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S.E. Han, On the classification of the digital images up to digital homotopy equivalence, Jour. Comput. Commun. Res. 10(2000) 207-216.
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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, On the simplicial complex stemmed from a digital graph, Honam Mathematical Journal 27 (1)(2005) 115-129.
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S.E. Han, S.E. Han, Equivalent ( )-covering and generalized digital lifting, Information Sciences 178(2) (2008) 550-561.
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S.E. Han, Continuities and homeomorphisms in computer topology and their applications, J. Korean Math. Soc. 45 (2008) 923-952.
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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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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.
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S.E. Han, Multiplicative property of the digital fundamental group, Acta Appli-candae Mathematicae 110(2) (2010) 921-944.
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S.E. Han, Homotopy equivalence which is suitable for studying Khalimsky nD spaces, Topology Appl. 159 (2012) 1705-1714.
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S.E. Han, Study on topological spaces with the semi- separation axiom Honam Mathematical Journal, (2013) 35(4) 707-716.
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S.E. Han, An equivalent property of a normal adjacency of a digita product Honam Mathematical Journal, (2014) 36(3) 199-215.
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S.E. Han, Generalizations of continuity of maps and homeomorphisms for studying 2D digital topological spaces and their applications, Topology Appl., online first press (2015).
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S.E. Han, Contractibility and fixed point property: The case of Khalimsky topo-logical spaces, submitted (2015).
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S.E. Han and Sik Lee, Remarks on digital products with normal adjacency rela-tions Honam Mathematical Journal, (2013) 35(3) 515-424.
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S.E. Han and B.G. Park, Digital graph ( )-isomorphism and its applications, http://atlas-conferences.com/c/a/k/b/36.htm(2003).
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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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S.E. Han, Wei Yao, Homotopies based on Marcus Wyse topology and their applications, Topology and its applications, in press.
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G. T. Herman, Oriented surfaces in digital spaces, CVGIP: Graphical Models and Image Processing 55 (1993) 381-396.
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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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E. Khalimksy, R. Kopperman, P. R. Meyer, Computer graphics and connected topologies on finite ordered sets, Topology Appl., 36(1) (1990) 1-17.
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T.Y. Kong, A digital fundamental group Computers and Graphics 13 (1989) 159-166.
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F. Wyse and D. Marcus et al., Solution to problem 5712, Amer. Math. Monthly 77(1970) 1119.
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T.Y. Kong, A. Rosenfeld, Topological Algorithms for the Digital Image Processing, Elsevier Science, Amsterdam, 1996.
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R. Malgouyres, Homotopy in 2-dimensional digital images, Theoretical Computer Science 230 (2000) 221-233.
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A. Rosenfeld, Continuous functions on digital pictures, Pattern Recognition Letters, 4 (1986) 177-184.
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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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P. Alexandroff, Diskrete Raume, Mat. Sb. 2 (1937) 501-518.
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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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