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Example of Journal of Evolution Equations format Example of Journal of Evolution Equations format Example of Journal of Evolution Equations format Example of Journal of Evolution Equations format Example of Journal of Evolution Equations format Example of Journal of Evolution Equations format Example of Journal of Evolution Equations format Example of Journal of Evolution Equations format Example of Journal of Evolution Equations format Example of Journal of Evolution Equations format Example of Journal of Evolution Equations format Example of Journal of Evolution Equations format Example of Journal of Evolution Equations format Example of Journal of Evolution Equations format Example of Journal of Evolution Equations format Example of Journal of Evolution Equations format Example of Journal of Evolution Equations format Example of Journal of Evolution Equations format
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Example of Journal of Evolution Equations format Example of Journal of Evolution Equations format Example of Journal of Evolution Equations format Example of Journal of Evolution Equations format Example of Journal of Evolution Equations format Example of Journal of Evolution Equations format Example of Journal of Evolution Equations format Example of Journal of Evolution Equations format Example of Journal of Evolution Equations format Example of Journal of Evolution Equations format Example of Journal of Evolution Equations format Example of Journal of Evolution Equations format Example of Journal of Evolution Equations format Example of Journal of Evolution Equations format Example of Journal of Evolution Equations format Example of Journal of Evolution Equations format Example of Journal of Evolution Equations format Example of Journal of Evolution Equations format
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Journal of Evolution Equations — Template for authors

Publisher: Springer
Guideline source
Categories Rank Trend in last 3 yrs
Mathematics (miscellaneous) #11 of 60 up up by 1 rank
journal-quality-icon Journal quality:
High
calendar-icon Last 4 years overview: 224 Published Papers | 523 Citations
indexed-in-icon Indexed in: Scopus
last-updated-icon Last updated: 23/06/2020
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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.

1.181

Impact factor for Journal of Evolution Equations from 2016 - 2019
Year Value
2019 1.181
2018 1.181
2017 1.025
2016 1.038
graph view Graph view
table view Table view

2.3

21% from 2019

CiteRatio for Journal of Evolution Equations from 2016 - 2020
Year Value
2020 2.3
2019 1.9
2018 1.5
2017 1.8
2016 1.5
graph view Graph view
table view Table view

insights Insights

  • This journal’s impact factor is in the top 10 percentile category.

insights Insights

  • CiteRatio of this journal has increased by 21% 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.

1.255

1% from 2019

SJR for Journal of Evolution Equations from 2016 - 2020
Year Value
2020 1.255
2019 1.24
2018 0.96
2017 1.588
2016 1.356
graph view Graph view
table view Table view

1.431

32% from 2019

SNIP for Journal of Evolution Equations from 2016 - 2020
Year Value
2020 1.431
2019 1.082
2018 0.972
2017 1.472
2016 1.06
graph view Graph view
table view Table view

insights Insights

  • SJR of this journal has increased by 1% in last years.
  • This journal’s SJR is in the top 10 percentile category.

insights Insights

  • SNIP of this journal has increased by 32% in last years.
  • This journal’s SNIP is in the top 10 percentile category.

Journal of Evolution Equations

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Springer

Journal of Evolution Equations

The Journal of Evolution Equations (JEE) publishes high-quality, peer-reviewed papers on equations dealing with time dependent systems and ranging from abstract theory to concrete applications. Research articles should contain new and important results. Survey articles on rece...... Read More

Mathematics

i
Last updated on
23 Jun 2020
i
ISSN
1424-3199
i
Impact Factor
High - 1.347
i
Open Access
No
i
Sherpa RoMEO Archiving Policy
Green faq
i
Plagiarism Check
Available via Turnitin
i
Endnote Style
Download Available
i
Bibliography Name
SPBASIC
i
Citation Type
Author Year
(Blonder et al, 1982)
i
Bibliography Example
 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

Journal Article DOI: 10.1007/S00028-008-0424-1
Non-uniform stability for bounded semi-groups on Banach spaces
Charles J. K. Batty1, Thomas Duyckaerts2
St. John's College1, Cergy-Pontoise University2
27 Oct 2008 - Journal of Evolution Equations

Abstract:

Let S(t) be a bounded strongly continuous semi-group on a Banach space B and – A be its generator. We say that S(t) is semi-uniformly stable when S(t)(A + 1)−1 tends to 0 in operator norm. This notion of asymptotic stability is stronger than pointwise stability, but strictly weaker than uniform stability, and generalizes the ... Let S(t) be a bounded strongly continuous semi-group on a Banach space B and – A be its generator. We say that S(t) is semi-uniformly stable when S(t)(A + 1)−1 tends to 0 in operator norm. This notion of asymptotic stability is stronger than pointwise stability, but strictly weaker than uniform stability, and generalizes the known logarithmic, polynomial and exponential stabilities. In this note we show that if S is semi-uniformly stable then the spectrum of A does not intersect the imaginary axis. The converse is already known, but we give an estimate on the rate of decay of S(t)(A + 1)−1, linking the decay to the behaviour of the resolvent of A on the imaginary axis. This generalizes results of Lebeau and Burq (in the case of logarithmic stability) and Liu-Rao and Batkai-Engel-Pruss-Schnaubelt (in the case of polynomial stability). read more read less

Topics:

C0-semigroup (58%)58% related to the paper, Bounded operator (58%)58% related to the paper, Strictly singular operator (57%)57% related to the paper, Spectrum (functional analysis) (57%)57% related to the paper, Exponential stability (57%)57% related to the paper
282 Citations
open accessOpen access Journal Article DOI: 10.1007/PL00001378
Gagliardo-Nirenberg, composition and products in fractional Sobolev spaces
Haim Brezis1, Petru Mironescu2
Pierre-and-Marie-Curie University1, University of Paris-Sud2
01 Jan 2001 - Journal of Evolution Equations

Abstract:

Our main result is that, when $f$ is smooth and has bounded derivatives, and when $u$ belongs to the spaces $W^{s,p}$ and $W^{1,sp}$, the map $f(u)$ is in $W^{s,p}$.

Topics:

Gagliardo–Nirenberg interpolation inequality (71%)71% related to the paper, Sobolev inequality (66%)66% related to the paper, Interpolation space (64%)64% related to the paper, Sobolev space (62%)62% related to the paper, Birnbaum–Orlicz space (59%)59% related to the paper
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212 Citations
Journal Article DOI: 10.1007/S00028-006-0222-6
Carleman estimates for degenerate parabolic operators with applications to null controllability
Fatiha Alabau-Boussouira1, Piermarco Cannarsa2, Genni Fragnelli3
Centre national de la recherche scientifique1, University of Rome Tor Vergata2, University of Siena3
01 May 2006 - Journal of Evolution Equations

Abstract:

We prove an estimate of Carleman type for the one dimensional heat equation $$ u_t - \left( {a\left( x \right)u_x } \right)_x + c\left( {t,x} \right)u = h\left( {t,x} \right),\quad \left( {t,x} \right) \in \left( {0,T} \right) \times \left( {0,1} \right), $$ where a(·) is degenerate at 0. Such an estimate is derived for a spe... We prove an estimate of Carleman type for the one dimensional heat equation $$ u_t - \left( {a\left( x \right)u_x } \right)_x + c\left( {t,x} \right)u = h\left( {t,x} \right),\quad \left( {t,x} \right) \in \left( {0,T} \right) \times \left( {0,1} \right), $$ where a(·) is degenerate at 0. Such an estimate is derived for a special pseudo-convex weight function related to the degeneracy rate of a(·). Then, we study the null controllability on [0, 1] of the semilinear degenerate parabolic equation $$ u_t - \left( {a\left( x \right)u_x } \right)_x + f\left( {t,x,u} \right) = h\left( {t,x} \right)\chi _\omega \left( x \right), $$ where (t, x) ∈(0, T) × (0, 1), ω=(α, β) ⊂⊂ [0, 1], and f is locally Lipschitz with respect to u. read more read less

Topics:

Type (model theory) (59%)59% related to the paper
211 Citations
Journal Article DOI: 10.1007/S00028-002-8077-Y
The heat equation with generalized Wentzell boundary condition
Angelo Favini1, Gisèle Ruiz Goldstein2, Jerome A. Goldstein2, Silvia Romanelli3
University of Bologna1, University of Memphis2, University of Bari3
01 Mar 2002 - Journal of Evolution Equations

Abstract:

Let Ω be a bounded subset of RN, \( a \in C^1(\overline\Omega) \) with \( a>0 \) in Ω and A be the operator defined by \( Au := \nabla\cdot (a\nabla u) \) with the generalized Wentzell boundary condition.¶¶\( Au + \beta\frac{\partial u}{\partial n} + \gamma u=0\qquad \hbox{on} \quad\partial \Omega. \)¶¶If \( \partial\Omega \)... Let Ω be a bounded subset of RN, \( a \in C^1(\overline\Omega) \) with \( a>0 \) in Ω and A be the operator defined by \( Au := \nabla\cdot (a\nabla u) \) with the generalized Wentzell boundary condition.¶¶\( Au + \beta\frac{\partial u}{\partial n} + \gamma u=0\qquad \hbox{on} \quad\partial \Omega. \)¶¶If \( \partial\Omega \) is in C2, β and γ are nonnegative functions in \( C^1(\partial\Omega), \) with β > O, and \( \Gamma:=\{x\in\partial\Omega: a(x)>0\}\neq\emptyset \), then we prove the existence of a (C0) contraction semigroup generated by \( \overline{A} \), the closure of A, on a suitable Lp space, \( 1\le p $<$\infty \) and on \( C(\overline{\Omega}).\) Moreover, this semigroup is analytic if \( 1 $<$ p $<$\infty. \) read more read less
206 Citations
Book Chapter DOI: 10.1007/978-3-0348-7924-8_5
Asymptotic behaviour for the porous medium equation posed in the whole space
Juan Luis Vázquez
01 Feb 2003 - Journal of Evolution Equations

Abstract:

This paper is devoted to present a detailed account of the asymptotic behaviour as t → ∞ of the solutions u(x, t) of the equation $$ {u_{{t = }}}\Delta ({u^{m}}) $$ (0.1) with exponent m > 1, a range in which it is known as the porous medium equation written here PME for short. The study extends the well-known theor... This paper is devoted to present a detailed account of the asymptotic behaviour as t → ∞ of the solutions u(x, t) of the equation $$ {u_{{t = }}}\Delta ({u^{m}}) $$ (0.1) with exponent m > 1, a range in which it is known as the porous medium equation written here PME for short. The study extends the well-known theory of the classical heat equation (HE, the case m = 1) into a nonlinear situation, which needs a whole set of new tools. The space dimension can be any integer n ≥ 1. We will also present the extension of the results to exponents m < 1 (fast-diffusion equation, Fde). For definiteness we consider the Cauchy Problem posed in Q = ℝ n x ℝ+ with initial data $$ u(x,0) = {u_{0}}(x), x \in {\mathbb{R}^{n}} $$ (0.2) chosen in a suitable class of functions. In most of the paper we concentrate on the class X 0 of integrable and nonnegative data, $$ {u_{0}} \in {L^{1}}({\mathbb{R}^{n}}), {u_{0}} \geqslant 0, $$ (0.3) which is natural on physical grounds as the density or concentration of a diffusion process, the height of a ground-water mound, or the temperature of a hot medium (see a comment on the applications at the end). Consequently, we will deal mostly with nonnegative solutions u(x, t) ≥ 0 defined in Q. An existence and uniqueness theory exists for this problem so that for every data uo we can produce an orbit {u(·,t):t > 0} which lives in L 1 (ℝ n ) ∩ L ∞(ℝ n ) and describes the evolution of the process. The solution is not classical for m > 1, but it is proved that there exists a unique weak solution for all m > 0. read more read less
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183 Citations
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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 Journal of Evolution Equations citation style.

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After writing your paper autoformatting in Journal of Evolution Equations, you can download it in multiple formats, viz., PDF, Docx, and LaTeX.

12. Is Journal of Evolution Equations'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 Journal of Evolution Equations?

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 Journal of Evolution Equations. 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 Journal of Evolution Equations?

The 5 most common citation types in order of usage for Journal of Evolution Equations are:.

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

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