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This content is only for preview purposes. The original open access content can be found here.
Open Access

Collectanea Mathematica — Template for authors

Publisher: Springer
 Categories Rank Trend in last 3 yrs Mathematics (all) #121 of 378 down by 37 ranks Applied Mathematics #315 of 548 down by 106 ranks
Journal quality:
Good
Last 4 years overview: 109 Published Papers | 174 Citations
Indexed in: Scopus
Last updated: 10/07/2020
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Journal Performance & Insights

Source Normalized Impact per Paper (SNIP)

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

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.

1.6

11% from 2019

 Year Value 2020 1.6 2019 1.8 2018 1.5 2017 1.7 2016 1.4
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Table view

0.715

21% from 2019

 Year Value 2020 0.715 2019 0.593 2018 0.572 2017 0.669 2016 0.525
Graph view
Table view

1.253

7% from 2019

 Year Value 2020 1.253 2019 1.351 2018 1.042 2017 1.25 2016 0.811
Graph view
Table view

Insights

• CiteRatio of this journal has decreased by 11% in last years.
• This journal’s CiteRatio is in the top 10 percentile category.

Insights

• SJR of this journal has increased by 21% in last years.
• This journal’s SJR is in the top 10 percentile category.

Insights

• SNIP of this journal has decreased by 7% in last years.
• This journal’s SNIP is in the top 10 percentile category.

Collectanea Mathematica

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Springer

Collectanea Mathematica

Collectanea Mathematica is the oldest mathematical journal in Spain. It was founded in 1948 by José M. Orts and it aims at the publication of original research results of high quality in pure and applied mathematics. Previsoulsy self-published by the Institut de Matemàtica (IM...... Read More

Mathematics

 Last updated on 10 Jul 2020 0010-0757 High - 1.078 No Green Available via Turnitin Download Available SPBASIC Author Year (Blonder et al, 1982) Beenakker CWJ (2006) Specular andreev reflection in graphene. Phys Rev Lett 97(6):067,007, URL 10.1103/PhysRevLett.97.067007

Top papers written in this journal

Open access Journal Article
Differential equations driven by fractional Brownian motion
01 Jan 2002 - Collectanea Mathematica

Abstract:

A global existence and uniqueness result of the solution for multidimensional, time dependent, stochastic differential equations driven by a fractional Brownian motion with Hurst parameter H > 1/2 is proved. It is shown, also, that the solution has finite moments. The result is based on a deterministic existence and uniquenes... A global existence and uniqueness result of the solution for multidimensional, time dependent, stochastic differential equations driven by a fractional Brownian motion with Hurst parameter H > 1/2 is proved. It is shown, also, that the solution has finite moments. The result is based on a deterministic existence and uniqueness theorem whose proof uses a contraction principle and a priori estimates. read more read less

Topics:

Fractional Brownian motion (66%)66% related to the paper, Geometric Brownian motion (64%)64% related to the paper, Stochastic differential equation (63%)63% related to the paper, Picard–Lindelöf theorem (62%)62% related to the paper, Uniqueness (58%)58% related to the paper
View PDF
458 Citations
Open access Journal Article
Duality and reflexivity in grand Lebesgue spaces
01 Jan 2000 - Collectanea Mathematica

Abstract:

The grand $L^p$ space $L^{p)} (\Omega) (1 < p < +\infty)$ introduced by Iwaniec-Sbordone is defined as the \textit{Banach Function Space} of the measurable functions $f$ on $\Omega$ such that $$\parallel f\parallel_{p)} = \sup_{0 < \varepsilon < p-1}\bigg(\varepsilon\frac{1}{\vert\Omega\vert}\int\limits_{\Omega}\vert f\vert^... The grand L^p space L^{p)} (\Omega) (1 < p < +\infty) introduced by Iwaniec-Sbordone is defined as the \textit{Banach Function Space} of the measurable functions f on \Omega such that$$ \parallel f\parallel_{p)} = \sup_{0 < \varepsilon < p-1}\bigg(\varepsilon\frac{1}{\vert\Omega\vert}\int\limits_{\Omega}\vert f\vert^{p-\varepsilon}dx\bigg)^{1/(p-\varepsilon)} < +\infty. We introduce the \textit{small} $L^{p'}$ \textit{space} denoted by $L^{p')}(\Omega)$ and we prove that the associate space of $L^{p)}(\Omega)$ is $L^{p)'}(\Omega)$. It turns out that $L^{p)'}(\Omega)$ is a \textit{Banach Function Space} whose norm satisfy the Fatou property, and that it is the dual of the closure of $L^\infty(\Omega)$ in $L^{p)}(\Omega)$ . Moreover, we give a characterization of $L^{p)}(\Omega)$ as dual space, and we prove that for any $1 < p < +\infty$ the spaces $L^{p)}(\Omega)$ and $L^{p)'}(\Omega)$ are not reflexive. read more read less

Topics:

Measurable function (51%)51% related to the paper
194 Citations
Open access Journal Article
Castelnuovo-Mumford regularity of products of ideals
01 Jan 2003 - Collectanea Mathematica

Abstract:

The Castelnuovo-Mumford regularity reg$(M)$ is one of the most important invariants of a finitely generated graded module $M$ over a polynomial ring $R$. For instance, it measures the amount of computational resources that working with $M$ requires. In general one knows that the regularity of a module can be doubly exponentia... The Castelnuovo-Mumford regularity reg$(M)$ is one of the most important invariants of a finitely generated graded module $M$ over a polynomial ring $R$. For instance, it measures the amount of computational resources that working with $M$ requires. In general one knows that the regularity of a module can be doubly exponential in the degrees of the minimal generators and in the number of the variables. On the other hand, in many situations one has or one conjectures a much better behavior. One may ask, for instance, whether the Castelnuovo-Mumford regularity reg($IM$) of the product of an ideal $I$ with a module $M$ is bounded by the sum reg($I$) + reg($M$). In general this is not the case. But we show that it is indeed the case if either dim $R/I\leq 1$ or $I$ is generic (in a very precise sense). Further we show that products of ideals of linear forms have always a linear resolution and that the same is true for products of determinantal ideals of a generic Hankel matrix. read more read less

Topics:

Castelnuovo–Mumford regularity (58%)58% related to the paper, Ideal (set theory) (53%)53% related to the paper, Polynomial ring (52%)52% related to the paper, Graded ring (52%)52% related to the paper, Bounded function (50%)50% related to the paper
168 Citations
Open access Journal Article
K-metric and K-normed linear spaces: survey.
01 Jan 1997 - Collectanea Mathematica

Abstract:

We give a short survey on some fixed point theorems which are generalizations of the classical Banach-Caccioppoli principle of contractive mappings. All these results are gathered in three theorems about existence and uniqueness of fixed points for operators which act in $K$-metric or $K$-normed linear spaces and, in particul... We give a short survey on some fixed point theorems which are generalizations of the classical Banach-Caccioppoli principle of contractive mappings. All these results are gathered in three theorems about existence and uniqueness of fixed points for operators which act in $K$-metric or $K$-normed linear spaces and, in particular, in local convex spaces and scales of Banach spaces. Three fixed point theorems presented in this article cover numerous applications in numerical methods, theory of integral equations, some results on iterative methods for construction of periodic solution to ordinary differential equations, existence and uniqueness results on solvability for Cauchy and Goursat problems of Ovsjannikov - Treves - Nirenberg type and so on. read more read less

Topics:

Fixed-point theorem (59%)59% related to the paper, Banach space (59%)59% related to the paper, Fixed point (57%)57% related to the paper, Uniqueness (54%)54% related to the paper, Ordinary differential equation (51%)51% related to the paper
167 Citations
Open access Journal Article
Weighted inequalities for multilinear fractional integral operators
01 Jun 2009 - Collectanea Mathematica

Abstract:

A weighted theory for multilinear fractional integral operators and maximal functions is presented. Sufficient conditions for the two weight inequalities of these operators are found, including “power and logarithmic bumps” and anA ∞ condition. For one weight inequalities a necessary and sufficient condition is then obtained... A weighted theory for multilinear fractional integral operators and maximal functions is presented. Sufficient conditions for the two weight inequalities of these operators are found, including “power and logarithmic bumps” and anA ∞ condition. For one weight inequalities a necessary and sufficient condition is then obtained as a consequence of the two weight inequalities. As an application, Poincare and Sobolev inequalities adapted to the multilinear setting are presented. read more read less

Topics:

Multilinear map (62%)62% related to the paper, Fourier integral operator (59%)59% related to the paper, Operator theory (58%)58% related to the paper, Fractional calculus (55%)55% related to the paper, Sobolev inequality (54%)54% related to the paper
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147 Citations

SciSpace is a very innovative solution to the formatting problem and existing providers, such as Mendeley or Word did not really evolve in recent years.

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It automatically formats your research paper to Springer formatting guidelines and citation style.

Time taken to format a paper and Compliance with guidelines

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Using this service, researchers can compare submissions against more than 170 million scholarly articles, a database of 70+ billion current and archived web pages. How Turnitin Integration works?

Freedom from formatting guidelines

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Easy support from all your favorite tools

Collectanea Mathematica format uses SPBASIC citation style.

Automatically format and order your citations and bibliography in a click.

SciSpace allows imports from all reference managers like Mendeley, Zotero, Endnote, Google Scholar etc.

1. Can I write Collectanea Mathematica in LaTeX?

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

2. Do you follow the Collectanea Mathematica guidelines?

Yes, the template is compliant with the Collectanea Mathematica 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 Collectanea Mathematica?

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 Collectanea Mathematica citation style.

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 Collectanea Mathematica.

5. Can I use a manuscript in Collectanea Mathematica 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 Collectanea Mathematica that you can download at the end.

6. How long does it usually take you to format my papers in Collectanea Mathematica?

It only takes a matter of seconds to edit your manuscript. Besides that, our intuitive editor saves you from writing and formatting it in Collectanea Mathematica.

7. Where can I find the template for the Collectanea Mathematica?

It is possible to find the Word template for any journal on Google. However, why use a template when you can write your entire manuscript on SciSpace , auto format it as per Collectanea Mathematica's guidelines and download the same in Word, PDF and LaTeX formats? Give us a try!.

8. Can I reformat my paper to fit the Collectanea Mathematica's guidelines?

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.

9. Collectanea Mathematica an online tool or is there a desktop version?

SciSpace's Collectanea Mathematica 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.

10. I cannot find my template in your gallery. Can you create it for me like Collectanea Mathematica?

Sure. You can request any template and we'll have it setup within a few days. You can find the request box in Journal Gallery on the right side bar under the heading, "Couldn't find the format you were looking for like Collectanea Mathematica?”

11. What is the output that I would get after using Collectanea Mathematica?

After writing your paper autoformatting in Collectanea Mathematica, you can download it in multiple formats, viz., PDF, Docx, and LaTeX.

12. Is Collectanea Mathematica'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 Collectanea Mathematica?

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 Collectanea Mathematica. 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 Collectanea Mathematica?

The 5 most common citation types in order of usage for Collectanea Mathematica 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 Collectanea Mathematica?

It is possible to find the Word template for any journal on Google. However, why use a template when you can write your entire manuscript on SciSpace , auto format it as per Collectanea Mathematica's guidelines and download the same in Word, PDF and LaTeX formats? Give us a try!.

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 Collectanea Mathematica Endnote style according to Elsevier guidelines.

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Typset automatically formats your research paper to Collectanea Mathematica formatting guidelines and citation style.

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