This journal aims to publish high quality papers concerning any theoretical aspect of partial differential equations, as well as its applications to other areas of mathematics. Suitability of any paper is at the discretion of the editors. We seek to present the most significant advances in this central field to a wide readership which includes researchers and graduate students in mathematics and the more mathematical aspects of physics and engineering.
Publication office: Taylor & Francis, Inc., 530 Walnut Street, Suite 850, Philadelphia, PA 19106.
Journal metrics
Usage
74K annual downloads/views
Citation metrics
2.1 (2023) Impact Factor
Q1 Impact Factor Best Quartile
2.2 (2023) 5 year IF
3.6 (2023) CiteScore (Scopus)
Q1 CiteScore Best Quartile
1.584 (2023) SNIP
2.436 (2023) SJR
Speed/acceptance
33 days avg. from submission to first
decision
168 days avg. from submission to first
post-review decision
23 days avg. from acceptance to online
publication
9% acceptance rate
Understanding and using journal metrics
Journal metrics can be a useful tool for readers, as well as for authors
who are deciding where to submit their next manuscript for publication.
However, any one metric only tells a part of the story of a journal’s
quality and impact. Each metric has its limitations which means that it
should never be considered in isolation, and metrics should be used to
support and not replace qualitative review.
We strongly recommend that you always use a number of metrics, alongside
other qualitative factors such as a journal’s aims & scope, its
readership, and a review of past content published in the journal. In
addition, a single article should always be assessed on its own merits and
never based on the metrics of the journal it was published in.
Usage and acceptance rate data above are for the last full calendar year
and are updated annually in February. Speed data is updated every six
months, based on the prior six months. Citation metrics are updated
annually mid-year. Please note that some journals do not display all of
the following metrics
(find out why).
Usage:
the total number of times articles in the journal were viewed by users
of Taylor & Francis Online in the previous calendar year, rounded to the
nearest thousand.
Citation Metrics
Impact Factor*:
the average number of citations received by articles published in the
journal within a two-year window. Only journals in the Clarivate Science
Citation Index Expanded (SCIE), Social Sciences Citation Index (SSCI),
Arts and Humanities Citation Index (AHCI) and the Emerging Sources
Citation Index (ESCI) have an Impact Factor.
Impact Factor Best Quartile*:
the journal’s highest subject category ranking in the Journal Citation
Reports. Q1 = 25% of journals with the highest Impact Factors.
5 Year Impact Factor*:
the average number of citations received by articles in the journal
within a five-year window.
CiteScore (Scopus)†:
the average number of citations received by articles in the journal over
a four-year period.
CiteScore Best Quartile†:
the journal’s highest CiteScore ranking in a Scopus subject category. Q1
= 25% of journals with the highest CiteScores.
SNIP
(Source Normalized Impact per Paper):
the number of citations per paper in the journal, divided by citation
potential in the field.
SJR
(Scimago Journal Rank):
Average number of (weighted) citations in one year, divided by the
number of articles published in the journal in the previous three years.
Speed/acceptance
From submission to first decision:
the average (median) number of days for a manuscript submitted to the
journal to receive a first decision. Based on manuscripts receiving a
first decision in the last six months.
From submission to first post-review decision:
the average (median) number of days for a manuscript submitted to the
journal to receive a first decision if it is sent out for peer review.
Based on manuscripts receiving a post-review first decision in the last
six months.
From acceptance to online publication:
the average (median) number of days from acceptance of a manuscript to
online publication of the Version of Record. Based on articles published
in the last six months.
Acceptance rate:
articles accepted for publication by the journal in the previous
calendar year as percentage of all papers receiving a final decision.
P.E. Souganidis Department of Mathematics The University of Chicago Chicago, IL 60637
Editorial Board
S. Alinhac - Universite de Paris XI, Orsay, France L. Ambrosio - Scuola Normale Superiore, Pisa, Italy R. Beals - Yale University, New Haven, Connecticut J. Bedrossian- University of Maryland. College Park N. Burq - Universite de Paris-Sud, Cedex, France L. Caffarelli - University of Texas, Austin, Texas P. Cardaliague- University of Paris-Dauphine A.-L. Dalibard- Laboratoire Jacques-Louis Lions, Sorbonne University, Paris, France L. C. Evans - University of California, Berkeley, California C. Fefferman - Princeton University, Princeton, New Jersey M. Ikawa - Kyoto University, Kyoto, Japan C. LeBris- Ecole Nationale des Ponts et Chaussées, Paris, France P.-L. Lions - College de France, Paris, France R. Melrose - Massachusetts Institute of Technology, Cambridge, Massachusetts S. Muller - University of Bonn, Bonn, Germany F. Otto - Max Plank Institute, Leipzig, Germany B. Perthame - Laboratoire Jacques-Louis Lions, Sorbonne Unversity, Paris, France P. Rabinowitz - University of Wisconsin, Madison, Wisconsin J. Ralston - University of California, Los Angeles, California T. Riviere - ETH Zurich, Zurich, Germany L. Rothschild - University of California, La Jolla, California W. Schlag - University of Chicago, Chicago, Illinois D. Tataru - University of California, Berkeley, California M.E. Taylor - University of North Carolina, Chapel Hill, North Carolina K. Uhlenbeck - University of Texas, Austin, Texas V. Vicol - Courant Institute, New York, New York
Abstracting and indexing
Communications in Partial Differential Equations is abstracted and/or indexed in:
American Mathematical Society MathSciNet
De Gruyter Saur IBZ - Internationale Bibiographie der Geistes- und Sozialwissenschaftlichen Zeitschriftenliteratur Internationale Bibilographie der Rezensionen Geistes- und Sozialwissenschaftlicher Literatur
EBSCOhost (various)
Elsevier BV Scopus
Genamics JournalSeek
International Atomic Energy Agency INIS Collection Search (International Nuclear Information System)
OCLC ArticleFirst Electronic Collections Online
Personal Alert (Email)
ProQuest (various)
Springer Zentralblatt MATH (Online)
Clarivate Analytics
Current Contents Science Citation Index Expanded Web of Science
VINITI RAN Referativnyi Zhurnal
zbMATH
Open access
Communications in Partial Differential Equations is a hybrid open access journal that is part of our Open Select publishing program, giving you the option to publish open access. Publishing open access means that your article will be free to access online immediately on publication, increasing the visibility, readership, and impact of your research.
Why choose open access?
Increase the discoverability and readership of your article
Make an impact and reach new readers, not just those with easy access to a research library
Freely share your work with anyone, anywhere
Comply with funding mandates and meet the requirements of your institution, employer or funder
Rigorous peer review for every open access article
Article Publishing Charges (APC)
If you choose to publish open access in this journal you may be asked to pay an Article Publishing Charge (APC). You may be able to publish your article at no cost to yourself or with a reduced APC if your institution or research funder has an open access agreement or membership with Taylor & Francis.
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