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Can someone please explain the exact difference between Σ* and L* , where L is a language and Σ is alphabet of the language L ?


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1 Answer 1

up vote 4 down vote accepted

Σ is a set of characters.

L is a set of strings.

It ultimately depends on how L is defined. If L = {w | w in Σ} then all of L's words (strings) are single characters from Σ, and L* ≡ Σ*. However, if L is defined differently (example below) L* ≠ Σ*.

Preliminary note: you may have also seen ε represent empty strings, rather than λ. The symbols are interchangeable.


If V is a set of strings then V* is defined as the smallest superset of
V that contains λ (the empty string) and is closed under the string
concatenation operation.

If V is a set of symbols or characters then V* is the set of all strings
over symbols in V, including the empty string.


Example of Kleene star applied to set of strings:
    {"ab", "c"}* = {λ, "ab", "c", "abab", "abc", "cab", "cc", "ababab",
                    "ababc", "abcab", "abcc", "cabab", "cabc", "ccab",
                    "ccc", ...}.

Notice that "aa" and "bb" appear nowhere in the produced strings.

Σ* is less restrictive:

Example of Kleene star applied to set of characters:
    {'a', 'b', 'c'}* = {λ, "a", "b", "c", "aa", "ab", "ac", "ba", "bb",
                       "bc", "ca", "cb", "cc", ...}. 
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