Alexander V. Evako
According to our database1,
Alexander V. Evako
authored at least 23 papers
between 1995 and 2022.
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Bibliography
2022
CoRR, 2022
2017
Properties of Digital n-Dimensional Spheres and Manifolds. Separation of Digital Manifolds.
CoRR, 2017
Solution of the Hyperbolic Partial Differential Equation on Graphs and Digital Spaces: a Klein Bottle a Projective Plane and a 4D Sphere.
CoRR, 2017
Graph Theoretical Models of Closed n-Dimensional Manifolds: Digital Models of a Moebius Strip, a Torus, a Projective Plane a Klein Bottle and n-Dimensional Spheres.
CoRR, 2017
Structure of a Parabolic Partial Differential Equation on Graphs and Digital spaces. Solution of PDE on Digital Spaces: a Klein Bottle, a Projective Plane, a 4D Sphere and a Moebius Band.
CoRR, 2017
2015
Classification of graphs using contractible transformations. Homotopy equivalence of graphs. Basic representatives and complexity of homotopy equivalence classes.
CoRR, 2015
Parabolic equations on digital spaces. Solutions on the digital Moebius strip and the digital projective plane.
CoRR, 2015
Topology-preserving digitization of n-dimensional objects by constructing cubical models.
CoRR, 2015
Properties of simple sets in digital spaces. Contractions of simple sets preserving the homotopy type of a digital space.
CoRR, 2015
2014
Simple pairs of points in digital spaces. Topology-preserving transformations of digital spaces by contracting simple pairs of points.
CoRR, 2014
Topology preserving representations of compact 2D manifolds by digital 2-surfaces. Compressed digital models and digital weights of compact 2D manifolds. Classification of closed surfaces by digital tools.
CoRR, 2014
2013
CoRR, 2013
On digital simply connected spaces and manifolds: a digital simply connected 3-manifold is the digital 3-sphere.
CoRR, 2013
2011
Characterizations of simple points, simple edges and simple cliques of digital spaces: One method of topology-preserving transformations of digital spaces by deleting simple points and edges.
Graph. Model., 2011
2006
Topological properties of closed digital spaces: One method of constructing digital models of closed continuous surfaces by using covers.
Comput. Vis. Image Underst., 2006
CoRR, 2006
The Poincare conjecture for digital spaces. Properties of digital n-dimensional disks and spheres
CoRR, 2006
2005
The consistency principle for a digitization procedure. An algorithm for building normal digital spaces of continuous n-dimensional objects
CoRR, 2005
1996
1995
Topological properties of the intersection graph of covers of n-dimensional surfaces.
Discret. Math., 1995