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      SOME NEW RESULTS ON IRREGULARITY OF GRAPHS

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      https://www.riss.kr/link?id=A103706321

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      다국어 초록 (Multilingual Abstract)

      Suppose G is a simple graph. The irregularity of G, irr(G), is the summation of imb(e) over all edges uv = e ∊ G, where imb(e) = │deg(u) -deg(v)j│. In this paper, we investigate the behavior of this graph parameter under some old and new graph o...

      Suppose G is a simple graph. The irregularity of G, irr(G), is the summation of imb(e) over all edges uv = e ∊ G, where imb(e) = │deg(u) -deg(v)j│. In this paper, we investigate the behavior of this graph parameter under some old and new graph operations.

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      다국어 초록 (Multilingual Abstract)

      Suppose G is a simple graph. The irregularity of G, irr(G), is the summation of imb(e) over all edges uv = e ∊ G, where imb(e) = │deg(u) -deg(v)j│. In this paper, we investigate the behavior of this graph parameter under some old and new graph o...

      Suppose G is a simple graph. The irregularity of G, irr(G), is the summation of imb(e) over all edges uv = e ∊ G, where imb(e) = │deg(u) -deg(v)j│. In this paper, we investigate the behavior of this graph parameter under some old and new graph operations.
      .

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      참고문헌 (Reference)

      1 T. Doslic, "Vertex-Weighted Wiener polynomials for composite graphs" 1 : 66-80, 2008

      2 P. Hansen, "Variable neighborhood search for extremal graphs. 9. Bounding the irregularity of a graph" 69 : 253-264, 2005

      3 I. Gutman, "Variable neighborhood search for extremal graphs. 10. Comparison of irregularity indices for chemical trees" 45 : 222-230, 2005

      4 H. Abdo, "The total irregularity of graphs under graph operations"

      5 M.O. Albertson, "The irregularity of a graph" 46 : 219-225, 1997

      6 L. Barriere, "The hierarchical product of graphs" 157 : 36-48, 2009

      7 L. Barriere, "The generalized hierarchical product of graphs" 309 : 3871-3881, 2009

      8 I. Gutman, "The frist Zagreb index 30 years after" 50 : 83-92, 2004

      9 W. Yan, "The behavior of Wiener indices and polynomials of graphs under five graph decorations" 20 : 290-295, 2007

      10 M.H. Khalifeh, "The rst and second Zagreb indices of some graph operations" 157 : 804-811, 2009

      1 T. Doslic, "Vertex-Weighted Wiener polynomials for composite graphs" 1 : 66-80, 2008

      2 P. Hansen, "Variable neighborhood search for extremal graphs. 9. Bounding the irregularity of a graph" 69 : 253-264, 2005

      3 I. Gutman, "Variable neighborhood search for extremal graphs. 10. Comparison of irregularity indices for chemical trees" 45 : 222-230, 2005

      4 H. Abdo, "The total irregularity of graphs under graph operations"

      5 M.O. Albertson, "The irregularity of a graph" 46 : 219-225, 1997

      6 L. Barriere, "The hierarchical product of graphs" 157 : 36-48, 2009

      7 L. Barriere, "The generalized hierarchical product of graphs" 309 : 3871-3881, 2009

      8 I. Gutman, "The frist Zagreb index 30 years after" 50 : 83-92, 2004

      9 W. Yan, "The behavior of Wiener indices and polynomials of graphs under five graph decorations" 20 : 290-295, 2007

      10 M.H. Khalifeh, "The rst and second Zagreb indices of some graph operations" 157 : 804-811, 2009

      11 W. Luo, "On the irregularity of trees and unicyclic graphs with given matching number" 83 : 141-147, 2010

      12 M.A. Henning, "On the irregularity of bipartite graphs" 307 : 1467-1472, 2007

      13 B. Zhou, "On irregularity of graphs" 88 : 55-64, 2008

      14 G.H. Fath-Tabar, "Old and new Zagreb index" 65 : 79-84, 2011

      15 M.V. Diudea, "Molecular Topology. 25. Hyper-Wiener index of dendrimers" 32 : 71-83, 1995

      16 M. Tavakoli, "I. Gutman, Extremely irregular graphs" 37 (37): 135-139, 2013

      17 D. Stevanovic, "Hosoya polynomial of composite graphs" 235 : 237-244, 2001

      18 R. Hammack, "Handbook of Product Graphs" Taylor &Francis Group 2011

      19 I. Gutman, "Graph theory and molecular orbitals,Total π electron energy of alternant hydrocarbons" 17 : 535-538, 1972

      20 S. Hossein-Zadeh, "Extremal properties of Zagreb conindices and degree distance of graphs" 11 (11): 129-137, 2010

      21 A. Astaneh-Asl, "Computing the First and Third Zagreb Polynomials of Cartesian Product of Graphs" 2 : 73-78, 2011

      22 F. Aurenhammer, "Cartesian graph factorization at logarithmic cost per edge" 2 (2): 331-349, 1992

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      학술지 이력

      학술지 이력
      연월일 이력구분 이력상세 등재구분
      2026 평가예정 재인증평가 신청대상 (재인증)
      2020-01-01 평가 등재학술지 유지 (재인증) KCI등재
      2019-11-08 학회명변경 영문명 : The Korean Society For Computational & Applied Mathematics And Korean Sigcam -> Korean Society for Computational and Applied Mathematics KCI등재
      2017-01-01 평가 등재학술지 유지 (계속평가) KCI등재
      2013-01-01 평가 등재학술지 유지 (등재유지) KCI등재
      2010-01-01 평가 등재학술지 유지 (등재유지) KCI등재
      2008-02-18 학술지명변경 한글명 : Journal of Applied Mathematics and Infomatics(Former: Korean J. of Comput. and Appl. Math.) -> Journal of Applied Mathematics and Informatics
      외국어명 : Journal of Applied Mathematics and Infomatics(Former: Korean J. of Comput. and Appl. Math.) -> Journal of Applied Mathematics and Informatics      		 KCI등재
      2008-02-15 학술지명변경 한글명 : Journal of Applied Mathematics and Computing(Former: Korean J. of Comput. and Appl. Math.) -> Journal of Applied Mathematics and Infomatics(Former: Korean J. of Comput. and Appl. Math.)
      외국어명 : Journal of Applied Mathematics and Computing(Former: Korean J. of Comput. and Appl. Math.) -> Journal of Applied Mathematics and Infomatics(Former: Korean J. of Comput. and Appl. Math.)      		 KCI등재
      2008-01-01 평가 등재학술지 유지 (등재유지) KCI등재
      2006-01-01 평가 등재학술지 유지 (등재유지) KCI등재
      2004-01-01 평가 등재학술지 유지 (등재유지) KCI등재
      2001-01-01 평가 등재학술지 선정 (등재후보2차) KCI등재
      1998-07-01 평가 등재후보학술지 선정 (신규평가) KCI등재후보
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      학술지 인용정보

      학술지 인용정보
      기준연도 WOS-KCI 통합IF(2년) KCIF(2년) KCIF(3년)
      2016 0.16 0.16 0.13
      KCIF(4년) KCIF(5년) 중심성지수(3년) 즉시성지수
      0.1 0.07 0.312 0.02
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