Character table for dirhenium decacarbonyl of full non-rigid molecule group



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7-1558121693 TYP
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2. Basic Definitions
Let Ω bean arbitrary nonempty set its elements are referred to as points. A bijection (a one-to-one, onto mapping) of Ω onto itself is called a permutation group on Ω. The set of all permutations of Ω forms a group, under composition of mappings, called the symmetric
group on Ω, denoted by sym(Ω), and write S
n
to denote the special group when n is a positive integer and
Ω = {1,2,...,n}. A permutation group is just a subgroup of asymmetric group. A group G is said to be generated by an element x written G = xif every element in G can be expressed as an element of x.


E. Suleiman and MI. Bello / Science Forum (Journal of Pure and Applied Sciences) 16 (2019) 1 – 4
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