Inducing on Q+: Is it Possible?

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Induction on positive rational numbers (Q+) is theoretically possible by demonstrating that a statement holds for n=1 and using specific properties of rational numbers. The discussion highlights that any well-ordered set can be subjected to induction, and the rationals can be well-ordered, especially under the axiom of choice. A common approach involves assuming a set of counterexamples, identifying a minimal one through well-ordering, and deriving a contradiction. This method is exemplified by proving that the binomial coefficient function (nCr) yields integer values via induction. Overall, the feasibility of induction on Q+ is affirmed, though it presents unique challenges compared to integers.
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Is it possible to induce on Q+ by showing that a statement is true for n=1 and (n/m=>(n+1)/m AND n/m=>n/(m+1))?
 
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Treadstone 71 said:
Is it possible to induce on Q by showing that a statement is true for n=1 and (n=>n+1 AND n=>n/(n+1))?

First, have you tried induction on the integers?

Positive and Negative.
 
Yes, I have used induction many times before on the integers. My question is whether it is possible prove that a statement is true for all (positive) rational numbers, by induction, in principle.
 
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Treadstone 71 said:
Yes, I have used induction many times before on the integers. My question is whether it is possible prove that a statement is true for all (positive) rational numbers, by induction, in principle.

Yes, that is entirely possible.
 
Excellent, thanks for the reply.
 
Any set that can be well ordered can be inducted upon, and every set can be well ordered (if we accept the axiom of choice), it's just that it's difficult in general, though easier for the rationals since they are lexicographically ordered naturally. The usual way to do it is to assume that there is a set of counter examples, by the well ordering there is a minimal one and we try to deduce a deduction. FOr example one can show that the nCr function is integer valued by induction like this.
 

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