The least upper bound property and the irrationals.

RediJedeye
Messages
2
Reaction score
0
Hi

Does anybody know if the irrational numbers have the least upper bound property?
 
Physics news on Phys.org
RediJedeye said:
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.
 
Cool that makes perfect sense thanks for the help.
 
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...
 

Similar threads

Clarifications on the least upper bound property and the irrational numbers
Replies
3
Views
6K
I Relation of completeness to the l.u.b. property?
Replies
5
Views
2K
MHB Are these two propositions equivalent when dealing with subsets of real numbers?
Replies
4
Views
2K
I Importance of Archimedean Property and Density of Rationals
Replies
3
Views
3K
I Upper and Lower Darboux Sum Inequality
Replies
2
Views
2K
MHB Do we distinguish cases for n?
Replies
12
Views
2K
MHB Why is \( c'' \) an Upper Bound for \( U \cap [a, b] \) in Theorem 3.47?
Replies
2
Views
1K
I Proving that square root of 2 exists
Replies
16
Views
3K
What are upper and lower bounds and why are they important in mathematics?
Replies
12
Views
4K
Rudin's Principles Theorem 1.11 (supremum, infimum)
Replies
3
Views
3K

Hot Threads

Recent Insights

Back
Top