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S.E. Han, Cartesian product of the universal covering property, Acta Applicandae Mathematicae 108 (2010), 363-383.
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S.E. Han, Non-ultra regular digital covering spaces with nontrivial automorphism groups, Filomat, 27(7) (2013), 1205-1218.
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S.E. Han, KD-( , )-homotopy equivalence and its applications, Journal of Korean Mathematical Society 47(5) (2010), 1031-1054.
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S.E. Han, Multiplicative property of the digital fundamental group, Acta Applicandae Mathematicae 110(2) (2010), 921-944.
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S.E. Han, Ultra regular covering space and its automorphism group, International Journal of Applied Mathematics & Computer Science, 20(4) (2010), 699-710.
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S.E. Han and Sik Lee, Remarks on digital products with normal adjacency relations, Honam Mathematical Journal 35(3) (2013), 515-524.
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S.E. Han and B.G. Park, Digital graph ( , )-homotopy equivalence and its applications, http://atlas-conferences.com/c/a/k/b/35.htm (2003).
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G. T. Herman, Geometry of Digital Spaces Birkhauser, Boston, 1998.
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E. Khalimsky, Motion, deformation, and homotopy in finite spaces, Proceedings IEEE International Conferences on Systems, Man, and Cybernetics (1987), 227-234.
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T.Y. Kong, A. Rosenfeld, Topological Algorithms for the Digital Image Processing, Elsevier Science, Amsterdam, 1996.
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W.S. Massey, Algebraic Topology, Springer-Verlag, New York, 1977.
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B.G. Park and S.E. Han, Classification of of digital graphs vian a digital graph ( , )-isomorphism, http://atlas-conferences.com/c/a/k/b/36.htm (2003).
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A. Rosenfeld, Digital topology, Am. Math. Mon. 86 (1979), 76-87.
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A. Rosenfeld and R. Klette, Digital geometry, Information Sciences 148 (2003), 123-127 .
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E.H. Spanier, Algebraic Topology, McGraw-Hill Inc., New York, 1966.
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L. Boxer, A classical construction for the digital fundamental group, Jour. of Mathematical Imaging and Vision 10 (1999), 51-62.
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C. Berge, Graphs and Hypergraphs, 2nd ed., North-Holland, Amsterdam, 1976.
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G. Bertrand, Simple points, topological numbers and geodesic neighborhoods in cubic grids, Pattern Recognition Letters 15 (1994), 1003-1011.
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G. Bertrand and R. Malgouyres, Some topological properties of discrete surfaces, Jour. of Mathematical Imaging and Vision 20 (1999), 207-221.
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L. Boxer, Digital Products, Wedge; and Covering Spaces, Jour. of Mathematical Imaging and Vision 25 (2006), 159-171.
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L. Chen, Discrete Surfaces and Manifolds: A Theory of Digital Discrete Geometry and Topology, Scientific and Practical Computing, Rockville, 2004.
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S.E. Han, Discrete Homotopy of a Closed k-Surface LNCS 4040, Springer-Verlag, Berlin, pp.214-225 (2006).
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S.E. Han, Non-product property of the digital fundamental group, Information Sciences 171(1-3) (2005), 73-91.
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S.E. Han, Digital coverings and their applications, Jour. of Applied Mathematics and Computing 18(1-2) (2005), 487-495.
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S.E. Han, On the simplicial complex stemmed from a digital graph, Honam Mathematical Journal 27(1) (2005), 115-129 .
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S.E. Han, Erratum to "Non-product property of the digital fundamental group", Information Sciences 176(1) (2006), 215-216.
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S.E. Han, Minimal simple closed 18-surfaces and a topological preservation of 3D surfaces, Information Sciences 176(2) (2006), 120-134.
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S.E. Han, Strong k-deformation retract and its applications, Journal of the Korean Mathematical Society 44(6) (2007), 1479-1503.
과학기술학회마을
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S.E. Han, Equivalent ( , )-covering and generalized digital lifting, Information Sciences 178(2) (2008), 550-561.
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S.E. Han, The k-homotopic thinning and a torus-like digital image in , Journal of Mathematical Imaging and Vision 31(1) (2008), 1-16.
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F. Harary, Graph theory, Addison-Wesley Publishing, Reading, MA, 1969.
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L. Boxer and I. Karaca, Fundamental groups for digital products, Advances and Applications in Mathematical Sciences 11(4) (2012), 161-179.
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