Some Families of q-Sums and q-Products
Abstract
In this paper, we introduce two new binary operations, the one
called q-sum and defined on the set of all real numbers and the other called
q-product and defined on a subset of real numbers, which have potential importance in the study of q-numbers. The set of q-numbers of all real numbers, for example, is a field when these operations are restricted to it. Also, we introduce new q-exponential and q-logarithm and show some relations for them. Finally, we give some remarks on the well-known q-gamma, q-exponential, and q-beta functions.
called q-sum and defined on the set of all real numbers and the other called
q-product and defined on a subset of real numbers, which have potential importance in the study of q-numbers. The set of q-numbers of all real numbers, for example, is a field when these operations are restricted to it. Also, we introduce new q-exponential and q-logarithm and show some relations for them. Finally, we give some remarks on the well-known q-gamma, q-exponential, and q-beta functions.
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