Questions tagged [reference-request]
Reference-request is used when the author needs to know about work related to the question.
1,376
questions
7
votes
0answers
110 views
Subgraph isomorphism on graph sequences
I'm looking for a subgraph isomorphism algorithm that takes advantage of properties of graph sequences.
Say $\{G_i\}_{i=1}^k$ is a sequence of graphs on vertex set $\{1 ... n\}$, and two consecutive ...
2
votes
0answers
103 views
Proof systems induced by NP-complete problems
Satisfiability is the fundamental NP-complete problem. Cook-Reckhow theorem states that the existence of a propositional proof system that admits polynomial size proofs for all tautologies implies ...
6
votes
0answers
80 views
Programmatic higher inductive/inductive-inductive types with equalities between equalities
I can think of practical HITs in verified software that capture some form of alpha equivalence, context equivalence or the example which defines well-typed syntax of type theory from Signatures and ...
2
votes
0answers
90 views
Complexity of a scheduling problem with a fixed left bound of jobs
Consider the following scheduling problem. We have a finite set of jobs $\mathcal{J}= \{j_1, j_2, ..., j_n\}$ to do. Every job $j_i$ has its own value $c_i$ (the amount of money we are paid for ...
2
votes
2answers
107 views
On the coloring number of small graphs with small cliques
Given a parameter $k$, and a graph $G$ with $O(k^2)$ vertices that has a maximum clique with $\le k$ vertices, I want to investigate the maximum number of colors $C(k)$ needed to properly color $G$, i....
3
votes
1answer
126 views
Is this greedy algorithm for vertex cover studied before?
For the vertex cover problem (Given a graph $G$, find a minimum set $S$ of vertices such that $G - S$ is edgeless), there are two famous greedy algorithms. The edge greedy (finding an edge and taking ...
1
vote
0answers
105 views
How can I understand the Coppersmith–Winograd algorithm?
I want to do research on matrix multiplication algorithms. I glanced at the Coppersmith-Winograd algorithm paper, but I didn't understand anything. How can I complete the background to read this paper?...
3
votes
1answer
91 views
Embarrassingly Parallel: Formal Definition & Citation
I've been unable to find a good answer for this question: Formally, what makes a problem embarrassingly parallel? Intuitively, it would seem to me that an embarrassingly parallel problem is one where:
...
3
votes
1answer
326 views
Best parameterized algorithm for maximum clique
I have seen the basic algorithm for the maximum clique problem parameterized by the maximum degree at an algorithms course. However, I struggle to find anything better. Searching for things like "...
2
votes
0answers
100 views
Equational Theories for Type Systems
I was reading through Gunter's Semantics of Programming Languages: Structure and Techniques and in the second chapter on simply typed $\lambda$ calculus he introduces an equational theory with $\beta\...
1
vote
1answer
128 views
Fast Computation of First k Eigenvectors of Graph Laplacian
I'm looking for references for the following; Given the unnormalized Laplacian matrix of a graph $L = D - A, ~ L \in \mathbb{R}^{n\times n}$
Algorithm(s) to efficiently estimate the first $k$ (...
2
votes
0answers
184 views
Fast algorithms for evaluating functions with high Kolmogorov complexity
Motivation:
I am motivated by a concrete example that occurs in neuroscience, dendritic computation, which may be approximated by functions computable on binary trees [1]. To be more precise, I ...
1
vote
1answer
128 views
Kolmogorov Complexity of the composition of two computable functions
Let's suppose we encode two computable functions $f$ and $g$ as binary strings so $f,g \in \{0,1\}^*$. What I am curious about is whether we can find good upper and lower bounds for:
\begin{equation}...
3
votes
0answers
88 views
Isomorphic subforest problem
I recently read that the following problem is NP-Complete:
Given a tree $T$, and a forest $F$, is there a subgraph of $T$ isomorphic to $F$?
The reference provide was to the textbook “Computers and ...
14
votes
2answers
1k views
NP-hard problems with very fast exponential-time algorithms
NP-hard problems with very fast exact exponential-time algorithms, say with $O(1.01^n)$ time, are very rare.
Is any fact like
"For any constant $\epsilon>0$ there is an NP-hard 'natural' ...
1
vote
0answers
88 views
Weighted circular balls into bins
I would like to ask you for a help about modified balls into bins problem.
Consider $n$ weighted balls such that each ball has a weight $w_i$ that is at most $W$. Furthermore, each of $m$ bins has a ...
5
votes
1answer
189 views
If NP in BPP then NP equals RP
I am looking for a reference to the fact that if NP is included in BPP then NP is equal to RP. See for instance these links:
https://cs.stackexchange.com/q/80509
http://www.inf.ed.ac.uk/teaching/...
7
votes
2answers
160 views
Complexity of graph isomorphism with properly colored edges (ref. request)
An edge-colored graph $G$ is a graph whose edges are labeled with a color (generally represented by an integer). Such a coloring is proper if all adjacent edges in $G$ have different colors. I ...
5
votes
1answer
177 views
Is this a known problem, and is it #P-complete?
Let $G=(V,E)$ be an undirected graph. What I call a selection function of $G$ is a partial function $f:V \to E$ such that for every node $v$, if $f(v)$ is defined then it is one of the adjacent edges ...
3
votes
0answers
27 views
When was the dynamic array first used as an example for amortized analysis?
I'm writing a report on amortized analysis, and I'm using the example of a dynamic array to explain each method. I think it would be nice to add a reference to when this example was first used, as it ...
6
votes
2answers
144 views
$NP$-Completeness of $\epsilon$-balanced graph partitioning for fixed $\epsilon$
Consider this graph partitioning problem: Let $G = (V, E)$ be a simple undirected graph and $0 \leq \epsilon \leq 1, M \geq 0$ be constants. Are there disjoint subsets $V_1, V_2$ with $V = V_1 \cup ...
0
votes
1answer
150 views
A Simple Auction Game
You are playing the following game.
You have a budget of $B$ dollars. There are $n$ days. Every day $d$, you have to make a bid $b_d\geq0$ that does not exceed your budget. After making the bid, a ...
4
votes
0answers
94 views
Reconstructing a colored grid with vertical and horizontal shifts
Consider the following simple problem (puzzle): given
a $N \times N$ $c$-colored grid $G$
a $N \times N$ $c$-colored target grid $G_T$
a number $m$ represented in unary
Can we transform $G$ into $...
1
vote
0answers
68 views
communication complexity lower bound for computing median
In the textbook by Kushilevitz/Nisan, they give an $O(\log n)$-bit protocol for computing the median in the standard 2-party model of communication complexity, where Alice is given a set $X \subseteq [...
8
votes
1answer
385 views
PHOAS with extrinsic typing?
Parameterized Higher Order Abstract Syntax (PHOAS) is a representation of syntax trees that allows the host language's binding to be used to represent binding in the language being modelled, while ...
4
votes
0answers
67 views
Short $\exists$SO sentences over strings that define an NP-complete problem
[Q1] I'm wondering if there are some "official" SHORT existential second order sentences with ONE binary relation, over strings (over a small alphabet) that define an NP-complete set.
(Something ...
0
votes
0answers
48 views
Incompleteness and term extraction
Is there a formalization, which from a proof that a system includes enough arithmetic extracts an arithmetic sentence in the language of PA, which is not provable in the given system? Imagine the ...
9
votes
1answer
121 views
The source of the modular decomposition graph
When introducing graph modular decomposition, most authors use the 11-vertex graph, which I copy from wikipedia.
The question is who is (are) the original designer of it. (I'm not asking who drew ...
14
votes
1answer
346 views
Why is the Greedy Conjecture so difficult?
I recently learned about the Greedy conjecture for the Shortest Superstring Problem.
In this problem, we are given a set of strings $s_1,\dots, s_n$ and we want to find the shortest superstring $s$ ...
4
votes
0answers
97 views
Eliminating tautological axioms in tree-like $k$-DNF resolution
The propositional proof system $k$-DNF-resolution, a.k.a. $Res(k)$, is a generalization of propositional resolution, where the lines in a proof are $k$-DNF formulas, i.e., disjunctions of $k$-terms of ...
8
votes
0answers
151 views
A canonical complete problem for EXP and NEXP in terms of formulae
3SAT is a complete problem for NP. TQBF is a complete problem for PSPACE.
Is there direct way to define canonical complete problems for EXP and NEXP in terms of boolean formulae? I have only seen ...
7
votes
1answer
330 views
On theoretical aproaches for solving $\mathsf{SAT}$ in special cases
In what cases $\mathsf{SAT}$ can be solved in polynomial time?
I know two cases: $2$-$\mathsf{SAT}$ and Horn-$\mathsf{SAT}$.
Question 1: Is there a reference with algorithms for solving $\mathsf{...
4
votes
2answers
157 views
What are some good resources for strengthening my theoretical foundation for machine learning?
I'm a computer science major and I'm taking a lot of machine learning courses. I'm finding that my theoretical foundation on subjects like calculus and linear algebra are not as strong as I'd like ...
7
votes
3answers
269 views
Can Non-termination be considered an algebraic effect?
Non-termination is sometimes considered an effect. I have been reading about algebraic effect systems (What is algebraic about algebraic effects and handlers?), and I suspect non-termination (like ...
4
votes
1answer
122 views
Satisfiability problems with restricted (not bounded) number of occurrences per variable
Intro
It is known that SAT is hard even when restricted to, e.g., formulas with exactly 3 literals per clause and at most 4 occurrences per variable. On the other hand it is easy if there are exactly ...
5
votes
1answer
155 views
Counting avoiding improper 3-colorings
Given a graph $G=(V,E)$, what I call an improper $3$-coloring of $G$ is simply a function $c:V \to \{1,2,3\}$. I say that $c$ is $1$-$2$-avoiding when
there do not exist two adjacent nodes $u,v$ with $...
4
votes
0answers
125 views
Characterizing the ANF of Single-Cycle Boolean Permutations
Given a function $F: \{0, 1\}^n \to \{0, 1\}^n$, we say that $F$ is a boolean permutation (also sometimes called a vectorial boolean function or an s-box in the literature) if $F$ is a bijection. We ...
3
votes
0answers
110 views
Earliest forbidden subgraph characterisation
I wonder, what was the first non-trivial graph class for which there was a forbidden (induced) subgraph characterisation ?
Of course, bipartite graph is one example but I am considering it as trivial ...
5
votes
1answer
232 views
The asymptotic behavior of a recurrence related to stable matchings
I would like to provide asymptotic estimates for a sequence defined (for n a power of 2) as follows:
$$a_1 = 1, a_2 = 2$$
$$a_n = 3a_{n/2}^2 - 2a_{n/4}^4$$
Apparently, Knuth was able to prove that ...
9
votes
1answer
203 views
Proof for Upper Bound of Sum of Square Roots Problem
In [1], Garey et al. identify what would later be known as the Sum of Square Roots Problem in the course of working out the NP-completeness of Euclidean TSP.
Given integers $a_1, a_2, \ldots, a_n$ ...
4
votes
2answers
164 views
reference request for construction of expanders
I'm looking for a good exposition of the explicit constructive proof of the existence of expander graph families due to Reingold Vadhan and Wigderson. Arora/Barak has a chapter on it, but i find it ...
2
votes
0answers
81 views
Common techniques for the acyclic orientation problem under some special constraint?
An acyclic orientation of an undirected graph is an assignment of a direction to each edge(an orientation) that does not form any directed cycle and therefore generates a directed acyclic graph(DAG). ...
-1
votes
1answer
123 views
Gödel-Numbering of the Context-Sensitive Languages
I would like to have a Gödel-numbering of the context-sensitive languages. Because there is no obvious syntactic distinction between LBAs and TMs, I cannot number the former in an immediate way. So I ...
2
votes
0answers
118 views
Book recommendation treewidth
I am searching for a good book (or survey paper) on treewidth. I would be delighted if the book/paper surveys multiple approaches to treewidth (eg: structural, algorithmic, `language-theoretic') and ...
4
votes
1answer
141 views
The theory of definitions in first order logic
I'm looking for a clear and thorough treatment of the theory of definitions in first order predicate logic from a syntactic/proof theoretic point of view (as opposed to semantic/model theoretic point ...
4
votes
1answer
107 views
A first order logic extended with binding terms like the familiar set descriptors $\{x:\varphi\}$
First order logic comes equipped with two kinds of terms:
Variable: those terms of the form $x$ for some variable $x$, of which there are infinite.
Function application: those terms of the form $f(...
5
votes
0answers
186 views
Generalization of Element Distinctness
In the element distinctness problem, one has query access to an arbitrary multiset of $n$ elements and must decide whether they are all distinct.
From a property testing point of view, the question ...
2
votes
1answer
157 views
Possibility of hierarchy with $UP$ class?
I am not sure if this is a cheap query. However I am unable to find this myself. So I am posting here. The standard complexity class is built with $NP$ and $coNP$ and leads up to $PSPACE$. The ...
7
votes
0answers
249 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 ...
5
votes
1answer
170 views
Does the following type of hitting problem have a name?
Given a ground set, say $[n]=\{1,2,\dots,n\}$, and a collection of subset families $\mathcal F_i\subseteq 2^{[n]}$, $i=1,2,\dots,m$, I want to select $m$ sets $B_i\in\mathcal F_i$ such that the ...
