The Set of Rationale Numbers is Countably Infinite-A Simple Proof

Autor: Bernd E. Wolfinger
Rok vydání: 2023
Předmět:
Zdroj: Journal of Advances in Mathematics and Computer Science. 38:160-166
ISSN: 2456-9968
DOI: 10.9734/jamcs/2023/v38i71781
Popis: This research note presents a very simple proof of the interesting fact that the set Q of rationale numbers is still countably infinite as is the set of natural and integer numbers. The proof is based on several innovative ideas and neither relies on Cantor’s well-known diagonalization approach nor on the non-trivial Cantor- Schroeder-Bernstein Theorem. In addition, we present a new proposal for a simple injective function f: Q\(\to\)Z, which allows one to encode rationals in a highly efficient manner and at the same time it can be understood much more easily (even by non-mathematicians). Moreover, also the inverse function f -1 can be derived in an extremely simple manner. Nevertheless, the growth of length is only logarithmic if we compare the resulting length of f(r=p/q) with the value of p, while the length of q has no impact at all on the length of f (r). Our approach also allows us to introduce a total ordering for the set of rationale numbers in a straight-forward manner.
Databáze: OpenAIRE