Inventiones Mathematicae
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Aims and Scope
Inventiones Mathematicae is a mathematical journal published monthly by Springer Science+Business Media. It was established in 1966 and is regarded as one of the most prestigious mathematics journals in the world. The current managing editors are Camillo De Lellis (Institute for Advanced Study, Princeton) and Jean-Benoît Bost (University of Paris-Sud). Less
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Indexed in the following public directories
Web of Science 
SJR
- PublisherSPRINGER HEIDELBERG
- LanguageMulti-Language
- FrequencyMonthly
- LanguageMulti-Language
- FrequencyMonthly
- Publication Start Year1966
- Publisher URL
- Website URL
| Months | % Papers published |
|---|---|
| 0-3 | 2% |
| 4-6 | 5% |
| 7-9 | 5% |
| >9 | 89% |
Topics Covered
Year-wise Publication
- 5Y
- 10Y
FAQs
Since when has Inventiones Mathematicae been publishing? 
The Inventiones Mathematicae has been publishing since 1966 till date.
How frequently is the Inventiones Mathematicae published?
Inventiones Mathematicae is published Monthly.
What is the H-index. SNIP score, Citescore and SJR of Inventiones Mathematicae?
Inventiones Mathematicae has a H-index score of 118, Citescore of 5.4, SNIP score of 3.99, & SJR of Q1
Who is the publisher of Inventiones Mathematicae?
The publisher of Inventiones Mathematicae is SPRINGER HEIDELBERG.
Where can I find a journal's aims and scope of Inventiones Mathematicae?
For the Inventiones Mathematicae's Aims and Scope, please refer to the section above on the page.
How can I view the journal metrics of Inventiones Mathematicae on editage?
For the Inventiones Mathematicae metrics, please refer to the section above on the page.
What is the eISSN and pISSN number of Inventiones Mathematicae?
The eISSN number is 1432-1297 and pISSN number is 0020-9910 for Inventiones Mathematicae.
What is the focus of this journal?
The journal covers a wide range of topics inlcuding Moduli space, Fundamental group, Real line, Canonical measure, Mean curvature flow, Configuration space, Unitary group, Algebraic K-theory, Uniform boundedness, Automorphism group, Mapping class group, Polynomial ring, Obstacle problem, Stability conditions, Local field, Ricci flow, Lie algebra, Brauer group, Spectral theory, Dirichlet problem.
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.