About the generalized symmetry of geometric figures weighted regularly and easily by "physical" scalar tasks
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LUNGU, Alexandru. About the generalized symmetry of geometric figures weighted regularly and easily by "physical" scalar tasks. In: Conference on Applied and Industrial Mathematics: CAIM 2018, 20-22 septembrie 2018, Iași, România. Chișinău, Republica Moldova: Casa Editorial-Poligrafică „Bons Offices”, 2018, Ediţia a 26-a, p. 97. ISBN 978-9975-76-247-2.
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Conference on Applied and Industrial Mathematics
Ediţia a 26-a, 2018
Conferința "Conference on Applied and Industrial Mathematics"
Iași, România, Romania, 20-22 septembrie 2018

About the generalized symmetry of geometric figures weighted regularly and easily by "physical" scalar tasks


Pag. 97-97

Lungu Alexandru
 
Moldova State University
 
Disponibil în IBN: 1 iunie 2022


Rezumat

Let us have geometrical gure F with discrete group of symmetry G and nite set N = f1; 2; :::;mg of "indexes", which mean a non-geometrical feature. On x a certain transitive group P of permutations over N. We will note with the symbol Fi the intersection of geometric gure F with the fundamental domain Si of the group G. Ascribe to each interior point M of Fi the same "index" r from the set N . We obtain one gure F(N) , weighted regularly and easily with summary load N. Let each "index" r from the set N have a scalar nature (temperature, density, color). The mixed transformation ~g of the "indexed" gure F(N) is composed of two independent components: ~g = gw, where g is pure geometrical isometric transformation and w is certain complex rule which describes the transformation of the "indexes". If the rule w is the same for every "indexed" point of F(N) , then the mixed transformation ~g is exactly a transformation of Zamorzaev's P-symmetry. The set of transformations of P-symmetry of "indexed" gure F(N) forms a minor or semi-minor group of P-symmetry , where is subgroup of the direct product of the group P with generating group G [1,3]. The "indexes" ri and rj , ascribed to the points which belong to distinct domains Fi and Fj , are transformed, in general, by di erent permutations pi and pj from group P. In this case the rule w is composed exactly from jGj components-permutations p 2 P. In conditions of this case the transformation ~g = gw is exactly a transformation of Wp-symmetry [2-5]. The set of transformations of Wp-symmetry of the given "indexed" gure F(N) forms a semi-minor or pseudo-minor group of Wp-symmetry, where is subgroup of the left standard Cartaisian wreath product of groups P and G.