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Lobachevsky plane

Thus we can reduce our problem to the investigation of the random walk on the Lobachevsky plane, where the non-Euclidean distance between ends is the topological invariant. [Pg.126]

Fig. 7a-c. Conformal transformation of the plane with obstacles (a) to the modular figure with Lobachevsky-metric (b) and its topological structure (c)... [Pg.11]

See other pages where Lobachevsky plane is mentioned: [Pg.12]    [Pg.12]    [Pg.12]    [Pg.279]    [Pg.126]    [Pg.128]    [Pg.12]    [Pg.12]    [Pg.12]    [Pg.279]    [Pg.126]    [Pg.128]    [Pg.822]   
See also in sourсe #XX -- [ Pg.128 ]



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