Compositio Mathematica
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Aims and Scope
Compositio Mathematica is a bimonthly peer-reviewed mathematics journal established by L.E.J. Brouwer in 1935. It is owned by the Foundation Compositio Mathematica, and published on behalf of the Foundation by Cambridge University Press. According to the Journal Citation Reports, the journal has a 2011 impact factor of 1.187, ranking it 26th out of 288 journals in the category "Mathematics". Since 2004 the journal has been published by Cambridge University Press in cooperation with the London Mathematical Society. Less
Key Metrics
Journal Specifications
- PublisherCAMBRIDGE UNIV PRESS
- LanguageMulti-Language
- FrequencyMonthly
- LanguageMulti-Language
- FrequencyMonthly
- Publication Start Year1933
- Publisher URL
- Website URL
Topics Covered
Year-wise Publication
- 5Y
- 10Y
FAQs
Since when has Compositio Mathematica been publishing? 
The Compositio Mathematica has been publishing since 1933 till date.
How frequently is the Compositio Mathematica published?
Compositio Mathematica is published Monthly.
What is the H-index. SNIP score, Citescore and SJR of Compositio Mathematica?
Compositio Mathematica has a H-index score of 58, Citescore of 3.1, SNIP score of 1.83, & SJR of Q1
Who is the publisher of Compositio Mathematica?
The publisher of Compositio Mathematica is CAMBRIDGE UNIV PRESS.
Where can I find a journal's aims and scope of Compositio Mathematica?
For the Compositio Mathematica's Aims and Scope, please refer to the section above on the page.
How can I view the journal metrics of Compositio Mathematica on editage?
For the Compositio Mathematica metrics, please refer to the section above on the page.
What is the eISSN and pISSN number of Compositio Mathematica?
The eISSN number is 1570-5846 and pISSN number is 0010-437X for Compositio Mathematica.
What is the focus of this journal?
The journal covers a wide range of topics inlcuding Monoidal category, Linear form, Finite field, Moduli space, Classical field theory, Moment map, Picard group, Mahler measure, Orbit, Spectral sequence, Braided monoidal category, Local field, Schanuel's conjecture, Evolution, De Rham cohomology, Elliptic curve, Equivalence relation, Pair of pants, Homological mirror symmetry, General linear group.
Why is it important to find the right journal for my research?
Choosing the right journal ensures that your research reaches the most relevant audience, thereby maximizing its scholarly impact and contribution to the field.
Can the choice of journal affect my academic career?
Absolutely. Publishing in reputable journals can enhance your academic profile, making you more competitive for grants, tenure, and other professional opportunities.
Is it advisable to target high-impact journals only?
While high-impact journals offer greater visibility, they are often highly competitive. It's essential to balance the journal's impact factor with the likelihood of your work being accepted.