Example of Comptes Rendus Mathematique format
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Example of Comptes Rendus Mathematique format Example of Comptes Rendus Mathematique format Example of Comptes Rendus Mathematique format Example of Comptes Rendus Mathematique format Example of Comptes Rendus Mathematique format Example of Comptes Rendus Mathematique format Example of Comptes Rendus Mathematique format Example of Comptes Rendus Mathematique format Example of Comptes Rendus Mathematique format Example of Comptes Rendus Mathematique format Example of Comptes Rendus Mathematique format Example of Comptes Rendus Mathematique format
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Example of Comptes Rendus Mathematique format Example of Comptes Rendus Mathematique format Example of Comptes Rendus Mathematique format Example of Comptes Rendus Mathematique format Example of Comptes Rendus Mathematique format Example of Comptes Rendus Mathematique format Example of Comptes Rendus Mathematique format Example of Comptes Rendus Mathematique format Example of Comptes Rendus Mathematique format Example of Comptes Rendus Mathematique format Example of Comptes Rendus Mathematique format Example of Comptes Rendus Mathematique format
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open access Open Access

Comptes Rendus Mathematique — Template for authors

Publisher: Elsevier
Categories Rank Trend in last 3 yrs
Mathematics (all) #146 of 378 up up by 2 ranks
journal-quality-icon Journal quality:
Good
calendar-icon Last 4 years overview: 598 Published Papers | 842 Citations
indexed-in-icon Indexed in: Scopus
last-updated-icon Last updated: 20/07/2020
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Journal Performance & Insights

Impact Factor

CiteRatio

Determines the importance of a journal by taking a measure of frequency with which the average article in a journal has been cited in a particular year.

A measure of average citations received per peer-reviewed paper published in the journal.

0.719

18% from 2018

Impact factor for Comptes Rendus Mathematique from 2016 - 2019
Year Value
2019 0.719
2018 0.611
2017 0.515
2016 0.396
graph view Graph view
table view Table view

1.4

8% from 2019

CiteRatio for Comptes Rendus Mathematique from 2016 - 2020
Year Value
2020 1.4
2019 1.3
2018 1.1
2017 1.1
2016 1.0
graph view Graph view
table view Table view

insights Insights

  • Impact factor of this journal has increased by 18% in last year.
  • This journal’s impact factor is in the top 10 percentile category.

insights Insights

  • CiteRatio of this journal has increased by 8% in last years.
  • This journal’s CiteRatio is in the top 10 percentile category.

SCImago Journal Rank (SJR)

Source Normalized Impact per Paper (SNIP)

Measures weighted citations received by the journal. Citation weighting depends on the categories and prestige of the citing journal.

Measures actual citations received relative to citations expected for the journal's category.

0.803

8% from 2019

SJR for Comptes Rendus Mathematique from 2016 - 2020
Year Value
2020 0.803
2019 0.869
2018 0.704
2017 0.757
2016 0.866
graph view Graph view
table view Table view

0.879

8% from 2019

SNIP for Comptes Rendus Mathematique from 2016 - 2020
Year Value
2020 0.879
2019 0.957
2018 0.769
2017 0.776
2016 0.796
graph view Graph view
table view Table view

insights Insights

  • SJR of this journal has decreased by 8% in last years.
  • This journal’s SJR is in the top 10 percentile category.

insights Insights

  • SNIP of this journal has decreased by 8% in last years.
  • This journal’s SNIP is in the top 10 percentile category.
Comptes Rendus Mathematique

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Elsevier

Comptes Rendus Mathematique

The Comptes rendus mathématique is one of the seven publications of the French Académie des sciences. Starting in 2016, this journal will be published in electronic format only. The Comptes rendus mathématique cover all fields of the discipline: Logic, Combinatorics, Number Th...... Read More

Mathematics

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Last updated on
19 Jul 2020
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ISSN
1631-073X
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Impact Factor
Medium - 0.515
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Acceptance Rate
Not provided
i
Frequency
Not provided
i
Open Access
Yes
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Sherpa RoMEO Archiving Policy
Green faq
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Plagiarism Check
Available via Turnitin
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Endnote Style
Download Available
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Bibliography Name
elsarticle-num
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Citation Type
Numbered
[25]
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Bibliography Example
G. E. Blonder, M. Tinkham, T. M. Klapwijk, Transition from metallic to tunneling regimes in superconducting microconstrictions: Excess current, charge imbalance, and supercurrent conversion, Phys. Rev. B 25 (7) (1982) 4515–4532. URL 10.1103/PhysRevB.25.4515

Top papers written in this journal

Journal Article DOI: 10.1016/J.CRMA.2008.03.014
The restricted isometry property and its implications for compressed sensing
Emmanuel J. Candès1

Abstract:

It is now well-known that one can reconstruct sparse or compressible signals accurately from a very limited number of measurements, possibly contaminated with noise. This technique known as “compressed sensing” or “compressive sampling” relies on properties of the sensing matrix such as the restricted isometry property . In t... It is now well-known that one can reconstruct sparse or compressible signals accurately from a very limited number of measurements, possibly contaminated with noise. This technique known as “compressed sensing” or “compressive sampling” relies on properties of the sensing matrix such as the restricted isometry property . In this Note, we establish new results about the accuracy of the reconstruction from undersampled measurements which improve on earlier estimates, and have the advantage of being more elegant. To cite this article: E.J. Candes, C. R. Acad. Sci. Paris, Ser. I 346 (2008). read more read less

Topics:

Restricted isometry property (66%)66% related to the paper, Compressed sensing (51%)51% related to the paper
3,117 Citations
Journal Article DOI: 10.1016/J.CRMA.2004.08.006
An ‘empirical interpolation’ method: application to efficient reduced-basis discretization of partial differential equations
Maxime Barrault, Yvon Maday1, Ngoc Cuong Nguyen2, Anthony T. Patera3

Abstract:

We present an efficient reduced-basis discretization procedure for partial differential equations with nonaffine parameter dependence. The method replaces nonaffine coefficient functions with a collateral reduced-basis expansion which then permits an (effectively affine) offline–online computational decomposition. The essenti... We present an efficient reduced-basis discretization procedure for partial differential equations with nonaffine parameter dependence. The method replaces nonaffine coefficient functions with a collateral reduced-basis expansion which then permits an (effectively affine) offline–online computational decomposition. The essential components of the approach are (i) a good collateral reduced-basis approximation space, (ii) a stable and inexpensive interpolation procedure, and (iii) an effective a posteriori estimator to quantify the newly introduced errors. Theoretical and numerical results respectively anticipate and confirm the good behavior of the technique. To cite this article: M. Barrault et al., C. R. Acad. Sci. Paris, Ser. I 339 (2004). read more read less

Topics:

Discretization (58%)58% related to the paper, Numerical analysis (56%)56% related to the paper, Interpolation (55%)55% related to the paper, Partial differential equation (53%)53% related to the paper
1,012 Citations
Journal Article DOI: 10.1016/J.CRMA.2006.09.019
Jeux à champ moyen. I – Le cas stationnaire
Jean-Michel Lasry1, Pierre-Louis Lions1, Pierre-Louis Lions2

Abstract:

Resume Nous introduisons ici une approche generale pour modeliser des jeux avec un tres grand nombre de joueurs. Plus precisement, nous considerons des equilibres de Nash a N joueurs pour des problemes stochastiques en temps long et deduisons rigoureusement les equations de type « champ moyen » quand N tend vers l'infini. Nou... Resume Nous introduisons ici une approche generale pour modeliser des jeux avec un tres grand nombre de joueurs. Plus precisement, nous considerons des equilibres de Nash a N joueurs pour des problemes stochastiques en temps long et deduisons rigoureusement les equations de type « champ moyen » quand N tend vers l'infini. Nous prouvons egalement des resultats generaux d'unicite et etablissons la limite deterministe. Pour citer cet article : J.-M. Lasry, P.-L. Lions, C. R. Acad. Sci. Paris, Ser. I 343 (2006). read more read less
629 Citations
Journal Article DOI: 10.1016/J.CRMA.2006.09.018
Jeux à champ moyen. II – Horizon fini et contrôle optimal
Jean-Michel Lasry1, Pierre-Louis Lions2, Pierre-Louis Lions1

Abstract:

We continue in this Note our study of the notion of mean field games that we introduced in a previous Note. We consider here the case of Nash equilibria for stochastic control type problems in finite horizon. We present general existence and uniqueness results for the partial differential equations systems that we introduce. ... We continue in this Note our study of the notion of mean field games that we introduced in a previous Note. We consider here the case of Nash equilibria for stochastic control type problems in finite horizon. We present general existence and uniqueness results for the partial differential equations systems that we introduce. We also give a possible interpretation of these systems in term of optimal control. To cite this article: J.-M. Lasry, P.-L. Lions, C. R. Acad. Sci. Paris, Ser. I 343 (2006). read more read less
625 Citations
Journal Article DOI: 10.1016/S1631-073X(02)02412-3
A level-set method for shape optimization
Grégoire Allaire1, François Jouve1, Anca-Maria Toader2

Abstract:

We study a level-set method for numerical shape optimization of elastic structures. Our approach combines the level-set algorithm of Osher and Sethian with the classical shape gradient. Although this method is not specifically designed for topology optimization, it can easily handle topology changes for a very large class of ... We study a level-set method for numerical shape optimization of elastic structures. Our approach combines the level-set algorithm of Osher and Sethian with the classical shape gradient. Although this method is not specifically designed for topology optimization, it can easily handle topology changes for a very large class of objective functions. Its cost is moderate since the shape is captured on a fixed Eulerian mesh. To cite this article: G. Allaire et al., C. R. Acad. Sci. Paris, Ser. I 334 (2002) 1125–1130. read more read less

Topics:

Topology optimization (70%)70% related to the paper, Shape optimization (69%)69% related to the paper, Level set method (61%)61% related to the paper, Topology (chemistry) (57%)57% related to the paper, Eulerian path (53%)53% related to the paper
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450 Citations
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Frequently asked questions

1. Can I write Comptes Rendus Mathematique in LaTeX?

Absolutely not! Our tool has been designed to help you focus on writing. You can write your entire paper as per the Comptes Rendus Mathematique guidelines and auto format it.

2. Do you follow the Comptes Rendus Mathematique guidelines?

Yes, the template is compliant with the Comptes Rendus Mathematique guidelines. Our experts at SciSpace ensure that. If there are any changes to the journal's guidelines, we'll change our algorithm accordingly.

3. Can I cite my article in multiple styles in Comptes Rendus Mathematique?

Of course! We support all the top citation styles, such as APA style, MLA style, Vancouver style, Harvard style, and Chicago style. For example, when you write your paper and hit autoformat, our system will automatically update your article as per the Comptes Rendus Mathematique citation style.

4. Can I use the Comptes Rendus Mathematique templates for free?

Sign up for our free trial, and you'll be able to use all our features for seven days. You'll see how helpful they are and how inexpensive they are compared to other options, Especially for Comptes Rendus Mathematique.

5. Can I use a manuscript in Comptes Rendus Mathematique that I have written in MS Word?

Yes. You can choose the right template, copy-paste the contents from the word document, and click on auto-format. Once you're done, you'll have a publish-ready paper Comptes Rendus Mathematique that you can download at the end.

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Of course! You can do this using our intuitive editor. It's very easy. If you need help, our support team is always ready to assist you.

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SciSpace's Comptes Rendus Mathematique is currently available as an online tool. We're developing a desktop version, too. You can request (or upvote) any features that you think would be helpful for you and other researchers in the "feature request" section of your account once you've signed up with us.

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After writing your paper autoformatting in Comptes Rendus Mathematique, you can download it in multiple formats, viz., PDF, Docx, and LaTeX.

12. Is Comptes Rendus Mathematique's impact factor high enough that I should try publishing my article there?

To be honest, the answer is no. The impact factor is one of the many elements that determine the quality of a journal. Few of these factors include review board, rejection rates, frequency of inclusion in indexes, and Eigenfactor. You need to assess all these factors before you make your final call.

13. What is Sherpa RoMEO Archiving Policy for Comptes Rendus Mathematique?

SHERPA/RoMEO Database

We extracted this data from Sherpa Romeo to help researchers understand the access level of this journal in accordance with the Sherpa Romeo Archiving Policy for Comptes Rendus Mathematique. The table below indicates the level of access a journal has as per Sherpa Romeo's archiving policy.

RoMEO Colour Archiving policy
Green Can archive pre-print and post-print or publisher's version/PDF
Blue Can archive post-print (ie final draft post-refereeing) or publisher's version/PDF
Yellow Can archive pre-print (ie pre-refereeing)
White Archiving not formally supported
FYI:
  1. Pre-prints as being the version of the paper before peer review and
  2. Post-prints as being the version of the paper after peer-review, with revisions having been made.

14. What are the most common citation types In Comptes Rendus Mathematique?

The 5 most common citation types in order of usage for Comptes Rendus Mathematique are:.

S. No. Citation Style Type
1. Author Year
2. Numbered
3. Numbered (Superscripted)
4. Author Year (Cited Pages)
5. Footnote

15. How do I submit my article to the Comptes Rendus Mathematique?

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16. Can I download Comptes Rendus Mathematique in Endnote format?

Yes, SciSpace provides this functionality. After signing up, you would need to import your existing references from Word or Bib file to SciSpace. Then SciSpace would allow you to download your references in Comptes Rendus Mathematique Endnote style according to Elsevier guidelines.

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