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Sang-Eon Han (2006)
Erratum to "Non-product property of the digital fundamental group" [Informat. Sci. 171(1-3) (2005) 73-91]Inf. Sci., 176
Sang-Eon Han (2008)
Equivalent (k0, k1)-covering and generalized digital liftingInf. Sci., 178
Sang-Eon Han (2005)
Non-product property of the digital fundamental groupInf. Sci., 171
A. Rosenfeld (1979)
Digital topologyAm. Math. Mon., 86
S.E. Han (2006)
Erratum to “Non-product property of the digital fundamental group”Inf. Sci., 176
S.E. Han (2008)
Continuities and homeomorphisms in computer topologyJ. Korean Math. Soc., 45
Sang-Eon Han (2007)
The k-fundamental group of a closed k-surfaceInf. Sci., 177
Sang-Eon Han, D. Georgiou (2009)
ON COMPUTER TOPOLOGICAL FUNCTION SPACEJournal of Korean Medical Science, 46
S.E. Han (2007)
Strong k-deformation retract and its applicationsJ. Korean Math. Soc., 44
Sang-Eon Han (2006)
Connected sum of digital closed surfacesInf. Sci., 176
Stefan Friedl (2020)
Algebraic topologyGraduate Studies in Mathematics
Sang-Eon Han (2008)
Comparison among digital fundamental groups and its applicationsInf. Sci., 178
G. Herman (1993)
Oriented Surfaces in Digital SpacesCVGIP Graph. Model. Image Process., 55
Sang-Eon Han (2003)
Computer Topology and Its Applications, 25
Sang-Eon Han (2005)
DIGITAL COVERINGS AND THEIR APPLICATIONS
Laurence Boxer (2004)
A Classical Construction for the Digital Fundamental GroupJournal of Mathematical Imaging and Vision, 10
Sang-Eon Han (2007)
STRONG k-DEFORMATION RETRACT AND ITS APPLICATIONSJournal of Korean Medical Science, 44
Sang-Eon Han (2008)
Map Preserving Local Properties of a Digital ImageActa Applicandae Mathematicae, 104
Sang-Eon Han (2008)
CONTINUITIES AND HOMEOMORPHISMS IN COMPUTER TOPOLOGY AND THEIR APPLICATIONSJournal of The Korean Mathematical Society, 45
Laurence Boxer (2006)
Digital Products, Wedges, and Covering SpacesJournal of Mathematical Imaging and Vision, 25
Sang-Eon Han (2006)
Discrete Homotopy of a Closed k-Surface
Frank Zeeuw (2016)
Graph Theory
S.E. Han (2005)
Algorithm for discriminating digital images w.r.t. a digital (k 0,k 1)-homeomorphismJ. Appl. Math. Comput., 18
Sang-Eon Han (2008)
The k-Homotopic Thinning and a Torus-Like Digital Image in ZnJournal of Mathematical Imaging and Vision, 31
T.Y. Kong, A. Rosenfeld (1996)
Topological Algorithms for the Digital Image Processing
S.E. Han (2008)
Equivalent (k 0,k 1)-covering and generalized digital liftingInf. Sci., 178
C. Berge (2021)
Graphs and HypergraphsClustering
Sang-Eon Han (2005)
ON THE SIMPLICIAL COMPLEX STEMMED FROM A DIGITAL GRAPH, 27
Sang-Eon Han (2006)
Minimal simple closed 18-surfaces and a topological preservation of 3D surfacesInf. Sci., 176
The paper (Boxer, J. Math. Imaging Vis. 25:159–171, 2006) introduces the important tool of the universal (2,k)-covering property for classifying digital covering spaces. Even though the study of its Cartesian product property is important in expanding the property, it still remains open. In this paper, investigating various properties of a universal (2,k)-covering, we study a Cartesian product of the universal covering property, which plays an important role in classifying Cartesian products of digital coverings.
Acta Applicandae Mathematicae – Springer Journals
Published: Oct 10, 2008
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