Vladimir Andrunachievici Institute of Mathematics and Computer Science
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BASM n.2 (12), 1993
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On the group of motions of the four-dimensional hyperbolic space of a $120$-hedron. (Russian)
Authors:
Damian Florin
Abstract
In this note we investigate the isometry group of hiperbolic space of regular 120-cells.
Institutul de Matematică Academia de Ştiinţe a Moldovei
str. Academiei 5, Chişinău MD-2028, Moldova
Contents
An algorithm for forming the Poincare cycle. (Russian)
A property of the rings of endomorphisms. (Romanian)
On solution of problems of integer programming. (Russian)
Rates of queue length convergence for priority queues with orientation. (English)
On the commutator of two operators in sandwiches. (Russian)
Idempotents and the radical with respect to a right ideal. (Russian)
Independence and nilpotency in algebras. (Russian)
On isomorphisms of free topological groups, rings and modules generated by topological spaces. (Russian)
Modeling of self-dual Boolean functions commuting with 1 in a 3-valued extension of provability-intuitionistic logic. (Russian)
$L\sb 2$ estimates for singularly perturbed onedimensional hyperbolic equations of high order. (English)
On the group of motions of the four-dimensional hyperbolic space of a $120$-hedron. (Russian)