TL;DR
This paper introduces the concept of pairable functions, explores their properties, and interprets Euler's identity within the framework of these functions and finite cyclic groups.
Contribution
It defines pairable functions and connects them to Euler's identity and finite cyclic groups, offering a new perspective on these mathematical concepts.
Findings
Properties of pairable functions are established.
Euler's identity is interpreted as a property of pairable functions.
Connections to finite cyclic groups are demonstrated.
Abstract
The notion of pairable functions is introduced and some of its properties are developed. In this connection the famous Euler identity is interpreted as a property of certain pairable functions and finite cyclic groups.
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Taxonomy
TopicsAdvanced Mathematical Identities · graph theory and CDMA systems · Advanced Mathematical Theories