Antineighbourhood graphs

Topp, Jerzy; Volkmann, Lutz

About DML-CZ | FAQ | Conditions of Use | Math Archives | Contact Us

Previous | Up | Next

Article

Topp, Jerzy ; Volkmann, Lutz

Antineighbourhood graphs. (English). Mathematica Slovaca, vol. 42 (1992), issue 2, pp. 153-171

MSC: 05C75 | MR 1170100 | Zbl 0759.05084

Full entry |

PDF (1.9 MB) Feedback

Similar articles:

References:

[1] BEINEKE L. W.: Characterizations of derived graphs. J. Combin. Theory 9 (1970), 129-135. MR 0262097 | Zbl 0202.55702

[2] BIELAK H.: On j-neighbourhoods in simple graphs. In: Graphs and Other Combinatorial Topics, vol. 59, Teubneг-Texte zur Mathematik, 1983, pp. 7-11. MR 0737008 | Zbl 0536.05058

[3] BIELAK H.: On graphs with non-isomorphic 2-neighbourhoods. Časopis Pěst. Mat. 108 (1983), 294-298. MR 0716415 | Zbl 0526.05056

[4] BLASS A., HARARY F., MILLER Z.: Which trees are link graphs. J. Combin. Theory B 29 (1980), 277-292. MR 0602420 | Zbl 0448.05028

[5] BLOKHUIS A., BROUWER A. E., BUSET D., COHEN A. M.: The locally icosahedral graphs. Lecture Notes in Pure and Appl. Math., vol. 103, 1985, pp. 19-22. MR 0826792 | Zbl 0587.05059

[6] BOESCH F., TINDELL R.: Circulants and their connectivities. J. Graph Theory 8 (1984), 487-499. MR 0766498 | Zbl 0549.05048

[7] BROWN M., CONNELLY R.: On graphs with a constant link. I. In: New Directions in the Theoгy of Gгaphs, Academic Press, 1973, pp. 19-51.. MR 0347685

[8] BROWN M., CONNELLY R.: On graphs with a constant link. II. Discrete Math. 11 (1975), 199-232. MR 0364016 | Zbl 0304.05102

[9] BULITKO V. K.: On graphs with given vertex-neighbourhoods. Trudy Mat. Inst. Steklov. 133 (1973), 78-94. MR 0434882

[10] BURNS D., KAPOOR S. F., OSTRAND P. A.: On line-symmetric graphs. Fund. Math. 122 (1984), 1-21. MR 0753009 | Zbl 0547.05053

[11] BUSET D.: Graphs which are locally a cube. Discrete Math. 46 (1983), 221-226. MR 0716442 | Zbl 0532.05050

[12] CHILTON B. L., GOULD R., POLIMENI A. D.: A note on graphs whose neighborhoods are n-cycles. Geom. Dedicata 3 (1974), 289-294. MR 0357220 | Zbl 0325.05116

[13] CRUYCE, VANDENP.: A fìnite graph which is locally a dodecahedron. Discrete Math. 54 (1985), 343-346. MR 0790596 | Zbl 0571.05047

[14] DOYEN J., HUBAUT X., REYNART M.: Finite graphs with isomorphic neighbourhoods. In: Problèmes Combinaíoires et Théorie des Graphes (Colloq. Orsay 1976), CNRS, Paris, 1978, p. 111.

[15] GODSIL C. D.: Neighbourhoods of transitive graphs and GRR's. J. Combiп. Theory B 29 (1980), 116-140. MR 0584165 | Zbl 0443.05047

[16] GODSIL C. D., MCKAY B. D.: Graphs with regular neighbourhoods. Lecture Notes in Math. 829, 1980, pp. 127-140.. MR 0611188 | Zbl 0453.05052

[17] HALL J. I.: Locally Petersen graphs. J. Graph Theoгy 4 (1980), 173-187. MR 0570352 | Zbl 0407.05041

[18] HALL J. I.: Graphs with constant link and small degree or order. J. Graph Theory 8 (1985), 419-444. MR 0812408 | Zbl 0582.05049

[19] HARARY F.: Graph Theory. Addison-Wesley, Reading, Mass., 1969. MR 0256911 | Zbl 0196.27202

[20] HARARY F. PALMER E.: A note on similar points and similar lines of a graph. Rev. Roumaine Math. Pures Appl. 10 (1965), 1489-1492. MR 0197346

[21] HELL P.: Graphs with given neighbourhoods I. In: Problèmes Combinatoires et Théorie des Graphes (Colloq. Orsay 1976), ONRS, Paris, 1978, pp. 219-223. MR 0539979

[22] HELL P., LEVINSON H. WATKINS M.: Some remarks on transitive realizations of graphs. In: Proc. 2nd Carrib. Conf. on Combinatorics and Computing, Barbados, 1977, pp. 1-8.

[23] MOKAY B. D.: Transitive graphs with fewer than twenty vertices. Math. Comp. 33 (1977), 1101-1121. MR 0528064

[24] RYJÀČEK Z.: On graphs with isomorphic, nonisomorphic and connected N2 -neighbourhoods. Časopis Pěst. Mat. 112 (1987), 66-79. MR 0880933

[25] RYJÁČEK Z.: Graphs with nonisomorphic vertex neighbourhoods of the first and second types. Časopis Pӗst. Mat. 112 (1987), 390-394. MR 0921329

[26] SEDLÁČEK J.: On local properties of finite graphs. Časopis Pěst. Mat. 106 (1981), 290-298. MR 0629727

[27] SEDLÁČEK J.: On local properties of finite graphs. Lecture Notes in Math. 1018, 1983, pp. 242-247. MR 0730654 | Zbl 0531.05056

[28] SEDLÁČEK J.: Finite graphs with distinct neighbourhoods. Teubner-Texte Math. 73 (1985), 152-156. MR 0869457

[29] TURNER J.: Point-symmetric graphs with a prime number of points. J. Combin. Theory 3 (1967), 136-145. MR 0211908 | Zbl 0161.20803

[30] VOGLER W.: Graphs with given group and given constant link. J. Graph Theoгy 8 (1984), 111-115. MR 0732024 | Zbl 0534.05035

[31] VOGLER W.: Representing groups by graphs with constant link and hypergraphs. J. Graph Theory 10 (1986), 461-475. MR 0867211 | Zbl 0632.05034

[32] WINKLER P. M.: Existence of graphs wiгth a given set of r-neighbourhoods. J. Combin. Theory Ser. B 34 (1983), 165-176. MR 0703601

[33] YAP H. P.: Some Topics in Graph Theory. London Mathematical Society, Lecture Note Series 108, Cambridge University Press, Cambridge, 1986. MR 0866145 | Zbl 0588.05002

[34] ZELINKA B.: Graphs with prescribed neighbourhood graphs. Math. Slovaca 35 (1985), 195-197. MR 0795015 | Zbl 0579.05045

[35] ZELINKA B.: Edge neighbourhood graphs. Czech. Math. J. 36 (111) (1986), 44-47. MR 0822865 | Zbl 0599.05054

[36] ZELINKA B.: Disconnected neighbourhood graphs. Math. Slovaca 36 (1986), 109-110. MR 0849700 | Zbl 0603.05039

[37] ZYKOV A. A.: Problem 30. In: Theory of Graphs and its Applications, Academia, Prague, 1964, pp. 164-165.

Browse
- Collections
- Titles
- Authors
- MSC

About DML-CZ

Partner of

Article

Search

Browse