Banach Algebra of Bounded Complex-Valued Functionals
نویسندگان
چکیده
The notation and terminology used in this paper are introduced in the following articles: [2], [16], [9], [14], [7], [8], [3], [18], [17], [4], [19], [5], [15], [1], [20], [12], [11], [10], [21], [13], and [6]. Let V be a complex algebra. A complex algebra is called a complex subalgebra of V if it satisfies the conditions (Def. 1). (Def. 1)(i) The carrier of it ⊆ the carrier of V , (ii) the addition of it = (the addition of V ) (the carrier of it), (iii) the multiplication of it = (the multiplication of V ) (the carrier of it), (iv) the external multiplication of it = (the external multiplication of V ) (C× the carrier of it), (v) 1it = 1V , and (vi) 0it = 0V . We now state the proposition (1) Let X be a non empty set, V be a complex algebra, V1 be a non empty subset of V , d1, d2 be elements of X, A be a binary operation on X, M be a function from X × X into X, and M1 be a function from C × X into X. Suppose that V1 = X and d1 = 0V and d2 = 1V and A = (the addition of V ) (V1) and M = (the multiplication of V ) (V1) and M1 = (the external multiplication of V ) (C × V1) and V1 has inverse. Then 〈X,M,A,M1, d2, d1〉 is a complex subalgebra of V .
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عنوان ژورنال:
- Formalized Mathematics
دوره 19 شماره
صفحات -
تاریخ انتشار 2011