Questions tagged [context-free]
The context-free tag has no usage guidance.
106
questions
0
votes
0answers
73 views
Is ASM a regular language? [migrated]
I'm giving a presentation where I have a single slide dedicated to formal languages. In this slide I give a simplified overview of the Chomsky Hierarchy and I'd like to give an example of a real world ...
4
votes
1answer
162 views
Are endmarkers necessary for Deterministic Pushdown Automata?
In the book by Kozen (Automata and Computability), the transition function of deterministic pushdown automata (DPDAs) is supposed, in contrast with non-deterministic pushdown automata (NPDAs), to ...
5
votes
1answer
116 views
Are PDAs without ϵ moves and with bounded stack operation as powerful as PDAs with them?
It is known that PDAs without $\epsilon$ moves are as powerful as PDAs with them.
However, it seems to me that the proof allows several stack operations in one move. What happens if we allow at most ...
1
vote
0answers
65 views
Sentences in what kinds of grammar in the Chomsky hierarchy can be parsed by an LSTM of a given size?
Given
an LSTM $N$ of a given size $A$,
a sentence $S$ with a given number of words $B$,
a Chomsky grammar hierarchy level $C$ in 0-3,
a Chomsky grammar $G$ of level $C$ of size $D$,
A given fixed, ...
2
votes
0answers
38 views
A Context-Sensitive Grammar which cannot be recognised by a Parsing Expression Grammar
It is (currently) an open question of whether every context-free grammar can be recognised by some parsing expression grammar. [1]
However, has it been proven that there exists an example of a ...
21
votes
2answers
2k views
Languages that we cannot (dis)prove to be Context-Free
I'm looking for languages which are "probably not Context-Free" but we are not able to (dis)prove it using known standard techniques.
Is there a recent survey on the subject or an open problem ...
3
votes
1answer
125 views
Compressing grammars by introducing ambiguity and left-recursion
This is a reference request. What is known about the following questions?
Problem: Given a grammar $G$ (for example context-free) with language $L$ we can introduce a
new grammar $G'$ which also ...
1
vote
0answers
26 views
Is there an unambiguous grammar that has no left recursion or left factors, but is not in $LL(1)$?
I know that, for a grammar $G$ to belong to $LL(1)$, it is necessary that
$G$ is not ambiguous; that is, every sentence has a unique parse tree in $G$.
$G$ has no left recursion; that is, we can't ...
13
votes
1answer
240 views
Is { ww' | HamDist(w,w')>1 } context-free?
After reading the recent question "Is the complement of $\{ www \mid ...\}$ context-free?"; I remembered a similar problem I wasn't able to disprove:
Is $L = \{ ww' \mid w,w' \in \{0,1\}^* \land |w|...
9
votes
3answers
390 views
Continuous mathematics and formal language theory
Whether there are some results on solving formal languages problems using mathematical analysis, continuous mathematics.
For example, solving the intersection non-emptiness problem for a context-free ...
5
votes
1answer
158 views
For which $R$ is $\{0^a10^b10^c\mid R(a,b,c)\}$ context-free?
Unless I'm mistaken, a language of the form $\{0^a10^b\mid R(a,b)\}$ is context-free if and only if $R$ is a finite union of linear (in)equalities involving integer constants and the variables $a$ and ...
12
votes
3answers
395 views
Is the complement of { www | … } context-free?
It is well-known that the complement of $\{ ww \mid w\in \Sigma^*\}$ is context-free. But what about the complement of $\{ www \mid w\in \Sigma^*\}$?
6
votes
1answer
256 views
Size of complement of context-free language
Let $L$ be a context-free language, $\bar L$ be its complement and $\bar L_n$ be the length $n$ words in $\bar L_n$.
What is known about $|\bar L_n|$?
Note that it is known that $|L_n|$ is either ...
8
votes
0answers
96 views
Does ${\bf CFLPAD}={\bf PPAD}$?
What happens if we define ${\bf PPAD}$ such that instead of a polytime Turing-machine/polysize circuit, a (non-)deterministic finite/push-down automaton encodes the problem?
I asked a similar ...
4
votes
1answer
88 views
What is the current state of the art in black-box grammar induction?
Grammar induction of Context Free Languages seems to be a very well researched field. I would like to know the current state of the art in inducing a Context Free Grammar (I am reading up Higuera's ...
20
votes
1answer
1k views
Number of words of length n in a context-free language
Denote by $w_n$ the number of words of length $n$ in a (possibly ambiguous) context-free language.
What is known about $w_n$?
I'm sure this has been studied a lot, but I couldn't find anything at ...
6
votes
1answer
134 views
Example of context-free tree language which can not be generated by monadic CFTG
Assuming that a context-free tree language (CFTL) is that which is generated by a context-free tree grammar (CFTG), I am looking for an example of CFTL which can not be generated by a monadic CFTG (...
1
vote
0answers
51 views
What is the interpretation of an infinite formal context-free grammar?
Let $L$ be a language as follows:
$$
\begin{align*}
L &::= a\ |\ L^{*}\\
\end{align*}
$$
Now, suppose I apply some sort of transformation $T : N \rightarrow N$ where $N$ is the set of non-...
3
votes
1answer
79 views
Reducing the Height of Context-Free Grammars
Let $G$ be a context free grammar in Chomsky normal form (CNF) with language $L(G)\subseteq \Sigma^n$. In other words, all strings generate by $G$ have size $n$.
Say that a string $w\in L(G)$ has ...
4
votes
1answer
353 views
What is the complexity of counting parse trees?
A Counting Problem
Given a CFG $G$ and a string $s$, how many distinct parse trees are there for the string $s$?
An Example Instance
Let's consider an example instance consisting of a CFG $G$ with ...
4
votes
1answer
288 views
Is it known if $CFL \subseteq NSPACE(o(log^2(n)))$?
$CFL$ is the class of context-free languages.
Question
Is $CFL$ known to be solvable in $o(log^{2}(n))$ non-deterministic space? What about $DCFL$?
6
votes
1answer
121 views
Is this generalization of context free grammars known and strict?
Let $\Sigma$ be an finite alphabet and $(N, \circ)$ a semigroup. The semigroup operation on $N$ can be extended to $\mathscr{P}(N)$: $N_1 \circ N_2 := \{ \; n_1 \circ n_2 \; | \; n_1 \in N_1, \; n_2 \...
5
votes
0answers
160 views
“Context” understanding in tree grammars
The Context-Free tree grammar has rules of the form:
$A\rightarrow t$ or $A(x_1,\dots,x_n)\rightarrow t_x$,
where $A\in N$, $t\in T(N\cup T)$, $t_x\in T(N\cup T\cup \{x_1,\dots,x_n\})$, $T(Z)$ ...
4
votes
1answer
523 views
Show that minimal CFG is undecidable via mapping reduction
Actually the problem below is an exercise in Sipser's textbook (Problem 5.36). However, from my perspective, it is not so trivial so that I post this question on this site instead of CS.SE.
The ...
2
votes
0answers
104 views
Is scalable hardware support for LogCFL (= sAC^1) possible?
The (uniform) circuit classes $TC^0$, $NC^1$ and $sAC^1$ seem to lend themselves to efficient hardware implementation. But using an FPGA approach to create the circuits on the fly seems problematic, ...
2
votes
1answer
216 views
Deformation of finite regular languages [closed]
Let $L \subseteq \{0,1\}^n$ be any finite regular language s.t it has an acyclic DFA.
Let $C$ be some class of acyclic DFAs.
Let $\sigma \in S_n$ be a permutation on $n$ symbols. We can apply $\...
19
votes
1answer
662 views
Is equivalence of unambiguous context-free languages decidable?
It is well known that the equivalence problem is undecidable for general context-free languages. However, all proofs of this fact that I am aware of seem to involve some ambiguous context-free ...
20
votes
0answers
580 views
Why is the Pumping Lemma sometimes called Bar-Hillel's Lemma?
There are several papers in the literature that refer to the Pumping Lemma for context free languages as Bar-Hillel's Lemma (for example, here, here, and on the Wikipedia page). However, the first ...
5
votes
1answer
135 views
Regarding proper form of production rules of Context-free tree grammars
Is it possible to describe Context-free Tree Grammar $G_t$ such that set of yields of its trees will coincide with Context-sensitive word language $a^nb^nc^n$?
$\{a^nb^nc^n | n>0\}=\{Yield(t)|t\...
3
votes
1answer
218 views
Compression algorithms for low-complexity strings?
Let $s$ denote a string over a finite alphabet, $n_s = |s|$ be the length of $s$, and $n_s^{*}$ denote the minimum description size of $s$ under a given computational model (TM, CFG, etc.). Are there ...
12
votes
2answers
738 views
Is SAT a context-free language?
I am considering the language of all satisfiable propositional logic formulae, SAT (to ensure that this has a finite alphabet, we would encode propositional letters in some suitable way [edit: the ...
17
votes
2answers
244 views
A reference for a “more algebraic” approach to pushdown automata and CFLs?
In the Sakarovitch's book on automata theory, it is written in the introduction to the section on rationals in the free group that the material presented therein lays "the foundation of a truly ...
16
votes
1answer
158 views
Characterization of $L$ for which $\{ww : w \in L\}$ is not a CFL?
It is a standard proof in automata courses that for $L = \Sigma^\star$ and $|\Sigma| \ge 2$ that $S(L) = \{ww : w \in L\}$ is not a context-free language.
It is also true that for any finite $L$, $S(...
3
votes
0answers
166 views
Context-Sensitive Grammar characteristic properties
This question can look like some kind of puzzle, but it is actually part of more complex applied problem.
Let's consider subspace of Context-Sensitive Grammars, which contains grammars which can not ...
6
votes
2answers
221 views
Finding smallest context free grammar that generates a set of sets
Are there any results known about the size of smallest context free grammar that generates a set of sets?
That is, I am given an alphabet $\Sigma$ as well as a set $S \subseteq \mathbb{P}(\Sigma)$ ...
6
votes
2answers
217 views
Known and described subclasses of Context-Free Grammars class
I'm looking for various researches which consider specific subclasses of Context-Free Grammar class, i.e. some specific described cases, which differ from well-known:
deterministic/non-deterministic
...
6
votes
0answers
423 views
Does PEG contain CFG?
Despite their considerable expressive power, all PEGs can be parsed in linear time using a tabular or memoizing parser (8). These properties strongly suggest that CFGs and PEGs define incomparable ...
-9
votes
1answer
82 views
In what way are these two context free grammar equal? [closed]
Consider the grammar
G1: A->Aα|β
G2: A->βX
X->αX|ϵ
Its was said that these two grammars are equal.
Should something like left recursion be removed? In what sense are these equal? Am really ...
3
votes
2answers
185 views
Finding a minimal context free grammar that recognizes a finite set of strings of bounded length
Problem:
Given a finite set of strings $\{x_1, x_2, ..., x_n\}$ of length $\ell$ or less from some finite alphabet $\Sigma=\{a_1, a_2, ..., a_k\}$, find the minimal context free grammar that ...
12
votes
3answers
332 views
Does there exist a hardest DCFL?
Greibach famously defined a language $H$, the so-called nondeterministic version of $D_2$, such that any CFL is an inverse morphic image of $H$. Does there exist a similar statement with DCFL, ...
9
votes
0answers
227 views
Complexity of a problem over acyclic context-free grammars
Let $G$ be an acyclic, context-free grammar over a fixed alphabet $\Sigma=\{a_1,\dots,a_k\}$ with the restriction (without loss of generality) that $|w|=2$ for each rule $A\to w$ in the grammar. ...
0
votes
0answers
24 views
Difference between 'string relations' and 'tree relations' w.r.t. synchronous CFGs
Context: http://www3.nd.edu/~dchiang/papers/synchtut.pdf
On page 3, under the section Properties, at the end of the paragraph labeled Closure under composition?, the author mentions 'tree relations ...
5
votes
0answers
132 views
Counting words of length $n$ in an inherently ambiguous CFG?
There is a polynomial-time algorithm for computing the number of words of length $n$ in an unambiguous CFG $G = (V, \Sigma, R, S)$ (via a dynamic programming approach). However, for ambiguous CFGs, ...
-1
votes
1answer
139 views
Can context-free grammar generates $a^{2^n}$ [closed]
Context-free grammar can generate the string $a^{2^n}$ for $n \geq 0$.
The production rule P is $S \rightarrow SS | a$.
The derivations is, for example:
1) $S \Rightarrow a$ (this is when n = 0)
2)...
10
votes
0answers
103 views
Chomsky-Schützenberger for Deterministic CFLs
Is there a Chomsky-Schützenberger representation theorem for deterministic CFLs? Knowing precisely the class of morphisms under which DCFL is closed, such a theorem would probably be of the form:
$...
16
votes
1answer
599 views
Are DPDAs without a $\epsilon$ moves as powerful as DPDAs with them?
In the formal description of Deterministic Pushdown Automata, they allow $\epsilon$ moves, where the machine can pop or push symbols onto the stack without reading a symbol from the input. If these $\...
0
votes
2answers
181 views
Example of R and G when $R \subseteq L(G)$ is undecidable [closed]
Could anybody provide an example of regular language R and context-free grammar G such that $R \subseteq L(G)$ is undecidable. Of course, if such language could be constructed.
Thanks.
10
votes
1answer
272 views
What is the state complexity of the copy language?
Let a number $n$ be given. Consider the following language $L_n = \{ \; ww \; \vert \; w \in \{0,1\}^{n} \; \}$.
In words, $L_n$ is the set of copy strings of length $2n$.
Consider the following ...
0
votes
0answers
130 views
CSP-problem, based on context-free grammar
I'm trying to solve a CSP (Constraint-Satisfaction-Problem), which is based on arbitrary context-free grammars. A quick example: Let's say we have a context-free grammar with the following production ...
2
votes
1answer
2k views
Deciding whether a context-free language is regular [closed]
Does anyone know whether the following decision problem is decidable:
Given a context-free language $L$, is $L$ regular?
Here $L$ can be expressed, e.g., using a context-free grammar. Does anyone ...
