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S.E. Han, Ultra regular covering space and its automorphism group International Journal of Applied Mathematics Computer Science, accepted.
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S.E. Han, Properties of a digital covering spaces and discrete Deck's transformation group Acta Applicandae Mathematicae, submitted
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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 digital fundamental group Computers and Graphics 13 (1989) 159-166.
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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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A. Rosenfeld, Digital topology, Am. Math. Mon. 86(1979) 76-87.
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E.H. Spanier, Algebraic Topology, McGraw-Hill Inc., New York, 1966.
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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, Comparison among digital fundamental groups and its applications. Information Sciences 178(2008) 2091-2104.
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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, Map preserving local properties of a digital image Acta Applicandae Mathematicae 104(2) (2008) 177-190-
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S.E. Han, The k-homotopic thinning and a torus-like digital image in Z", Journal of Mathematical Imaging and Vision 31 (1)(2008) 1-16.
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S.E. Han, Cartesian product of the universal covering property Acta Applicandae Mathematicae 108 (2009) 363-383.
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S.E. Han, KD-()-homotopy equivalence and its applications Journal of Korean Mathematical Society 47(5) (2010) 1031-1054.
과학기술학회마을
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S.E. Han, Regural covering space in digital covering theory and its applications. Honam Mathematical Journal 31(3) (2009) 279-292.
과학기술학회마을
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S.E. Han, Remark on a generalized universal covering space, Honam Mathematical Jour 31(3) (2009) 267-278.
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S.E. Han, Existence problem of a generalized universal covering space, Acta Applicandae Mathematicae 109(3) (2010) 805-827.
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R. Ayala, E. Dominguez, A.R. Frances, and A. Quintero, Homotopy in digital spaces, Discrete Applied Math, 125(1) (2003) 3-24.
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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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L. Boxer, Digital Products, Wedge; and Covering Spaces, Jour. of Mathematical Imaging and Vision 25(2006) 159-171.
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S.E. Han, Algorithm for discriminating digital images w.r.t. a digital ()-homeomorphism, Jour. of Applied Mathematics and Computing 18(1-2)(2005) 505-512.
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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, Digital coverings and their applications, Jour. of Applied Mathematics and Computing 18(1-2)(2005) 487-495.
과학기술학회마을
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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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ScienceOn
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S.E. Han, On the simplicial complex stemmed from a digital graph, Honam Mathematical Journal 27 (1)(2005) 115-129.
과학기술학회마을
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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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