CHAP. 14] ORDERED SETS AND LATTICES 339
EXAMPLE 14.2
(a) Consider the setNof positive integers ordered by divisibility. Then 21 and 7 are comparable since 7|21.
On the other hand, 3 and 5 are noncomparable since neither 3|5 nor 5|3. ThusNis not linearly ordered by
divisibility. Observe thatA={ 2 , 6 , 12 , 36 }is a linearly ordered subset ofNsince 2|6, 6|12 and 12|36.(b) The setNof positive integers with the usual order≤(less than or equal) is linearly ordered and hence every
ordered subset ofNis also linearly ordered.(c) The power setP (A)of a setAwith two or more elements is not linearly ordered by set inclusion. For
instance, supposeaandbbelong toA. Then{a}and{b}are noncomparable. Observe that the empty set,
{a}, andAdo form a linearly ordered subset ofP (A)since⊆{a}⊆A. Similarly,,{b}, andAform a
linearly ordered subset ofP (A).Product Sets and OrderThere are a number of ways to define an order relation on the Cartesian product of given ordered sets. Two
of these ways follow:(a)Product Order: SupposeSandTare ordered sets. Then the following is an order relation on the product
setS×T, called theproduct order:
(a, b)(a′,b′) if a≤a′andb≤b′(b)Lexicographical Order: SupposeSandTare linearly ordered sets. Then the following is an order relation
on the product setS×T, called thelexicographicalordictionary order:
(a, b)≺(a′,b′) if a<b or if a=a′andb<b′This order can be extended toS 1 ×S 2 ×···×Snas follows:(a 1 ,a 2 ,...,an)≺(a′ 1 ,a′ 2 ,...,an′) if ai=a′ifori= 1 , 2 ,...,k−1 andak<ak′Note that the lexicographical order is also linear.Kleene Closure and Order
LetAbe a (nonempty) linearly ordered alphabet. Recall thatA∗, called the Kleene closure ofA, consists of
all wordswonA, and|w|denotes the length ofw. Then the following are two order relations onA∗.
(a)Alphabetical (Lexicographical) Order: The reader is no doubt familiar with the usual alphabetical ordering
ofA∗. That is:
(i) λ<w, whereλis the empty word andwis any nonempty word.
(ii) Supposeu=au′andv=bv′are distinct nonempty words wherea,b∈Aandu′,v′∈A∗. Thenu≺v ifa<b or ifa=bbutu′≺v′(b)Short-lex Order: HereA∗is ordered first by length, and then alphabetically. That is, for any distinct words
u,vinA∗,
u≺v if|u|<|v| or if|u|=|v|butuprecedesvalphabetically
For example, “to” precedes “and” since|to|=2 but|and|=3. However, “an” precedes “to” since they have
the same length, but “an” precedes “to” alphabetically. This order is also called thefree semigroup order.