The least upper bound property and the irrationals.

[RediJedeye]

Hi

Does anybody know if the irrational numbers have the least upper bound property?

 

[SteveL27]

Hi

Does anybody know if the irrational numbers have the least upper bound property?

The set of irrationals less than zero is nonempty (it contains -pi, for example) and is bounded above (by pi, for example) yet has no least upper bound. So the irrationals do not satisfy the LUB property.

Of course zero is a LUB for that set in the reals, but 0 is not irrational. That's the beauty of the LUB concept. It encapsulates the intuition of there being "no holes" in a given set.

 

[RediJedeye]

Cool that makes perfect sense thanks for the help.

 

[Bacle2]

To generalize SteveL's answer, for any rational q,

consider the intervals (-oo,q) . Notice that the LUB of a subset of real numbers is

a limit point of that set S . So if a subset S of R does not contain all its limit points you

can constructuct a subset of S that does not contain its LUB-- so that closed subsets

contain their LUB's. Think of the relation with completeness of a set...

 

[blue_raver22]

I can confirm that the irrational numbers do have the least upper bound property. This property states that for any non-empty subset of real numbers, there exists a least upper bound (or supremum) that is also a real number. This means that for any set of irrational numbers, there will always be a smallest number that is greater than or equal to all the other numbers in the set. This is one of the defining characteristics of the real numbers, and it applies to both rational and irrational numbers. So yes, the irrational numbers do have the least upper bound property.