- 7 * "The" Complete Ordered Field 4 7
Lemma 1.7.2 If Fis a complete ordered field, then
Vx E F, x = sup{ r E Qp : r < x}.
That is, in a complete ordered field, every element is the supremum of the
set of all rational elements less than it.Step 6. Define f: F--+ F' by
f(x) = sup{f(r): r E Qp and r < x}.
(Before you can accept this as a valid definition, you must first prove that
sup{f(r): r E Qp and r < x} exists.)
Step 7. Prove that the function f : F--+ F' just defined satisfies properties
(1), (2), and (9). To do this, you will need results from Exercise Set 1.6-B.
Warning: Completing Step 7 may be quite challenging! •SUMMARYSince there is essentially only one complete ordered field, we give it a special
name and symbol. The complete ordered field is called "the Real Number
System" and is denoted with the special symbol, JR..
Definition 1.7.3 (The Real Number System)
JR = the complete ordered field; its members are
called real numbers.For further insight on the uniqueness of the complete ordered field, the
reader may consult references [10], [15], [37], [63], and [93].