I have a problem in solving the following exercise and I'd appreciate any help.
Let Σ = {a,b}. I need to give a regular expression for all strings containing an odd number of a.
Thank you for your time
I have a problem in solving the following exercise and I'd appreciate any help.
Let Σ = {a,b}. I need to give a regular expression for all strings containing an odd number of a.
Thank you for your time
b*(ab*ab*)*ab*
the main part of it is (ab*ab*)*
, which enumerate all possibilities of even number of a
s. then at last, an extra a
has to exist to make it odd.
notice that this regular expression is equivalent to:
b*a(b*ab*a)*b*
these two constructs are in the form defined by pumping lemma:
http://en.wikipedia.org/wiki/Pumping_lemma
UPDATE:
@MahanteshMAmbi presented his concern of the regular expression matching the case aaabaaa
. In fact, it doesn't. If we run grep
, we shall see clearly what is matched.
$ echo aaabaaa | grep -P -o 'b*(ab*ab*)*ab*'
aaabaa
a
-o
option of grep
will print each matching instance every line. In this case, as we can see, the regular expression is being matched twice. One matches 5 a
s, one matches 1 a
. The seeming error in my comment below is caused by an improper test case, rather than the error in the regular expression.
If we want to make it rigorous to use in real life, it's probably better to use anchors in the expression to force a complete string match:
^b*(ab*ab*)*ab*$
therefore:
$ echo aaabaaa | grep -P -q '^b*(ab*ab*)*ab*$'
$ echo $?
1
b
s inside of the parenthesis my friend.
$ echo aaabaaa | grep -P 'b*(ab*ab*)*ab*'
--> aaabaaa
pr*q
, there is only one star of an expression r
. therefore I for sure know it covers all the cases. for more details, you can read the pumping lemma page i pasted up there.
^[^a]*a(?=[^a]*(?:a[^a]*a)*[^a]*$).*$
This will find only odd number of a's
for any generic string.See demo.