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Journal of Combinatorial Designs — Template for authors

Publisher: Wiley

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Guideline source

Categories	Rank	Trend in last 3 yrs
Discrete Mathematics and Combinatorics	#35 of 85	down by 9 ranks

Journal quality:

Good

Last 4 years overview: 166 Published Papers | 237 Citations

Indexed in: Scopus

Last updated: 18/06/2020

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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.

0.731

13% from 2018

Impact factor for Journal of Combinatorial Designs from 2016 - 2019
Year	Value
2019	0.731
2018	0.844
2017	0.647
2016	0.701

Graph view

1.4

CiteRatio for Journal of Combinatorial Designs from 2016 - 2020
Year	Value
2020	1.4
2019	1.4
2018	1.5
2017	1.4
2016	1.6

Graph view

Insights

Impact factor of this journal has decreased by 13% in last year.
This journal’s impact factor is in the top 10 percentile category.

Insights

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.

0.618

20% from 2019

SJR for Journal of Combinatorial Designs from 2016 - 2020
Year	Value
2020	0.618
2019	0.776
2018	1.026
2017	0.76
2016	0.821

Graph view

1.174

9% from 2019

SNIP for Journal of Combinatorial Designs from 2016 - 2020
Year	Value
2020	1.174
2019	1.294
2018	1.483
2017	1.125
2016	2.017

Graph view

Insights

SJR of this journal has decreased by 20% in last years.
This journal’s SJR is in the top 10 percentile category.

Insights

SNIP of this journal has decreased by 9% in last years.
This journal’s SNIP is in the top 10 percentile category.

Guideline source: View

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Wiley

Journal of Combinatorial Designs

The Journal of Combinatorial Designs is an international journal devoted to the timely publication of the most influential papers in the area of combinatorial design theory. All topics in design theory, and in which design theory has important applications, are covered, including: • block designs, t-designs, pairwise balanced designs and group divisible designs • Latin squares, quasigroups, and related algebras • computational methods in design theory • construction methods • applications in computer science, experimental design theory, and coding theory • graph decompositions, factorizations, and design-theoretic techniques in graph theory and extremal combinatorics • finite geometry and its relation with design theory. • algebraic aspects of design theory. Researchers and scientists can depend on the Journal of Combinatorial Designs for the most recent developments in this rapidly growing field, and to provide a forum for both theoretical research and applications. All papers appearing in the Journal of Combinatorial Designs are carefully peer refereed. A subscription to the Journal of Graph Theory includes a subscription to the Journal of Combinatorial Designs . Read Less

Mathematics

Last updated on	17 Jun 2020
ISSN	1063-8539
Impact Factor	High - 1.298
Open Access	Yes
Sherpa RoMEO Archiving Policy	Yellow
Plagiarism Check	Available via Turnitin
Endnote Style	Download Available
Bibliography Name	apa
Citation Type	Numbered [25]
Bibliography Example	Beenakker, C.W.J. (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: 10.1002/JCD.1027 •

Cycle decompositions III: Complete graphs and fixed length cycles

Mateja Šajna¹ •

01 Jan 2002 - Journal of Combinatorial Designs

Abstract:

We show that the necessary conditions for the decomposition of the complete graph of odd order into cycles of a fixed even length and for the decomposition of the complete graph of even order minus a 1-factor into cycles of a fixed odd length are also sufficient. © 2002 John Wiley & Sons, Inc. J Combin Designs 10: 27–78, 2002 We show that the necessary conditions for the decomposition of the complete graph of odd order into cycles of a fixed even length and for the decomposition of the complete graph of even order minus a 1-factor into cycles of a fixed odd length are also sufficient. © 2002 John Wiley & Sons, Inc. J Combin Designs 10: 27–78, 2002 read more

Topics:

Cycle decomposition (69%)69% related to the paper, Odd graph (61%)61% related to the paper, Pancyclic graph (60%)60% related to the paper,

196 Citations

Open access • Journal Article • DOI: 10.1002/JCD.20105 •

Small latin squares, quasigroups, and loops

Brendan D. McKay¹, Alison M. Meynert², •

01 Mar 2007 - Journal of Combinatorial Designs

Abstract:

We present the numbers of isotopy classes and main classes of Latin squares, and the numbers of isomorphism classes of quasigroups and loops, up to order 10. The best previous results were for Latin squares of order 8 (Kolesova, Lam, and Thiel, 1990), quasigroups of order 6 (Bower, 2000), and loops of order 7 (Brant and Mulle... We present the numbers of isotopy classes and main classes of Latin squares, and the numbers of isomorphism classes of quasigroups and loops, up to order 10. The best previous results were for Latin squares of order 8 (Kolesova, Lam, and Thiel, 1990), quasigroups of order 6 (Bower, 2000), and loops of order 7 (Brant and Mullen, 1985). The loops of order 8 have been independently found by “QSCGZ” and Guerin (unpublished, 2001). We also report on the most extensive search so far for a triple of mutually orthogonal Latin squares (MOLS) of order 10. Our computations show that any such triple must have only squares with trivial symmetry groups. © 2006 Wiley Periodicals, Inc. J Combin Designs read more

Topics:

Latin square property (60%)60% related to the paper, Quasigroup (58%)58% related to the paper, Graeco-Latin square (55%)55% related to the paper,

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170 Citations

Journal Article • DOI: 10.1002/JCD.20043 •

A Hadamard matrix of order 428

Hadi Kharaghani¹, Behruz Tayfeh-Rezaie •

01 Nov 2005 - Journal of Combinatorial Designs

Abstract:

Four Turyn type sequences of lengths 36, 36, 36, 35 are found by a computer search. These sequences give new base sequences of lengths 71, 71, 36, 36 and are used to generate a number of new T-sequences. The first order of many new Hadamard matrices constructible using these new T-sequences is 428. © 2004 Wiley Periodicals, Inc. Four Turyn type sequences of lengths 36, 36, 36, 35 are found by a computer search. These sequences give new base sequences of lengths 71, 71, 36, 36 and are used to generate a number of new T-sequences. The first order of many new Hadamard matrices constructible using these new T-sequences is 428. © 2004 Wiley Periodicals, Inc. read more

Topics:

Complex Hadamard matrix (66%)66% related to the paper, Hadamard matrix (66%)66% related to the paper, Complementary sequences (63%)63% related to the paper,

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160 Citations

Journal Article • DOI: 10.1002/(SICI)1520-6610(1996)4:6<405::AID-JCD3>3.0.CO;2-J •

Generating uniformly distributed random latin squares

Mark T. Jacobson¹, Peter Matthews² •

01 Jan 1996 - Journal of Combinatorial Designs

Abstract:

By simulating an ergodic Markov chain whose stationary distribution is uniform over the space of n × n Latin squares, we can obtain squares that are (approximately) uniformly distributed; we offer two such chains. The central issue is the construction of “moves” that connect the squares. Our first approach uses the fact that ... By simulating an ergodic Markov chain whose stationary distribution is uniform over the space of n × n Latin squares, we can obtain squares that are (approximately) uniformly distributed; we offer two such chains. The central issue is the construction of “moves” that connect the squares. Our first approach uses the fact that an n × n Latin square is equivalent to an n × n × n contingency table in which each line sum equals 1. We relax the nonnegativity condition on the table's cells, allowing “improper” tables that have a single—1-cell. A simple set of moves connects this expanded space of tables [the diameter of the associated graph is bounded by 2(n − 1)3], and suggests a Markov chain whose subchain of proper tables has the desired uniform stationary distribution (with an average of approximately n steps between proper tables). By grouping these moves appropriately, we derive a class of moves that stay within the space of proper Latin squares [with graph diameter bounded by 4(n − 1)2]; these may also be used to form a suitable Markov chain. © 1996 John Wiley & Sons, Inc. read more

Topics:

Markov chain (54%)54% related to the paper, Bounded function (51%)51% related to the paper, Stationary distribution (51%)51% related to the paper

155 Citations

Open access • Journal Article • DOI: 10.1002/JCD.3180010106 •

Covering arrays and intersecting codes

Neil J. A. Sloane¹ •

01 Jan 1993 - Journal of Combinatorial Designs

Abstract:

A t-covering array is a set of k binary vectors of length n with the property that, in any t coordinate positions, all 2t possibilities occur at least once. Such arrays are used for example in circuit testing, and one wishes to minimize k for given values of n and t. The case t = 2 was solved by Renyi, Katona, and Kleitman an... A t-covering array is a set of k binary vectors of length n with the property that, in any t coordinate positions, all 2t possibilities occur at least once. Such arrays are used for example in circuit testing, and one wishes to minimize k for given values of n and t. The case t = 2 was solved by Renyi, Katona, and Kleitman and Spencer. The present article is concerned with the case t = 3, where important (but unpublished) contributions were made by Busschbach and Roux in the 1980s. One of the principal constructions makes use of intersecting codes (linear codes with the property that any two nonzero codewords meet). This article studies the properties of 3-covering arrays and intersecting codes, and gives a table of the best 3-covering arrays presently known. For large n the minimal k satisfies 3.21256 < k/log n < 7.56444. © 1993 John Wiley & Sons, Inc. read more

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154 Citations

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13. What is Sherpa RoMEO Archiving Policy for Journal of Combinatorial Designs?

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 Combinatorial Designs. 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:

Pre-prints as being the version of the paper before peer review and
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 Combinatorial Designs?

The 5 most common citation types in order of usage for Journal of Combinatorial Designs 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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Journal of Combinatorial Designs — Template for authors

Related Journals

Journal Performance & Insights

Impact Factor

CiteRatio

0.731

1.4

Insights

Insights

SCImago Journal Rank (SJR)

Source Normalized Impact per Paper (SNIP)

0.618

1.174

Insights

Insights

Journal of Combinatorial Designs

Top papers written in this journal

Abstract:

Topics:

Abstract:

Topics:

Abstract:

Topics:

Abstract:

Topics:

Abstract:

What to expect from SciSpace?

Speed and accuracy over MS Word

Plagiarism Reports via Turnitin

Freedom from formatting guidelines

Easy support from all your favorite tools

Frequently asked questions

Fast and reliable, built for complaince.

No word template required

Verifed journal formats

Trusted by academicians

Fast and reliable,
built for complaince.