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Overview Regular
Expressions FSAs Properties of
Regular Languages
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Regular Expressions A regular expression (RE) is a formula in a
specialized language, used to characterize strings. A string is a sequence of characters REs allow us to search for patterns
A finite-state machine is a device for recognizing/generating regular expressions
We’ll use a “Perlish” notation for writing regular expressions, based on regular expressions in the Perl programming language.
The concepts are the important thing NB: Perlish isn’t exactly the same as Perl
We will write REs between slashes: /…/
Regular expression inventory (1) Character Literals and Classes
Characters: /abcd/ Set: /p[aeiou]p/ Range: /ab[a-z]d/
Operators (disjunction, negation) Disjunction:
Set elements: /[Aa]ardvark/ Sequences of characters: /ant(eater|farm)/
Negation: Single item: /[^a]/ (any character but a) Range: [^a-z] (not a lowercase letter)
Regular expression inventory (2) Counters
?: Optionality (0 or 1 occurrence): /colou?r/ * (Kleene star): Any number of
occurrences: /[0-9]*/ +: At least one occurrence: /[0-9]+/ {n}: n number of occurrences: /[0-9]{4}/
Wildcard: matches any single character (.) /beg.n/
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Regular expression inventory (3)
Parentheses: used to group items together /ant(farm)?/: all of farm is optional
Escaped characters: needed to specify characters that have a special meaning: *, +, ?, (, ), |, [, ]: Use a backslash: /why\?/ Period expressed as: _
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Regular expression inventory (4)
Anchors: anchor expressions to various parts of the string ^ start of line
do not confuse with [^..] used to express negation; anywhere else it’s a start of line
$ end of line \b non-word character
word characters are digits, underscores, or letters, i.e., [0-9A-Za-z\_]
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Examples of Regular Expressions
/fire/ a sequence of f followed immediately by i, then immediately by r, then immediately by e
/fires?/ matches fire or fires /fires\?/ matches fires ? /[abcd]/ matches a, b, c, or d /[0-9]/ matches any character in the range 0 to 9
(inclusive) /[^0-9]/ matches any non-digit character, i.e., any
character except those in the set 0 thru 9 /[0-9]+/ matches 0, 1, 11, 12, 367, … /[0-9]*/ matches 0, 1, 11, 12, 367, … and matches no
string /fir./ matches fire, fir9, firm, firp, … /fir.*/ matches fir, fire, fir987, firppery, … /[fFHhs]ire/ matches fire, Fire, Hire, hire, sire /f|Fire/ matches f and Fire
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Precedence /fire|ings?/ the sequence fire or the
sequence ing (the latter optionally followed by s)
Why? Because sequences have precedence over
disjunction To override precedence, use parentheses /fir(e|ings)/ the sequence fire followed by
either the sequence e or the sequence ings
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Precedence Rules
1) Parentheses have the highest precedence.2) Then come counters, *, +, ?, {}3) Then come sequences and anchors
• so, /good.*/ matches goodies, etc., and not (just) goodgood
• /echo{3}/ the sequence ech followed by ooo
• /(echo){3}/ the sequence echoechoecho
4) Then comes disjunction
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Aliases Use aliases to designate particular recurrent
sets of characters \d [0-9]: digit \D [^\d]: non-digit \w [a-zA-Z0-9\_]: alphanumeric \W [^\w]: non-alphanumeric \s [~\r\t\n\f]: whitespace character
\r: space, \t: tab\n: newline, \f: formfeed
\S [^\s]: non-whitespace
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Example 1
/\$[0-9]+(\.[0-9][0-9])?/
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Example 2
Times on a digital watch (hours and minutes)
/[1-9]|(1[012]):[0-5][0-9]/
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Overgeneration
/\d\d:\d\d/
recognizes watch times, but also other sequences. In other words, the pattern over generates, covering expressions which aren’t in the target
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Undergeneration
/1[012]:[0-5][0-9]/
undergenerates, i.e., does not cover all watch times.
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Representing sentences
‘handling’ agreement:/the (student solves|students solve) the problem/
an optional adjective: /the clever?(student solves|students solve) the
problem/
generating an infinite number of sentences /the clever?(student solves|students solve) the
problem (and (the clever?(student solves|students solve) the problem)*/
NOTE: here the symbols are words, not characters! Be sure to define the symbol type
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Overview Regular
Expressions FSAs Properties of
Regular Languages
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A Simple Finite State Analyzer (or FSA) Example: FSA to recognize strings of the
form: /[ab]+/ i.e., L ={a, b, ab, ba, aab, bab, aba, bba, …}
Transition Tableinitial =0; final = {1}0–>a-> 1 0->b->1 1->a->11->b->1
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How an FSA accepts or rejects a string The behavior of an FSA is completely determined by its
transition table. The assumption is that there is a tape, with the input symbols are read off consecutive cells of the tape.
The machine starts in the start (initial) state, about to read the contents of the first cell on the input ‘tape’.
The FSA uses the transition table to decide where to go at each step
A string is rejected in exactly two cases: 1. a transition on an input symbol takes you nowhere 2. the state you’re in after processing the entire input is not
an accept (final) state Otherwise. the string is accepted.
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FSA formally
Finite state automaton defined by the following parameters: Q: finite set of (N) states: q0, q1, …,
qN : finite input alphabet q0: designated start state F: set of final states (subset of Q) (q, i): transition function
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More Examples of FSA’s
Let’s design FSA’s to recognize the set of zero or more a’s the set of all lowercase alphabetic
strings ending in a b. the set of all strings in [ab]* with
exactly two a’s. simple NPs, PPs, Ss etc.
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The set of zero or more a’s
L ={, a, aa, aaa, aaaa, …}
Transition Tableinitial =0; final = {0}0–>a-> 0
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FSA for set of all lowercase alphabetic strings ending in b
/[a-z]*b/ initial =0; final ={1} 0->[a, c-z]->0 0->b->1 1->b->1 1->[a, c-z]->0
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The set of all strings in [ab]* with exactly 2 a’s
Do this yourself It might help to first rewrite a more
precise regular expression for this
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FSA for simple NPs, PPs, S, …
initial=0; final ={2}0->D->10->->11->N->2
Another FSA for NPs:initial=0; final ={2}0->N->20->D->11->N->22->N->2
• D is an alias for [the, a, an, all,…], N for [dog, cat, robin,…]• What if we wanted to add adjectives? Or recognize PPs?• What about one for simple sentences?
• /(Prep D? A* N+)* (D? N) (Prep D? A* N+)* (V_tns|Aux V_ing) (Prep D? A* N+)*/• Note: FSA1 concat FSA2 recognizes L(FSA1) concat L(FSA2)
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Deterministic and Non-Deterministic FSA’s An FSA is non-deterministic (NFSA) when, for some state
and input, there is more than one state it can go to Occurs when transition table allows for a transition to
two or more states from one state on a given input symbol.
e.g., 1->a->2, 1->a->4 Whenever epsilon-transitions occur, these can be taken
without consuming input. So, whenever epsilon-transitions occur, the machine could
either take the epsilon-transition, or consume an input symbol, introducing non-determinism.
Any NFSA can be reduced to a DFSA (deterministic) (at the expense of possibly more states).
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FAQ: Why Are These Machines Finite-State? Finite number of states Number of states bounded in advance -- determined by its
transition table Therefore, the machine has a limit to the amount of memory
it uses. Its behavior at each stage is based on the transition table,
and depends just on the state it’s in, and the input. So, the current state reflects the history of the processing so far.
Certain classes of formal languages (and linguistic phenomena) which are not regular require additional memory to keep track of previous information (beyond current state and input)
e.g., center-embedding constructions (discussed later)
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Overview Regular
Expressions FSAs Properties of
Regular Languages
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Formal Languages Revisited We will view any formal language as a set of
expressions The language will use a finite vocabulary (called an
alphabet), and a set of expression-combining operations Regular languages are the simplest class of formal
languages
Note: Kleene closure of a setLet L = {a, b}. Then L* = the set of a’s and b’s concatenated zero or more
times = {, a, b, ab, aab, aaab, aaaab, ba, baa, ….}.
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Properties of Regular Languages The class of regular languages over is defined as
follows:1. (the empty set) is a regular language.2. a U , {a} is a regular language.
( = alphabet of symbols)3. If L1 and L2 are regular languages, so are:
a. L1 U L2, the union (or disjunction) of L1 and L2b. L1.L2 = {xy | x L1, yL2}, concatenation of L1 and L2c. L1*, the Kleene closure of L1 (set formed by concatenating members
of L1 zero or more times)
So, if the language L is a regular language, any expression in L must be expressible by the three operations of concatenation, disjunction, and Kleene closure.
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General Closure Properties of Regular Languages
Concatenation, Union, Kleene Closure Intersection: If L1 and L2 are regular
languages, so are L1 L2. Set Difference: If L1 and L2 are
regular languages, so are L1- L2. Reversal: If L1 is a regular language,
so is L1R, the language formed by reversing all the strings in L1
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What sorts of expressions aren’t regular In natural language, examples include
center-embedding constructions. The cat loves Mozart.The cat the dog chased loves Mozart.The cat the dog the rat bit chased loves Mozart.The cat the dog the rat the elephant admired bit
chased loves Mozart.(the noun)n (transitive-verb)n-1 loves Mozart
These aren’t regular though /A*B*loves Mozart/ is regular
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Regular Expressions and FSAs Regular expressions are equivalent to
FSA’s So, any FSA can be constructed by just
concatenation, union, and Kleene * Question: how would you (graphically)
combine FSA’s using: Concatenation Union Kleene *
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Exercises
2.1,2.4,2.8,2.10,2.11