebras, rings of differential operators, group rings and algebras, C*-algebras and Hopf algebras, and and its representation theory, including topics like algebraic combinatorics, categorification and geometrization. Algebras and Representation Theory only accepts papers of a high quality covering significant and original research as well as expository survey papers written by specialists, wishing to present the `state-of-the-art' of well-defined subjects or subdomains. Occasionally, special issues on specific subjects will be published, the latter allowing specialists and non-specialists to quickly get acquainted with new developments and topics within the field of rings, algebras and their applications. In principle, for these special issues, guest editors will be invited to use their expertise to properly select invited contributors.

II. Science Citation Report (SCR)



Algebras and Representation Theory
SCR Impact Factor

Algebras and Representation Theory
SCR Journal Ranking

Algebras and Representation Theory
SCImago SJR Rank

SCImago Journal Rank (SJR indicator) is a measure of scientific influence of scholarly journals that accounts for both the number of citations received by a journal and the importance or prestige of the journals where such citations come from.

0.733

Algebras and Representation Theory
Scopus 2-Year Impact Factor Trend

Note: impact factor data for reference only

Algebras and Representation Theory
Scopus 3-Year Impact Factor Trend

Note: impact factor data for reference only

Algebras and Representation Theory
Scopus 4-Year Impact Factor Trend

Note: impact factor data for reference only

Algebras and Representation Theory
Impact Factor History

2-year 3-year 4-year
  • 2023 Impact Factor
    0.671 0.71 0.74
  • 2022 Impact Factor
    0.694 0.692 0.741
  • 2021 Impact Factor
    0.768 0.75 0.722
  • 2020 Impact Factor
    0.611 0.587 0.646
  • 2019 Impact Factor
    0.575 0.589 0.637
  • 2018 Impact Factor
    0.538 0.604 0.685
  • 2017 Impact Factor
    0.667 0.739 0.772
  • 2016 Impact Factor
    0.685 0.668 0.667
  • 2015 Impact Factor
    0.577 0.672 0.706
  • 2014 Impact Factor
    0.618 NA NA
  • 2013 Impact Factor
    0.754 NA NA
  • 2012 Impact Factor
    0.485 NA NA
  • 2011 Impact Factor
    0.534 NA NA
  • 2010 Impact Factor
    0.467 NA NA
  • 2009 Impact Factor
    0.556 NA NA
  • 2008 Impact Factor
    0.716 NA NA
  • 2007 Impact Factor
    0.575 NA NA
  • 2006 Impact Factor
    0.391 NA NA
  • 2005 Impact Factor
    0.347 NA NA
  • 2004 Impact Factor
    0.52 NA NA
  • 2003 Impact Factor
    0.667 NA NA
  • 2002 Impact Factor
    0.929 NA NA
  • 2001 Impact Factor
    0.447 NA NA
  • 2000 Impact Factor
    0.382 NA NA
Note: impact factor data for reference only

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Impact Factor

Impact factor (IF) is a scientometric factor based on the yearly average number of citations on articles published by a particular journal in the last two years. A journal impact factor is frequently used as a proxy for the relative importance of a journal within its field. Find out more: What is a good impact factor?


III. Other Science Influence Indicators

Any impact factor or scientometric indicator alone will not give you the full picture of a science journal. There are also other factors such as H-Index, Self-Citation Ratio, SJR, SNIP, etc. Researchers may also consider the practical aspect of a journal such as publication fees, acceptance rate, review speed. (Learn More)

Algebras and Representation Theory
H-Index

The h-index is an author-level metric that attempts to measure both the productivity and citation impact of the publications of a scientist or scholar. The index is based on the set of the scientist's most cited papers and the number of citations that they have received in other publications

31

Algebras and Representation Theory
H-Index History