Uncountable group of continuous transformations of unit segment preserving tails of Q_2-representation of numbers
Журнал
Proceedings of the International Geometry Center
ISSN
2072-9812
Дата випуску
2024-09
DOI
10.15673/pigc.v17i2.2755
Анотація
We consider two-base Q2-representation of numbers of segment [0; 1]: (Formula Presented), which is defined by two bases q0 ∊ (0; 1), q1 = 1 - q0 and an alphabet A = {0, 1}, (αn) ∊ A × A × . . . . It is a generalization of classic binary representation (q0 = 1/2 ). In the article we prove that the set of all continuous bijections of segment [0; 1] preserving “tails” of Q2-representation of numbers forms an uncountable non-abelian group with respect to composition such that it is a subgroup of the group of continuous transformations preserving frequencies of digits of Q2-representation of numbers. Construction of such transformations (bijections) is based on the left and right shift operators for digits of Q2-representation of numbers.
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