Example of Journal of Inverse and Ill-posed Problems format
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Example of Journal of Inverse and Ill-posed Problems format Example of Journal of Inverse and Ill-posed Problems format Example of Journal of Inverse and Ill-posed Problems format Example of Journal of Inverse and Ill-posed Problems format Example of Journal of Inverse and Ill-posed Problems format Example of Journal of Inverse and Ill-posed Problems format Example of Journal of Inverse and Ill-posed Problems format Example of Journal of Inverse and Ill-posed Problems format
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Example of Journal of Inverse and Ill-posed Problems format Example of Journal of Inverse and Ill-posed Problems format Example of Journal of Inverse and Ill-posed Problems format Example of Journal of Inverse and Ill-posed Problems format Example of Journal of Inverse and Ill-posed Problems format Example of Journal of Inverse and Ill-posed Problems format Example of Journal of Inverse and Ill-posed Problems format Example of Journal of Inverse and Ill-posed Problems format
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open access Open Access ISSN: 9280219 e-ISSN: 15693945

Journal of Inverse and Ill-posed Problems — Template for authors

Publisher: De Gruyter
Categories Rank Trend in last 3 yrs
Applied Mathematics #252 of 548 down down by 4 ranks
journal-quality-icon Journal quality:
Good
calendar-icon Last 4 years overview: 208 Published Papers | 420 Citations
indexed-in-icon Indexed in: Scopus
last-updated-icon Last updated: 21/06/2020
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FAQ

Journal Performance & Insights

  • Impact Factor
  • CiteRatio
  • SJR
  • SNIP

Impact factor 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.

0.926

5% from 2018

Impact factor for Journal of Inverse and Ill-posed Problems from 2016 - 2019
Year Value
2019 0.926
2018 0.881
2017 0.941
2016 0.783
graph view Graph view
table view Table view

insights Insights

  • Impact factor of this journal has increased by 5% in last year.
  • This journal’s impact factor is in the top 10 percentile category.

CiteRatio is a measure of average citations received per peer-reviewed paper published in the journal.

2.0

18% from 2019

CiteRatio for Journal of Inverse and Ill-posed Problems from 2016 - 2020
Year Value
2020 2.0
2019 1.7
2018 1.6
2017 1.4
2016 1.4
graph view Graph view
table view Table view

insights Insights

  • CiteRatio of this journal has increased by 18% in last years.
  • This journal’s CiteRatio is in the top 10 percentile category.

SCImago Journal Rank (SJR) measures weighted citations received by the journal. Citation weighting depends on the categories and prestige of the citing journal.

0.498

1% from 2019

SJR for Journal of Inverse and Ill-posed Problems from 2016 - 2020
Year Value
2020 0.498
2019 0.501
2018 0.43
2017 0.461
2016 0.626
graph view Graph view
table view Table view

insights Insights

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

Source Normalized Impact per Paper (SNIP) measures actual citations received relative to citations expected for the journal's category.

1.225

6% from 2019

SNIP for Journal of Inverse and Ill-posed Problems from 2016 - 2020
Year Value
2020 1.225
2019 1.158
2018 0.979
2017 1.038
2016 1.167
graph view Graph view
table view Table view

insights Insights

  • SNIP of this journal has increased by 6% in last years.
  • This journal’s SNIP is in the top 10 percentile category.

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Journal of Inverse and Ill-posed Problems

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De Gruyter

Journal of Inverse and Ill-posed Problems

This journal aims to present original articles on the theory, numerics and applications of inverse and ill-posed problems. These inverse and ill-posed problems arise in mathematical physics and mathematical analysis, geophysics, acoustics, electrodynamics, tomography, medicine...... Read More

Mathematics

i
Last updated on
21 Jun 2020
i
ISSN
0928-0219
i
Impact Factor
High - 1.251
i
Open Access
No
i
Sherpa RoMEO Archiving Policy
Yellow faq
i
Plagiarism Check
Available via Turnitin
i
Endnote Style
Download Available
i
Bibliography Name
unsrt
i
Citation Type
Numbered
[25]
i
Bibliography Example
C. W. J. Beenakker. Specular andreev reflection in graphene. Phys. Rev. Lett., 97(6):067007, 2006.

Top papers written in this journal

Journal Article DOI: 10.1515/JIIP.2008.002
Recovering a potential from Cauchy data in the two-dimensional case

Abstract:

In this paper we prove that the Cauchy data for the Schrödinger equation in the two-dimensional case determines a potential from Lp (for p > 2) uniquely. We also obtain a linear inversion formula for smooth potentials. In this paper we prove that the Cauchy data for the Schrödinger equation in the two-dimensional case determines a potential from Lp (for p > 2) uniquely. We also obtain a linear inversion formula for smooth potentials. read more read less

Topics:

Cauchy distribution (58%)58% related to the paper, Riemann–Hilbert problem (54%)54% related to the paper
288 Citations
Journal Article DOI: 10.1515/JIIP.2008.019
Definitions and examples of inverse and ill-posed problems

Abstract:

Abstract The terms “inverse problems” and “ill-posed problems” have been steadily and surely gaining popularity in modern science since the middle of the 20th century. A little more than fifty years of studying problems of this kind have shown that a great number of problems from various branches of classical mathematics (com... Abstract The terms “inverse problems” and “ill-posed problems” have been steadily and surely gaining popularity in modern science since the middle of the 20th century. A little more than fifty years of studying problems of this kind have shown that a great number of problems from various branches of classical mathematics (computational algebra, differential and integral equations, partial differential equations, functional analysis) can be classified as inverse or ill-posed, and they are among the most complicated ones (since they are unstable and usually nonlinear). At the same time, inverse and ill-posed problems began to be studied and applied systematically in physics, geophysics, medicine, astronomy, and all other areas of knowledge where mathematical methods are used. The reason is that solutions to inverse problems describe important properties of media under study, such as density and velocity of wave propagation, elasticity parameters, conductivity, dielectric permittivity and magnetic permeability, and properties and location of inhomogeneities in inaccessible areas, etc. In this paper we consider definitions and classification of inverse and ill-posed problems and describe some approaches which have been proposed by outstanding Russian mathematicians A. N. Tikhonov, V. K. Ivanov and M. M. Lavrentiev. read more read less

Topics:

Regularization (mathematics) (52%)52% related to the paper, Well-posed problem (51%)51% related to the paper
261 Citations
open accessOpen access Journal Article DOI: 10.1515/JIP-2012-0072
Carleman estimates for global uniqueness, stability and numerical methods for coefficient inverse problems

Abstract:

This is a review paper of the role of Carleman estimates in the theory of Multidimensional Coefficient Inverse Problems since the first inception of this idea in 1981.

Topics:

Uniqueness (54%)54% related to the paper, Inverse problem (52%)52% related to the paper
156 Citations
Journal Article DOI: 10.1515/JIIP.2000.8.4.367
Reconstruction of the support function for inclusion from boundary measurements

Abstract:

Abstract - First we give a formula (procedure) for the reconstruction of the support function for unknown inclusion by means of the Dirichlet to Neumann map. In the procedure we never make use of the unique continuation property or the Runge approximation property of the governing equation. Second we apply the method to a sim... Abstract - First we give a formula (procedure) for the reconstruction of the support function for unknown inclusion by means of the Dirichlet to Neumann map. In the procedure we never make use of the unique continuation property or the Runge approximation property of the governing equation. Second we apply the method to a similar problem for the Helmholtz equation. read more read less

Topics:

Boundary (topology) (51%)51% related to the paper
141 Citations
open accessOpen access Journal Article DOI: 10.1515/JIIP.2008.025
Convergence rates and source conditions for Tikhonov regularization with sparsity constraints

Abstract:

This paper addresses the regularization by sparsity constraints by means of weighted $\ell^p$ penalties for $0\leq p\leq 2$. For $1\leq p\leq 2$ special attention is payed to convergence rates in norm and to source conditions. As main result it is proven that one gets a convergence rate in norm of $\sqrt{\delta}$ for $1\leq p... This paper addresses the regularization by sparsity constraints by means of weighted $\ell^p$ penalties for $0\leq p\leq 2$. For $1\leq p\leq 2$ special attention is payed to convergence rates in norm and to source conditions. As main result it is proven that one gets a convergence rate in norm of $\sqrt{\delta}$ for $1\leq p\leq 2$ as soon as the unknown solution is sparse. The case $p=1$ needs a special technique where not only Bregman distances but also a so-called Bregman-Taylor distance has to be employed. For $p<1$ only preliminary results are shown. These results indicate that, different from $p\geq 1$, the regularizing properties depend on the interplay of the operator and the basis of sparsity. A counterexample for $p=0$ shows that regularization need not to happen. read more read less

Topics:

Regularization (mathematics) (58%)58% related to the paper, Tikhonov regularization (52%)52% related to the paper
139 Citations
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Journal of Inverse and Ill-posed Problems format uses unsrt citation style.

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One little Google search can get you the Word template for any journal. However, why do you need a Word template when you can write your entire manuscript on SciSpace, autoformat it as per Journal of Inverse and Ill-posed Problems's guidelines and download the same in Word, PDF and LaTeX formats? Try us out!.

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SciSpace is an online tool for now. We'll soon release a desktop version. You can also request (or upvote) any feature that you think might be helpful for you and the research community in the feature request section once you sign-up with us.

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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 those factors the review board, rejection rates, frequency of inclusion in indexes, Eigenfactor, etc. You must assess all the factors and then take the final call.

SHERPA/RoMEO Database

We have extracted this data from Sherpa Romeo to help our researchers understand the access level of this journal. The following table indicates the level of access a journal has as per Sherpa Romeo 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.

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After signing up, you would need to import your existing references from Word or .bib file.

SciSpace would allow download of your references in Journal of Inverse and Ill-posed Problems Endnote style, according to de-gruyter guidelines.

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