Questions tagged [lo.logic]
Computational and mathematical logic.
485
questions
-3
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0answers
20 views
Stuttering steps in temporal logic of actions (TLA)
How would you define informally first, and then formally stuttering steps in the temporal logic of actions?
3
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2answers
124 views
Looking for some lecture videos on logic, models of computation and computational complexity/tcs fundamentals [closed]
Looking for some lecture videos (introductory level) on logic, models of computation as well as computational complexity/ other theoretical computer science fundamentals
1
vote
1answer
53 views
Variable wire weights in DLOGTIME-uniform circuits
The definition of a $DLOGTIME$-uniform circuit family is based on a Turing machine that accepts the language $\langle t, a, b \rangle$, where gate $a$ is of type $t$ and has gate $b$ as a child, ...
1
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0answers
60 views
Complexity class name for the class of languages that are $\Sigma^1_1$-definable over finite domains
Let ${\cal L}=\{Y_1,..., Y_k, X\}$ be a finite relational language such that $X$ is a unary relation name. Let $\phi(X,\bar{Y})\in{\cal L}$ be a first-order formula (the formula can have the equality ...
21
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2answers
1k views
Decidability of diophantine equations over {=, +, gcd}
It is well-known that polynomial diophantine equations are undecidable (Hilbert's 10th problem): that is, given a quantifier-free formula over the language $\{=, +, \cdot, 1\}$ (of equality, addition, ...
7
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0answers
78 views
Proof of $DLOGTIME-CC^0 = MOD[<,bit]$
Let $CC^0[m]$ be the class of constant-depth, polynomial-sized circuits consisting entirely of $MOD_m$ gates, which put out $1$ iff the sum of their inputs $\equiv 0~(\textrm{mod}~m)$. In the same way ...
1
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0answers
107 views
$\mathit{FO}[+,\times]$ seems more powerful than $\mathit{DLOGTIME}$-uniform $\mathit{AC}^0$?
I’ve been reading up on the connection between first order logic and small circuit complexity classes, and specifically Barrington, Immerman, and Straubing’s paper “On Uniformity Within $\mathit{NC}^1$...
1
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0answers
103 views
Functional abbreviation for Inst expression in Turing's 1936 paper
In Turing's 1936 paper "On Computable Numbers",
For a Turing Machine $M$, $Inst(q_i S_j S_k L q_l ) $ means that if $M$ scans symbol $S_j $ under $m-configuration$ $q_i$, then the symbol ...
0
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1answer
51 views
Is every countable, finite-branching LTS bisimilar to a tree?
Let $L$ be a finite set of labels, and let $\mathcal{C}$ be the set of finitely-branching transition systems labeled by $L$ and with a countable set of states. Let $\sim$ denote the bisimulation ...
2
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1answer
140 views
Is modal $\mu$-calculus “equivalent” to bisimulation?
I know that propositional modal $\mu$-calculus $L\mu$ is bisimulation-invariant. However, I'm curious to what degree it captures bisimulation.
Q1: Given two labeled transition systems $T_1$, $T_2$ ...
4
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0answers
160 views
Alternative exponential definition of Kolmogorov complexity
In Kikuchi's paper Kolmogorov complexity and the second incompleteness theorem the Kolmogorov Complexity (KC) of $x$ is defined as
$$ K(x) = \mu e (\varphi_e(0) \simeq x) \, , $$
the smallest $e$ such ...
1
vote
0answers
91 views
λProlog vs HiLog
λProlog is a well-known higher-order logic programming language.
On the other hand, HiLog is described as a logic programming language with higher-order syntax, but first-order model theory.
Do I ...
2
votes
2answers
263 views
Uncountability in intuitionistic logic
I've read snippets here and there that inside intuitionistic logic, uncountable can be a subset of the naturals ?
What is the correct intuition to think about this? Andrej Bauer replied above, saying ...
2
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0answers
151 views
Order-invariant conjunctive queries are FO-definable without the order
I'm looking for a reference for Exercise 6.11 from Libkin's FMT book:
Prove that an order-invariant conjunctive query is FO-definable without the order relation.
All help is appreciated.
1
vote
1answer
132 views
Is Scott's reduction sound for $\mathrm{FO}^2$ with equality?
As per this paper by Grädel, Kolaitis and Moshe Vardi, they discuss computational complexity of satisfiability problem in $\mathrm{FO^2}$, In order to do this they use Scott's reduction. Which is the ...
5
votes
1answer
121 views
Does focused proof search ever have to backtrack across the choice of focus formula?
There are a lot of different "focused" sequent calculi for lots of different logics, but my understanding is that many or most of them have the following flavor. First one divides the ...
3
votes
1answer
125 views
Normal forms for counting quantifiers?
In the paper by [Erich Grädel and Martin Otto], the authors state that any formula in First Order Logic with two variables with counting quantifiers can be reduced to a formula of the form
$$ \forall ...
5
votes
2answers
197 views
Categorical equivalent of higher order logic
From Simply typed lambda calculus and higher order logic, I get the impression that HOL is STLC + equality + equality axioms. I was wondering if there is a particular kind of category modelling this.
11
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1answer
194 views
Is there a language of first-order logic such that every r.e. set is Turing-equivalent to some finitely axiomatizable theory in that language?
I hope that mathematical logic / recursion theory type questions are welcome here. I am sorry this question is so long and technical, but I believe that if you read it you will find that it is well-...
3
votes
1answer
73 views
Why REFL rule is primitive in HOL Light?
HOL Light
assumed REFL as a primitive.
Why does it need to do so?
Can't REFL rule be deduced in this way using ...
2
votes
0answers
88 views
Logic of learning
Does Robust logic (Leslie Valiant), Default logic (Raymond Reiter) and Circumscription logic (John McCarthy) have any relation?
I was Mathematician and Computer Science (dual degree undergraduate) ...
3
votes
1answer
135 views
What is FO(REGULAR)? (The descriptive complexity equivalent of NC1)
According to Immerman's Descriptive Complexity diagram, there is a logic called $\mathsf{FO(REGULAR)}$ which captures $\mathsf{NC}^1$. However, I can't find the reference where this logic is defined. ...
2
votes
1answer
63 views
FO(TC) lower bounding games?
Is anyone aware of any games/algebraic structures that provide lower-bounding methodologies for $FO(TC)$ formulae? I am aware of EF games as they apply to first-order and second-order statements, but ...
9
votes
1answer
211 views
What is the complexity of checking equivalence of two boolean formulae without NOT symbol?
Suppose I have two boolean formulae (propositions) $P_1$, and $P_2$ (can be assumed to be in CNF) over the same variables and such that there are no "NOT" symbols used. I.e. only conjunction and ...
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0answers
194 views
How do computers check if two functions are the same?
To prove that two given functions are the same involves proving infinitely many statements. I wonder how to implement so that a computer can check such a statement?
An easy example is the following: ...
0
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0answers
113 views
Fagin's Theorem implications
I was going through Fagin's Theorem (summary on wiki) and if I understood correctly Existential Second Order Logic (ESO) can be used to represent any NP problem, the same can be said for a Non-...
2
votes
0answers
85 views
Cover set of Boolean formulas with conjunctions
I want to cover a set of Boolean formulas (over the same variables) with disjunctive conjunctions. Here's an example with two formulas $p_1$ and $p_2$ over the set of variables $\{A, B, X, Y\}$:
I ...
10
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0answers
198 views
On Courcelle's question about Monadic second-order logic with cardinality predicates
I have found the following question at openproblemgarden.org:
The problem concerns the extension of Monadic Second Order Logic (over a binary relation representing the edge relation) with the ...
11
votes
0answers
315 views
Is unary $\Pi_2$-SUBSETSUM coNP-complete?
Consider the following problem:
for given integers $a_1, \ldots, a_{2n}$ and $A$ that are given in unary representation
define is it true that
for every $S \subseteq \{1, ..., 2n \}$ such that $|...
5
votes
0answers
80 views
Are there languages require many variables to achieve $\Sigma_n^0$ completeness?
The proof of Post's Theorem that I am familiar with assumes you have access to as many variables as you wish in your language. Matiyasevich's Theorem by contrast gives a $\Sigma_n^0$-complete formula ...
14
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0answers
198 views
Counting solutions to extended MSO formulas, and sampling — do these appear in the literature?
I am trying to determine if the literature contains various extensions of Courcelle's theorem. Since I haven't been able to find these in the literature, I guess that these are folklore results, or ...
2
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0answers
91 views
Forward chaining algorithms
I am interested in learning about the current state of the art regarding forward chaining production systems. I understand that things haven't changed much (regarding the basic algorithms) since 1995'...
6
votes
0answers
270 views
Reverse Skolemization?
I'm wondering if there are any references on "reverse skolemization", that is, converting a formula with functions into one purely consisting of quantifiers by eliminating function applications.
I'm ...
0
votes
1answer
368 views
How to build comparison operator (comparator) in an arithmetic circuit
I am trying to convert a basic program into an arithmetic circuit. I am stuck on the step of converting the greater than operator into an arithmetic circuit. To be specific, I do not know how to ...
5
votes
2answers
373 views
How do continuations represent negations (under the Curry–Howard correspondence)?
Under the Curry–Howard correspondence, types can be thought of as propositions, and values inhabiting a type can be thought of as proofs that the corresponding proposition is true. (E.g., the ...
3
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0answers
46 views
Extending the sequential calculus (logic over words) to allow a hierarchy of languages like the arithmetical hierarchy
Let $\Sigma$ be some finite alphabet. Then consider the logical language $\mathcal L = \{ R_a : a \in \Sigma \} \cup \{ <,= \}$ and first order formulas. For a given first order formula $\varphi$ a ...
3
votes
1answer
159 views
Reductions in Descriptive Complexity
Reducing one problem to another are well known in various settings, such as many-one, randomized, truth-table, logspace or a whole slew of other reductions. Descriptive complexity can alternately ...
2
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0answers
105 views
Notion of “quotient” or “inverse” for recognizable tree languages?
Related to my previous question but this time I have a better idea of what I'm actually asking.
I'm looking at the following operation on recognizable tree languages (i.e. regular tree grammars, ...
7
votes
2answers
803 views
What logic correponds via Curry-Howard to a Monad?
According to Moggi's 1991 paper "Notions of computation and monads" one can represent monadic equational logic with the well known monad $(T, \eta, \mu)$ with T an functor and the two natural ...
3
votes
2answers
182 views
Compactness of domino tilings
I've read in Lemma 2 of the paper 1 that if every square region of the plane admits a tiling, then the whole plain admits a tiling, but the proof is omitted. This sounds like a compactness property, ...
1
vote
1answer
126 views
Dependent C-style types with subtyping rule
I'm looking for previous work regarding an extension of a C-style type system in which types may have constraints and have a defined subtyping rule. In particular, I'm interested in defining algebra-...
9
votes
1answer
281 views
What is the reference for the proof Gödel's first incompleteness theorem based on the undecidability of the halting problem?
A weaker form of Gödel's First Incompleteness Theorem, direct proofs of which in Gödel's manner are lengthy, involved and at some place rather counter-intuitive, has a simple and intuitive proof based ...
10
votes
1answer
243 views
P and Descriptive Complexity
In the Complexity Zoo, it says [1] that, in descriptive complexity, $P$ can be defined by three different kind of formulae, $FO(LFP)$ which is also $FO(n^{O(1)})$, and also as $SO(HORN)$.
However, ...
6
votes
2answers
267 views
Is case analysis on normal forms of lambda terms sufficient to prove parametricity results?
There are many closed terms of a given type. For instance, both of these terms:
$$ \lambda x . x $$
$$ \lambda x . (\lambda y . y) x $$
have a type of a polymorphic identity function:
$$ \forall X ....
7
votes
3answers
345 views
When a type is a value?
In functional programming and in the theoretical setting of the $\lambda$-calculus it is standard to consider a lambda abstraction $\lambda x.M$ as a value. In my understanding, the intuitive reason ...
3
votes
1answer
267 views
Busy Beaver Equivalent for the Untyped Lambda Calculus
In the same way that the Busy Beaver function is defined for Turing Machines, we could define a similar function for the untyped lambda calculus:
Over all terms in the ULC composed of ...
11
votes
2answers
369 views
Hereditary substitution with a universe hierarchy
I've read about hereditary substitution for the Simple Lambda Calculus and for The Logical Framework with distinct terms and types.
I'm wondering, are there any examples of hereditary substitution in ...
9
votes
0answers
119 views
Results in denotational semantics from model theory?
Denotational semantics interpret the theories of various lambda calculi in various (set-theoretic, domain-theoretic, category-theoretic, game...) models. Let $T$ be the theory of one such lambda ...
9
votes
1answer
262 views
Understanding the Proof of Strong Normalization of the Calculus of Constructions
I have difficulties in understanding the proof of strong normalization for the calculus of constructions. I try to follow the proof in the paper of Herman Geuvers "A short and flexible proof of Strong ...
1
vote
1answer
83 views
Soft Truth Values in the PSL model
This might sound like a trivial question. But since am starting out with my research in an area that is entirely new to me, I would really appreciate it if someone could kindly elucidate what Soft ...
