Abstract:
A vector is assigned to every pair of elements of a linear space. If this vector is in $l_2$
and the relation between the element pair and the vector satisfies a certain system of axioms,
then we call the space a Banach space. For such a space we introduce, as in the case of the
usual scalar product, a series of concepts, and prove, as an example a theorem concerning
orthogonal expansion.
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