grammar::fa - Create and manipulate finite automatons
package require Tcl 8.4
package require snit 1.3
package require struct::list
package require struct::set
package require grammar::fa::op ?0.2?
package require grammar::fa ?0.4?
::grammar::fa faName
?=|:=|<--|as|deserialize
src|fromRegex re ?over??
faName option ?arg arg ...?
faName destroy
faName clear
faName = srcFA
faName --> dstFA
faName serialize
faName deserialize serialization
faName states
faName state add s1 ?s2
...?
faName state delete s1 ?s2
...?
faName state exists s
faName state rename s snew
faName startstates
faName start add s1 ?s2
...?
faName start remove s1 ?s2
...?
faName start? s
faName start?set stateset
faName finalstates
faName final add s1 ?s2
...?
faName final remove s1 ?s2
...?
faName final? s
faName final?set stateset
faName symbols
faName symbols@ s ?d?
faName symbols@set stateset
faName symbol add sym1 ?sym2
...?
faName symbol delete sym1 ?sym2
...?
faName symbol rename sym
newsym
faName symbol exists sym
faName next s sym ?-->
next?
faName !next s sym ?-->
next?
faName nextset stateset sym
faName is deterministic
faName is complete
faName is useful
faName is epsilon-free
faName reachable_states
faName unreachable_states
faName reachable s
faName useful_states
faName unuseful_states
faName useful s
faName epsilon_closure s
faName reverse
faName complete
faName remove_eps
faName trim ?what?
faName determinize ?mapvar?
faName minimize ?mapvar?
faName complement
faName kleene
faName optional
faName union fa ?mapvar?
faName intersect fa ?mapvar?
faName difference fa ?mapvar?
faName concatenate fa ?mapvar?
faName fromRegex regex ?over?
This package provides a container class for finite
automatons (Short: FA). It allows the incremental definition of the
automaton, its manipulation and querying of the definition. While the
package provides complex operations on the automaton (via package
grammar::fa::op), it does not have the ability to execute a
definition for a stream of symbols. Use the packages
grammar::fa::dacceptor and grammar::fa::dexec for that.
Another package related to this is grammar::fa::compiler. It turns a
FA into an executor class which has the definition of the FA hardwired into
it. The output of this package is configurable to suit a large number of
different implementation languages and paradigms.
For more information about what a finite automaton is see section
FINITE AUTOMATONS.
The package exports the API described here.
- ::grammar::fa faName
?=|:=|<--|as|deserialize
src|fromRegex re ?over??
- Creates a new finite automaton with an associated global Tcl command whose
name is faName. This command may be used to invoke various
operations on the automaton. It has the following general form:
- faName
option ?arg arg ...?
- Option and the args determine the exact behavior of the
command. See section FA METHODS for more explanations. The new
automaton will be empty if no src is specified. Otherwise it will
contain a copy of the definition contained in the src. The
src has to be a FA object reference for all operators except
deserialize and fromRegex. The deserialize operator
requires src to be the serialization of a FA instead, and
fromRegex takes a regular expression in the form a of a syntax
tree. See ::grammar::fa::op::fromRegex for more detail on
that.
All automatons provide the following methods for their
manipulation:
- faName
destroy
- Destroys the automaton, including its storage space and associated
command.
- faName
clear
- Clears out the definition of the automaton contained in faName, but
does not destroy the object.
- faName =
srcFA
- Assigns the contents of the automaton contained in srcFA to
faName, overwriting any existing definition. This is the assignment
operator for automatons. It copies the automaton contained in the FA
object srcFA over the automaton definition in faName. The
old contents of faName are deleted by this operation.
This operation is in effect equivalent to
faName deserialize [srcFA serialize]
- faName
--> dstFA
- This is the reverse assignment operator for automatons. It copies the
automation contained in the object faName over the automaton
definition in the object dstFA. The old contents of dstFA
are deleted by this operation.
This operation is in effect equivalent to
dstFA deserialize [faName serialize]
- faName
serialize
- This method serializes the automaton stored in faName. In other
words it returns a tcl value completely describing that automaton.
This allows, for example, the transfer of automatons over arbitrary
channels, persistence, etc. This method is also the basis for both the
copy constructor and the assignment operator.
The result of this method has to be semantically identical
over all implementations of the grammar::fa interface. This is
what will enable us to copy automatons between different implementations
of the same interface.
The result is a list of three elements with the following
structure:
- [1]
- The constant string grammar::fa.
- [2]
- A list containing the names of all known input symbols. The order of
elements in this list is not relevant.
- [3]
- The last item in the list is a dictionary, however the order of the keys
is important as well. The keys are the states of the serialized FA, and
their order is the order in which to create the states when deserializing.
This is relevant to preserve the order relationship between states.
The value of each dictionary entry is a list of three elements
describing the state in more detail.
- [1]
- A boolean flag. If its value is true then the state is a start
state, otherwise it is not.
- [2]
- A boolean flag. If its value is true then the state is a final
state, otherwise it is not.
- [3]
- The last element is a dictionary describing the transitions for the state.
The keys are symbols (or the empty string), and the values are sets of
successor states.
Assuming the following FA (which describes the life of a truck
driver in a very simple way :)
Drive -- yellow --> Brake -- red --> (Stop) -- red/yellow --> Attention -- green --> Drive
(...) is the start state.
a possible serialization is
grammar::fa \\
{yellow red green red/yellow} \\
{Drive {0 0 {yellow Brake}} \\
Brake {0 0 {red Stop}} \\
Stop {1 0 {red/yellow Attention}} \\
Attention {0 0 {green Drive}}}
A possible one, because I did not care about creation order
here
- faName
deserialize serialization
- This is the complement to serialize. It replaces the automaton
definition in faName with the automaton described by the
serialization value. The old contents of faName are deleted
by this operation.
- faName
states
- Returns the set of all states known to faName.
- faName
state add s1 ?s2 ...?
- Adds the states s1, s2, et cetera to the FA definition in
faName. The operation will fail any of the new states is already
declared.
- faName
state delete s1 ?s2 ...?
- Deletes the state s1, s2, et cetera, and all associated
information from the FA definition in faName. The latter means that
the information about in- or outbound transitions is deleted as well. If
the deleted state was a start or final state then this information is
invalidated as well. The operation will fail if the state s is not
known to the FA.
- faName
state exists s
- A predicate. It tests whether the state s is known to the FA in
faName. The result is a boolean value. It will be set to
true if the state s is known, and false
otherwise.
- faName
state rename s snew
- Renames the state s to snew. Fails if s is not a
known state. Also fails if snew is already known as a state.
- faName
startstates
- Returns the set of states which are marked as start states, also
known as initial states. See FINITE AUTOMATONS for
explanations what this means.
- faName
start add s1 ?s2 ...?
- Mark the states s1, s2, et cetera in the FA faName as
start (aka initial).
- faName
start remove s1 ?s2 ...?
- Mark the states s1, s2, et cetera in the FA faName as
not start (aka not accepting).
- faName
start? s
- A predicate. It tests if the state s in the FA faName is
start or not. The result is a boolean value. It will be set to
true if the state s is start, and false
otherwise.
- faName
start?set stateset
- A predicate. It tests if the set of states stateset contains at
least one start state. They operation will fail if the set contains an
element which is not a known state. The result is a boolean value. It will
be set to true if a start state is present in stateset, and
false otherwise.
- faName
finalstates
- Returns the set of states which are marked as final states, also
known as accepting states. See FINITE AUTOMATONS for
explanations what this means.
- faName
final add s1 ?s2 ...?
- Mark the states s1, s2, et cetera in the FA faName as
final (aka accepting).
- faName
final remove s1 ?s2 ...?
- Mark the states s1, s2, et cetera in the FA faName as
not final (aka not accepting).
- faName
final? s
- A predicate. It tests if the state s in the FA faName is
final or not. The result is a boolean value. It will be set to
true if the state s is final, and false
otherwise.
- faName
final?set stateset
- A predicate. It tests if the set of states stateset contains at
least one final state. They operation will fail if the set contains an
element which is not a known state. The result is a boolean value. It will
be set to true if a final state is present in stateset, and
false otherwise.
- faName
symbols
- Returns the set of all symbols known to the FA faName.
- faName
symbols@ s ?d?
- Returns the set of all symbols for which the state s has
transitions. If the empty symbol is present then s has epsilon
transitions. If two states are specified the result is the set of symbols
which have transitions from s to t. This set may be empty if
there are no transitions between the two specified states.
- faName
symbols@set stateset
- Returns the set of all symbols for which at least one state in the set of
states stateset has transitions. In other words, the union of
[faName symbols@ s] for all states s in
stateset. If the empty symbol is present then at least one state
contained in stateset has epsilon transitions.
- faName
symbol add sym1 ?sym2 ...?
- Adds the symbols sym1, sym2, et cetera to the FA definition
in faName. The operation will fail any of the symbols is already
declared. The empty string is not allowed as a value for the symbols.
- faName
symbol delete sym1 ?sym2 ...?
- Deletes the symbols sym1, sym2 et cetera, and all associated
information from the FA definition in faName. The latter means that
all transitions using the symbols are deleted as well. The operation will
fail if any of the symbols is not known to the FA.
- faName
symbol rename sym newsym
- Renames the symbol sym to newsym. Fails if sym is not
a known symbol. Also fails if newsym is already known as a
symbol.
- faName
symbol exists sym
- A predicate. It tests whether the symbol sym is known to the FA in
faName. The result is a boolean value. It will be set to
true if the symbol sym is known, and false
otherwise.
- faName
next s sym ?--> next?
- Define or query transition information.
If next is specified, then the method will add a
transition from the state s to the successor state
next labeled with the symbol sym to the FA contained in
faName. The operation will fail if s, or next are
not known states, or if sym is not a known symbol. An exception
to the latter is that sym is allowed to be the empty string. In
that case the new transition is an epsilon transition which will
not consume input when traversed. The operation will also fail if the
combination of (s, sym, and next) is already
present in the FA.
If next was not specified, then the method will return
the set of states which can be reached from s through a single
transition labeled with symbol sym.
- faName
!next s sym ?--> next?
- Remove one or more transitions from the Fa in faName.
If next was specified then the single transition from
the state s to the state next labeled with the symbol
sym is removed from the FA. Otherwise all transitions
originating in state s and labeled with the symbol sym
will be removed.
The operation will fail if s and/or next are not
known as states. It will also fail if a non-empty sym is not
known as symbol. The empty string is acceptable, and allows the removal
of epsilon transitions.
- faName
nextset stateset sym
- Returns the set of states which can be reached by a single transition
originating in a state in the set stateset and labeled with the
symbol sym.
In other words, this is the union of [faName next
s symbol] for all states s in stateset.
- faName
is deterministic
- A predicate. It tests whether the FA in faName is a deterministic
FA or not. The result is a boolean value. It will be set to true if
the FA is deterministic, and false otherwise.
- faName
is complete
- A predicate. It tests whether the FA in faName is a complete FA or
not. A FA is complete if it has at least one transition per state and
symbol. This also means that a FA without symbols, or states is also
complete. The result is a boolean value. It will be set to true if
the FA is deterministic, and false otherwise.
Note: When a FA has epsilon-transitions transitions over a
symbol for a state S can be indirect, i.e. not attached directly to S,
but to a state in the epsilon-closure of S. The symbols for such
indirect transitions count when computing completeness.
- faName
is useful
- A predicate. It tests whether the FA in faName is an useful FA or
not. A FA is useful if all states are reachable and useful.
The result is a boolean value. It will be set to true if the FA is
deterministic, and false otherwise.
- faName
is epsilon-free
- A predicate. It tests whether the FA in faName is an epsilon-free
FA or not. A FA is epsilon-free if it has no epsilon transitions. This
definition means that all deterministic FAs are epsilon-free as well, and
epsilon-freeness is a necessary pre-condition for deterministic'ness. The
result is a boolean value. It will be set to true if the FA is
deterministic, and false otherwise.
- faName
reachable_states
- Returns the set of states which are reachable from a start state by one or
more transitions.
- faName
unreachable_states
- Returns the set of states which are not reachable from any start state by
any number of transitions. This is
[faName states] - [faName reachable_states]
- faName
reachable s
- A predicate. It tests whether the state s in the FA faName
can be reached from a start state by one or more transitions. The result
is a boolean value. It will be set to true if the state can be
reached, and false otherwise.
- faName
useful_states
- Returns the set of states which are able to reach a final state by one or
more transitions.
- faName
unuseful_states
- Returns the set of states which are not able to reach a final state by any
number of transitions. This is
[faName states] - [faName useful_states]
- faName
useful s
- A predicate. It tests whether the state s in the FA faName
is able to reach a final state by one or more transitions. The result is a
boolean value. It will be set to true if the state is useful, and
false otherwise.
- faName
epsilon_closure s
- Returns the set of states which are reachable from the state s in
the FA faName by one or more epsilon transitions, i.e transitions
over the empty symbol, transitions which do not consume input. This is
called the epsilon closure of s.
- faName
reverse
- faName
complete
- faName
remove_eps
- faName
trim ?what?
- faName
determinize ?mapvar?
- faName
minimize ?mapvar?
- faName
complement
- faName
kleene
- faName
optional
- faName
union fa ?mapvar?
- faName
intersect fa ?mapvar?
- faName
difference fa ?mapvar?
- faName
concatenate fa ?mapvar?
- faName
fromRegex regex ?over?
- These methods provide more complex operations on the FA. Please see the
same-named commands in the package grammar::fa::op for descriptions
of what they do.
For the mathematically inclined, a FA is a 5-tuple (S,Sy,St,Fi,T)
where
- S is a set of states,
- Sy a set of input symbols,
- St is a subset of S, the set of start states, also known as
initial states.
- Fi is a subset of S, the set of final states, also known as
accepting.
- T is a function from S x (Sy + epsilon) to {S}, the transition
function. Here epsilon denotes the empty input symbol and is
distinct from all symbols in Sy; and {S} is the set of subsets of S. In
other words, T maps a combination of State and Input (which can be empty)
to a set of successor states.
In computer theory a FA is most often shown as a graph where the
nodes represent the states, and the edges between the nodes encode the
transition function: For all n in S' = T (s, sy) we have one edge between
the nodes representing s and n resp., labeled with sy. The start and
accepting states are encoded through distinct visual markers, i.e. they are
attributes of the nodes.
FA's are used to process streams of symbols over Sy.
A specific FA is said to accept a finite stream sy_1 sy_2
state in St and ending at a state in Fi whose edges have the labels sy_1,
sy_2, etc. to sy_n. The set of all strings accepted by the FA is the
language of the FA. One important equivalence is that the set of
languages which can be accepted by an FA is the set of regular
languages.
Another important concept is that of deterministic FAs. A FA is
said to be deterministic if for each string of input symbols there is
exactly one path in the graph of the FA beginning at the start state and
whose edges are labeled with the symbols in the string. While it might seem
that non-deterministic FAs to have more power of recognition, this is not
so. For each non-deterministic FA we can construct a deterministic FA which
accepts the same language (--> Thompson's subset construction).
While one of the premier applications of FAs is in parsing,
especially in the lexer stage (where symbols == characters), this is
not the only possibility by far.
Quite a lot of processes can be modeled as a FA, albeit with a
possibly large set of states. For these the notion of accepting states is
often less or not relevant at all. What is needed instead is the ability to
act to state changes in the FA, i.e. to generate some output in response to
the input. This transforms a FA into a finite transducer, which has
an additional set OSy of output symbols and also an additional
output function O which maps from "S x (Sy + epsilon)" to
"(Osy + epsilon)", i.e a combination of state and input, possibly
empty to an output symbol, or nothing.
For the graph representation this means that edges are additional
labeled with the output symbol to write when this edge is traversed while
matching input. Note that for an application "writing an output
symbol" can also be "executing some code".
Transducers are not handled by this package. They will get their
own package in the future.
This document, and the package it describes, will undoubtedly
contain bugs and other problems. Please report such in the category
grammar_fa of the Tcllib SF Trackers
[http://sourceforge.net/tracker/?group_id=12883]. Please also report any
ideas for enhancements you may have for either package and/or
documentation.
automaton, finite automaton, grammar, parsing, regular expression,
regular grammar, regular languages, state, transducer
Grammars and finite automata
Copyright (c) 2004-2009 Andreas Kupries <andreas_kupries@users.sourceforge.net>