Smallest cubic and quartic graphs with a given number of cutpoints and bridges

For positive integersbandc, withceven, satisfying the inequalitiesb+1≤c≤2b, the minimum order of a connected cubic graph withbbridges andccutpoints is computed. Furthermore, the structure of all such smallest cubic graphs is determined. For each positive integerc, the minimum order of a quartic graph withccutpoints is calculated. Moreover, the structure and number of all such smallest quartic graphs are determined.

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Detection number of bipartite graphs and cubic graphs

Discrete Mathematics & Theoretical Computer Science ◽

10.46298/dmtcs.642 ◽

2014 ◽

Vol Vol. 16 no. 3 ◽

Author(s):

Frederic Havet ◽

Nagarajan Paramaguru ◽

Rathinaswamy Sampathkumar

Keyword(s):

Positive Integer ◽

Bipartite Graph ◽

Connected Graph ◽

Minimum Degree ◽

Bipartite Graphs ◽

Sufficient Condition ◽

Cubic Graphs ◽

Cubic Graph ◽

International Audience ◽

Np Complete

International audience For a connected graph G of order |V(G)| ≥3 and a k-labelling c : E(G) →{1,2,…,k} of the edges of G, the code of a vertex v of G is the ordered k-tuple (ℓ1,ℓ2,…,ℓk), where ℓi is the number of edges incident with v that are labelled i. The k-labelling c is detectable if every two adjacent vertices of G have distinct codes. The minimum positive integer k for which G has a detectable k-labelling is the detection number det(G) of G. In this paper, we show that it is NP-complete to decide if the detection number of a cubic graph is 2. We also show that the detection number of every bipartite graph of minimum degree at least 3 is at most 2. Finally, we give some sufficient condition for a cubic graph to have detection number 3.

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Some Results on the Structure of Multipoles in the Study of Snarks

The Electronic Journal of Combinatorics ◽

10.37236/3629 ◽

2015 ◽

Vol 22 (1) ◽

Cited By ~ 1

Author(s):

M. A. Fiol ◽

J. Vilaltella

Keyword(s):

Lower Bound ◽

Edge Coloring ◽

The State ◽

Cubic Graphs ◽

Cubic Graph ◽

Minimum Order ◽

Exact Number ◽

Empty Subset ◽

Free Edges

Multipoles are the pieces we obtain by cutting some edges of a cubic graph in one or more points. As a result of the cut, a multipole $M$ has vertices attached to a dangling edge with one free end, and isolated edges with two free ends. We refer to such free ends as semiedges, and to isolated edges as free edges. Every 3-edge-coloring of a multipole induces a coloring or state of its semiedges, which satisfies the Parity Lemma. Multipoles have been extensively used in the study of snarks, that is, cubic graphs which are not 3-edge-colorable. Some results on the states and structure of the so-called color complete and color closed multipoles are presented. In particular, we give lower and upper linear bounds on the minimum order of a color complete multipole, and compute its exact number of states. Given two multipoles $M_1$ and $M_2$ with the same number of semiedges, we say that $M_1$ is reducible to $M_2$ if the state set of $M_2$ is a non-empty subset of the state set of $M_1$ and $M_2$ has less vertices than $M_1$. The function $v(m)$ is defined as the maximum number of vertices of an irreducible multipole with $m$ semiedges. The exact values of $v(m)$ are only known for $m\le 5$. We prove that tree and cycle multipoles are irreducible and, as a byproduct, that $v(m)$ has a linear lower bound.

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Exponential Domination in Subcubic Graphs

The Electronic Journal of Combinatorics ◽

10.37236/5711 ◽

2016 ◽

Vol 23 (4) ◽

Cited By ~ 1

Author(s):

Stéphane Bessy ◽

Pascal Ochem ◽

Dieter Rautenbach

Keyword(s):

Dominating Set ◽

Domination Number ◽

Discrete Math ◽

Cubic Graphs ◽

Cubic Graph ◽

Minimum Order ◽

Natural Variant ◽

Dominating Set Problem ◽

Subcubic Graphs ◽

Domination In Graphs

As a natural variant of domination in graphs, Dankelmann et al. [Domination with exponential decay, Discrete Math. 309 (2009) 5877-5883] introduced exponential domination, where vertices are considered to have some dominating power that decreases exponentially with the distance, and the dominated vertices have to accumulate a sufficient amount of this power emanating from the dominating vertices. More precisely, if $S$ is a set of vertices of a graph $G$, then $S$ is an exponential dominating set of $G$ if $\sum\limits_{v\in S}\left(\frac{1}{2}\right)^{{\rm dist}_{(G,S)}(u,v)-1}\geq 1$ for every vertex $u$ in $V(G)\setminus S$, where ${\rm dist}_{(G,S)}(u,v)$ is the distance between $u\in V(G)\setminus S$ and $v\in S$ in the graph $G-(S\setminus \{ v\})$. The exponential domination number $\gamma_e(G)$ of $G$ is the minimum order of an exponential dominating set of $G$.In the present paper we study exponential domination in subcubic graphs. Our results are as follows: If $G$ is a connected subcubic graph of order $n(G)$, then $$\frac{n(G)}{6\log_2(n(G)+2)+4}\leq \gamma_e(G)\leq \frac{1}{3}(n(G)+2).$$ For every $\epsilon>0$, there is some $g$ such that $\gamma_e(G)\leq \epsilon n(G)$ for every cubic graph $G$ of girth at least $g$. For every $0<\alpha<\frac{2}{3\ln(2)}$, there are infinitely many cubic graphs $G$ with $\gamma_e(G)\leq \frac{3n(G)}{\ln(n(G))^{\alpha}}$. If $T$ is a subcubic tree, then $\gamma_e(T)\geq \frac{1}{6}(n(T)+2).$ For a given subcubic tree, $\gamma_e(T)$ can be determined in polynomial time. The minimum exponential dominating set problem is APX-hard for subcubic graphs.

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On the Ternary Exponential Diophantine Equation Equating a Perfect Power and Sum of Products of Consecutive Integers

Mathematics ◽

10.3390/math9151813 ◽

2021 ◽

Vol 9 (15) ◽

pp. 1813

Author(s):

S. Subburam ◽

Lewis Nkenyereye ◽

N. Anbazhagan ◽

S. Amutha ◽

M. Kameswari ◽

...

Keyword(s):

Positive Integer ◽

Diophantine Equation ◽

Upper Bound ◽

Exponential Diophantine Equation ◽

Research Article ◽

All Solutions ◽

Sum Of Products ◽

Consecutive Integers ◽

Sums Of Products ◽

Positive Integers

Consider the Diophantine equation yn=x+x(x+1)+⋯+x(x+1)⋯(x+k), where x, y, n, and k are integers. In 2016, a research article, entitled – ’power values of sums of products of consecutive integers’, primarily proved the inequality n= 19,736 to obtain all solutions (x,y,n) of the equation for the fixed positive integers k≤10. In this paper, we improve the bound as n≤ 10,000 for the same case k≤10, and for any fixed general positive integer k, we give an upper bound depending only on k for n.

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Congruences involving alternating harmonic sums modulo pα qβ

Mathematica Slovaca ◽

10.1515/ms-2017-0159 ◽

2018 ◽

Vol 68 (5) ◽

pp. 975-980

Author(s):

Zhongyan Shen ◽

Tianxin Cai

Keyword(s):

Positive Integer ◽

Positive Integers ◽

Mod P

Abstract In 2014, Wang and Cai established the following harmonic congruence for any odd prime p and positive integer r, $$\sum_{\begin{subarray}{c}i+j+k=p^{r}\\ i,j,k\in\mathcal{P}_{p}\end{subarray}}\frac{1}{ijk}\equiv-2p^{r-1}B_{p-3} \quad\quad(\text{mod} \,\, {p^{r}}),$$ where $ \mathcal{P}_{n} $ denote the set of positive integers which are prime to n. In this note, we obtain the congruences for distinct odd primes p, q and positive integers α, β, $$ \sum_{\begin{subarray}{c}i+j+k=p^{\alpha}q^{\beta}\\ i,j,k\in\mathcal{P}_{2pq}\end{subarray}}\frac{1}{ijk}\equiv\frac{7}{8}\left(2-% q\right)\left(1-\frac{1}{q^{3}}\right)p^{\alpha-1}q^{\beta-1}B_{p-3}\pmod{p^{% \alpha}} $$ and $$ \sum_{\begin{subarray}{c}i+j+k=p^{\alpha}q^{\beta}\\ i,j,k\in\mathcal{P}_{pq}\end{subarray}}\frac{(-1)^{i}}{ijk}\equiv\frac{1}{2}% \left(q-2\right)\left(1-\frac{1}{q^{3}}\right)p^{\alpha-1}q^{\beta-1}B_{p-3}% \pmod{p^{\alpha}}. $$

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Partitioning the positive integers with higher order recurrences

International Journal of Mathematics and Mathematical Sciences ◽

10.1155/s0161171291000625 ◽

1991 ◽

Vol 14 (3) ◽

pp. 457-462 ◽

Cited By ~ 1

Author(s):

Clark Kimberling

Keyword(s):

Positive Integer ◽

Positive Root ◽

Irrational Number ◽

Higher Order ◽

Typical Result ◽

Algebraic Integers ◽

Positive Integers

Associated with any irrational numberα>1and the functiong(n)=[αn+12]is an array{s(i,j)}of positive integers defined inductively as follows:s(1,1)=1,s(1,j)=g(s(1,j−1))for allj≥2,s(i,1)=the least positive integer not amongs(h,j)forh≤i−1fori≥2, ands(i,j)=g(s(i,j−1))forj≥2. This work considers algebraic integersαof degree≥3for which the rows of the arrays(i,j)partition the set of positive integers. Such an array is called a Stolarsky array. A typical result is the following (Corollary 2): ifαis the positive root ofxk−xk−1−…−x−1fork≥3, thens(i,j)is a Stolarsky array.

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The Divisibility of Divisor Functions

Proceedings of the Glasgow Mathematical Association ◽

10.1017/s2040618500034274 ◽

1961 ◽

Vol 5 (1) ◽

pp. 35-40 ◽

Cited By ~ 6

Author(s):

R. A. Rankin

Keyword(s):

Positive Integer ◽

Divisor Functions ◽

Image Position ◽

Positive Integers

For any positive integers n and v letwhere d runs through all the positive divisors of n. For each positive integer k and real x > 1, denote by N(v, k; x) the number of positive integers n ≦ x for which σv(n) is not divisible by k. Then Watson [6] has shown that, when v is odd,as x → ∞; it is assumed here and throughout that v and k are fixed and independent of x. It follows, in particular, that σ (n) is almost always divisible by k. A brief account of the ideas used by Watson will be found in § 10.6 of Hardy's book on Ramanujan [2].

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Lower Bounds For Induced Forests in Cubic Graphs

Canadian Mathematical Bulletin ◽

10.4153/cmb-1987-028-5 ◽

1987 ◽

Vol 30 (2) ◽

pp. 193-199 ◽

Cited By ~ 14

Author(s):

J. A. Bondy ◽

Glenn Hopkins ◽

William Staton

Keyword(s):

Lower Bound ◽

Lower Bounds ◽

Cubic Graphs ◽

Cubic Graph

AbstractIf G is a connected cubic graph with ρ vertices, ρ > 4, then G has a vertex-induced forest containing at least (5ρ - 2)/8 vertices. In case G is triangle-free, the lower bound is improved to (2ρ — l)/3. Examples are given to show that no such lower bound is possible for vertex-induced trees.

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Solution of certain Pell equations

Asian-European Journal of Mathematics ◽

10.1142/s1793557118500560 ◽

2018 ◽

Vol 11 (04) ◽

pp. 1850056 ◽

Cited By ~ 1

Author(s):

Zahid Raza ◽

Hafsa Masood Malik

Keyword(s):

Positive Integer ◽

Fundamental Solution ◽

Positive Solutions ◽

Continued Fraction ◽

Pell Equation ◽

Lucas Sequences ◽

Pell Equations ◽

Integer Solutions ◽

Positive Integers

Let [Formula: see text] be any positive integers such that [Formula: see text] and [Formula: see text] is a square free positive integer of the form [Formula: see text] where [Formula: see text] and [Formula: see text] The main focus of this paper is to find the fundamental solution of the equation [Formula: see text] with the help of the continued fraction of [Formula: see text] We also obtain all the positive solutions of the equations [Formula: see text] and [Formula: see text] by means of the Fibonacci and Lucas sequences.Furthermore, in this work, we derive some algebraic relations on the Pell form [Formula: see text] including cycle, proper cycle, reduction and proper automorphism of it. We also determine the integer solutions of the Pell equation [Formula: see text] in terms of [Formula: see text] We extend all the results of the papers [3, 10, 27, 37].

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ON INTEGER SEQUENCES GENERATED BY LINEAR MAPS

Glasgow Mathematical Journal ◽

10.1017/s0017089508004655 ◽

2009 ◽

Vol 51 (2) ◽

pp. 243-252

Author(s):

ARTŪRAS DUBICKAS

Keyword(s):

Lower Bound ◽

Positive Integer ◽

Real Number ◽

Constant Independent ◽

Integer Sequences ◽

Real Numbers ◽

Complexity Function ◽

Linear Maps ◽

Coprime Integers ◽

Positive Integers

AbstractLetx0<x1<x2< ⋅⋅⋅ be an increasing sequence of positive integers given by the formulaxn=⌊βxn−1+ γ⌋ forn=1, 2, 3, . . ., where β > 1 and γ are real numbers andx0is a positive integer. We describe the conditions on integersbd, . . .,b0, not all zero, and on a real number β > 1 under which the sequence of integerswn=bdxn+d+ ⋅⋅⋅ +b0xn,n=0, 1, 2, . . ., is bounded by a constant independent ofn. The conditions under which this sequence can be ultimately periodic are also described. Finally, we prove a lower bound on the complexity function of the sequenceqxn+1−pxn∈ {0, 1, . . .,q−1},n=0, 1, 2, . . ., wherex0is a positive integer,p>q> 1 are coprime integers andxn=⌈pxn−1/q⌉ forn=1, 2, 3, . . . A similar speculative result concerning the complexity of the sequence of alternatives (F:x↦x/2 orS:x↦(3x+1)/2) in the 3x+1 problem is also given.

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