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P. Alexandorff, Diskrete Raume, Mat. Sb. 2 (1937) 501-518.
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V. A. Chatyrko, S. E. Han, Y. Hattori, Some remarks concerning semi- spaces, Filomat, 28(1) (2014) 21-25.
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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, 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, KD- -homotopy equivalence and its applications, J. Korean Math. Soc. 47 (2010) 1031-1054.
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S.-E. Han, A digitization method of the Euclidean nD space associated with the Khalimsky adjacency structure, Computational and Applied Mathematics (2015), DOI 10.1007/s40314-015-0223-6 (in press).
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S.-E. Han, Generalilzation of continuity of maps and homeomorphism for studying 2D digital topological spaces and their applications, Topology and its applications, 196 (2015) 468-482.
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S.-E. Han, A link between the FPP for Euclidean spaces and the FPP for their Khalimsky-topologically digitized spaces (2016), submitted.
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S.-E. Han and Woo-Jik Chun, Classification of spaces in terms of both a dizitization and a Marcus-Wyse topological structure, Honam Math. J. 33(4)(2011) 575-589.
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S.-E. Han, A. Sostak, A compression of digital images derived from a Khalimsky topological structure, Computational and Applied Mathematics 32 (2013) 521-536.
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S.-E. Han and Wei Yao, An MA-Digitization of Hausdorff spaces by using a connectedness graph of the Marcus-Wyse topology, Discrete Applies Mathematics, 201 (2016) 358-371.
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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/35.htm (2003).
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J.M. Kang, S.-E. Han and K.C. Min, Digitizations associated with several types of digital topological approaches, Computational and Applied Mathematics, DOI 10.1007/s40314-015-0245-0 (in press) (2015).
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E.D. Khalimsky, Applications of connected ordered topological spaces in topology, Conference of Math. Department of Provoia, (1970).
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E. Khalimsky, R. Kopperman, P.R. Meyer, Computer graphics and connected topologies on finite ordered sets, Topology and Its Applications, 36(1) (1991) 1-17.
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T. Y. Kong, A. Rosenfeld, Topological Algorithms for the Digital Image Processing, Elsevier Science, Amsterdam, 1996.
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V. Kovalevsky, Axiomatic Digital Topology, Journal of Mathematical Imaging and Vision 26 (2006) 41-58.
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A. Rosenfeld, Digital topology, Am. Math. Mon. 86 (1979) 76-87.
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A. Rosenfeld, Continuous functions on digital pictures, Pattern Recognition Letters, 4 (1986) 177-184.
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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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