2021
53
1
0
151
1

Fr'echetLike Distances between Two Rooted Trees
https://jac.ut.ac.ir/article_81145.html
1
The purpose of this paper is to extend the definition of Fr'echet distance which measures the distance between two curves to a distance (Fr'echetLike distance) which measures the similarity between two rooted trees.In this paper, I prove that the Fr'echetLike distance between two trees is SNPhard to compute. Later, I modify the definition of Fr'echetLike distance to measure the distance between two merge trees, and I prove the relation between the interleaving distance and the modified Fr'echetLike distance.
0

1
12


Elena
Farahbakhsh Touli
Stockholm University, Department of Mathematics
Iran
elena.touli@math.su.se
Merge trees
Fr'echet distance
Fr'echetLike distance
modified Fr'echetLike distance
interleaving distance
1

$4$total mean cordial labeling of special graphs
https://jac.ut.ac.ir/article_81169.html
1
Let $G$ be a graph. Let $f:Vleft(Gright)rightarrow left{0,1,2,ldots,k1right}$ be a function where $kin mathbb{N}$ and $k>1$. For each edge $uv$, assign the label $fleft(uvright)=leftlceil frac{fleft(uright)+fleft(vright)}{2}rightrceil$. $f$ is called $k$total mean cordial labeling of $G$ if $leftt_{mf}left(iright)t_{mf}left(jright) right leq 1$, for all $i,jinleft{0, 1, ldots, k1right}$, where $t_{mf}left(xright)$ denotes the total number of vertices and edges labelled with $x$, $xinleft{0,1,2,ldots,k1right}$. A graph with admit a $k$total mean cordial labeling is called $k$total mean cordial graph.
0

13
22


R
Ponraj
Department of Mathematics
Sri Parakalyani College
Alwarkurichi 627 412, India
Iran
ponrajmaths@gmail.com


S
SUBBULAKSHMI
Sri Paramakalyani College
Alwarkurichi627412, Tamilnadu, India
Iran
ssubbulakshmis@gmail.com


S
Somasundaram
Department of Mathematics
Manonmaniam sundarnar university, Abishekapatti, Tirunelveli627012,
Tamilnadu, India
Iran
somutvl@gmail.com
1

A New Numerical Solution for System of Linear Equations
https://jac.ut.ac.ir/article_81267.html
1
In this paper we have developed a numerical method for solving system of linear equations through taking advantages of properties of repetitive tridiagonal matrices. A system of linear equations is usually obtained in the final step of many science and engineering problems such as problems involving partial differential equations. In the proposed algorithm, the problem is first solved for repetitive tridiagonal matrices (i.e., system of linear equations) and a closedfrom relationship is obtained. This relationship is then used for solving a general matrix through converting the matrix into a repetitive tridiagonal matrix and a remaining matrix that is moved to the righthand side of the equation. Therefore, the problem is converted into a repetitive tridiagonal matrix problem where we have a vector of unknowns on the righthand side (in addition to the lefthand side) of the equation. The problem is solved iteratively by first using an initial guess to define the vector on the righthand side of the equation and then solving the problem using the closedfrom relationship for repetitive tridiagonal matrices. The new obtained solution is then substituted in the righthand side of the equation and the tridiagonal problem is solved again. This process is carried out iteratively until convergence is achieved. Computational complexity of the method is investigated and efficiency of the method is shown through several examples. As indicated in the examples, one of the advantages of the proposed method is its high rate of convergence in problems where the given matrix includes large offdiagonal entries. In such problems, methods like Jacobi, GaussSeidel, and Successive OverRelaxation will either have a low rate of convergence or be unable to converge.
0

23
39


Iman
Shojaei
Align Technology Inc, San Jose, CA 95134, USA
Iran
shojaei.iman@gmail.com


Hossein
Rahami
School of Engineering Science, College of Engineering, University of Tehran, Tehran, Iran
Iran
hrahami@ut.ac.ir
1

$alpha$Gap Greedy Spanner
https://jac.ut.ac.ir/article_81307.html
1
In this paper, we have introduced a new geometric spanner called $alpha$Gap greedy spanner, which is a parametric approximation of the wellknown Gapgreedy spanner. We will show theoretically and experimentally that this spanner is similar to the Gapgreedy spanner in terms of qualitative features such as weight and maximum degree of vertices. %Wehave shown that this spanner can be computed in $O(n^2 log n)$ time with$O(n)$ space, and $O(n log n)$ expected time on the set of points placedrandomly in a unit square.Two algorithms have been proposed with running time $O(n^2 log n)$ for constructing the $alpha$Gap greedy spanner. Space complexity of the first algorithm is $O(n^2)$, but it is reduced to $O(n)$ in the second one. %The proposed algorithms have a parameter, called $alpha$, by which the similarity of the $alpha$Gap greedy spanner to the Gapgreedy spanner, in terms of quality features mentioned above, can be determined. Also, we have shown on the points placed randomly in a unit square, the $alpha$Gap greedy spanner can be constructed in the expected $O(n log n)$ time.
0

41
60


Hosein
Salami
Department of Computer Engineering, Ferdowsi University of Mashhad
Iran
hossein.salami@mail.um.ac.ir


Mostafa
Nouri Baygi
Department of Computer Engineering, Ferdowsi University of Mashhad, Mashhad, Iran
Iran
nouribaygi@um.ac.ir
computational geometry
geometric spanners
gap greedy spanner
construction algorithms
algorithm complexity
1

Signature GOA: A novel comfort zone parameter adjustment using fuzzy signature for task scheduling in cloud environment
https://jac.ut.ac.ir/article_81539.html
1
Task scheduling in cloud computing plays an essential role for service provider to enhance its quality of service. Grasshopper Optimization Algorithm (GOA) is an evolutionary computation technique developed by emulating the swarming behavior of grasshoppers while searching for food. GOA is easy to implement but it cannot make full utilization of every iteration, and there is a risk of falling into the local optimal. This paper proposes a suitable approach for adjusting the comfort zone parameter based on the fuzzy signatures called signature GOA (SGOA) to balance exploration and exploitation. Then, we propose task scheduling based on SGOA by considering different objectives such as completion time, delay, and the load balancing on the machines. Finally, different algorithms such as Particle Swarm Optimization (PSO), Simulated Annealing (SA), Tabu Search (TS), and multiobjective genetic algorithm, are used for comparison. The results show that among all algorithms, SGOA can be successful in much less iteration.
0

61
95


Aboozar
Zandvakili
Department of Computer Science, Shahid Bahonar University of Kerman, Kerman, Iran
Iran
zandvakili.a@gmail.com


Najme
Mansouri
Department of Computer science, Shahid Bahonar University of Kerman, Kerman, Iran
Iran
najme.mansouri@gmail.com


Mohammad
Javidi
Department of Computer Science, Shahid Bahonar University of Kerman, Kerman, Iran
Iran
javidi@uk.ac.ir
Task scheduling
Fuzzy signature
Multiobjective optimization
1

A Numerical Method for Eigensolution of Tridiagonal Matrices
https://jac.ut.ac.ir/article_81543.html
1
In this paper we have developed an iterative method to solve eigenproblem for nonrepetitive tridiagonal matrices. The importance of eigensolution for tridiagonal matrices is that in many algorithms the eigneproblem for an arbitrary matrix is first converted to the eigenproblem for a tridiagonal matrix and then the problem is tackled. Our proposed method was developed through taking advantages of some unique properties of repetitive and nonrepetitive tridiagonal matrices. First, we established closedform solutions for the system of linear equations $ bf{Mx=f} $ for the condition $ mathbf{M} $ is tridiagonal. When $ mathbf{M} $ is a repetitive tridiagonal matrix, the unknown vector $ mathbf{x} $, the vector $ mathbf{f} $, and the coefficient matrix $ mathbf{M} $ are expanded using orthogonal basis of matrix $ mathbf{M} $ and closedform relationships are obtained. For nonrepetitive matrix $ mathbf{M} $, the tridiagonal matrix algorithm is used to efficiently solve the matrix equation. We then using orthogonal basis of matrix $ mathbf{M} $ and closedform relationships are obtained. For nonrepetitive matrix $ mathbf{M} $, the tridiagonal matrix algorithm is used to efficiently solve the matrix equation. We then implemented these solutions in an iterative relationship for eigenproblem where eigenpairs of nonrepetitive tridiagonal matrices were obtained through successive solution of the tridiagonal matrix equation efficiently solved above. Furthermore, closedform relationships for eigenpairs of repetitive tridiagonal matrices were implemented in the algorithm as start point for eigensolution of nonrepetitive tridiagonal matrices so that the required number of iterations was significantly reduced. Computational complexity of the proposed method is $ O(n^2) $ that is competitive with the best existing algorithms in literature. As indicated through several numerical examples, the advantages of the proposed algorithm include high rate of convergence, computational efficiency in each iteration, simple implementation, and availability of an objective start point for initialization.
0

97
115


Iman
Shojaei
Align Technology Inc, San Jose, CA 95134, USA
Iran
shojaei.iman@gmail.com


Hossein
Rahami
School of Engineering Science, College of Engineering, University of Tehran, Tehran, Iran
Iran
hrahami@ut.ac.ir
iterative method
eigensolution
repetitive tridiagonal matrices
nonrepetitive tridiagonal matrices
Efficient Solution
system of linear equations
1

An Alternative Proof for a Theorem of R.L. Graham Concerning CHEBYSHEV Polynomials
https://jac.ut.ac.ir/article_81593.html
1
In this paper, an alternative proof is provided for a theorem of R.L.Graham concerning Chebyshev polynomials. While studying the properties of a double star, R.L.Graham [2] proved a theorem concerning Chebyshev polynomials of the first kind ${T_n (x)}$. The purpose of this paper is to provide an alternative proof for his theorem. Our method is based on the divisibility properties of the natural numbers. One may observe that the Chebyshev polynomials evaluated at integers considered by R.L.Graham match with the solutions of the Pell's equation for a general, squarefree $D in N$.
0

117
122


A.M.S..
Ramasamy
Department of Mathematics, Pondicherry University, Pondicherry, India
Iran
amsramasamy@gmail.com


R
Ponraj
Department of Mathematics
Sri Parakalyani College
Alwarkurichi 627 412, India
Iran
ponrajmaths@gmail.com
Chebyshev polynomials
Pell's equation
prime factorization
1

On the Minimum of True Matches in Exact Graph Matching with Simulated Annealing
https://jac.ut.ac.ir/article_81628.html
1
Graph matching is one of the most important problems in graph theory and combinatorial optimization, with many applications in various domains. Although metaheuristic algorithms have had good performance on many NPHard and NPComplete problems, but for graph matching problem, there were not reported superior solutions by these sort of algorithms. The reason of this inefficiency has not been investigated yet. In this paper it has been shown that Simulated Annealing (SA) as an instance of a metaheuristic method is unlikely to be even close to the optimal solution for this problem. Mathematical and experimental results showed that the chance to reach to a partial solution, is very low, even for small number of true matches. In addition to theoretical discussion, the experimental results also verified our idea; for example, in two sample graphs with $10000$ vertices, the probability of reaching to a solution with at least three correct matches is about $0.02$ with simulated annealing.
0

123
134


Hashem
Ezzati
Department of Computer Science, Amir Kabir University of Technology, Tehran, Iran
Iran
h.ezzati@aut.ac.ir


Mahmood
Amintoosi
Faculty of Mathematics and Computer science, Hakim Sabzevari University, Sabzevar, Iran
Iran
m.amintoosi@hsu.ac.ir


Hashem
Tabasi
Department of Computer Science, Damghan University
Iran
tabasi@du.ac.ir
Graph matching
Simulated Annealing
Metaheuristic
Stochastic Optimization
1

A fast algorithm for the linear programming problem constrained with the Weighted power mean  Fuzzy Relational Equalities (WPMFRE)
https://jac.ut.ac.ir/article_81633.html
1
In this paper, a linear programming problem is investigated in which the feasible region is formed as a special type of fuzzy relational equalities (FRE). In this type of FRE, fuzzy composition is considered as the weighted power mean operator (WPM). Some theoretical properties of the feasible region are derived and some necessary and sufficient conditions are also presented to determine the feasibility of the problem. Moreover, two procedures are proposed for simplifying the problem. Based on some structural properties of the problem, an algorithm is presented to find the optimal solutions and finally, an example is described to illustrate the algorithm.
0

135
148


Amin
Ghodousian
Faculty of Engineering Science, College of Engineering, University of Tehran, P.O.Box 113654563, Tehran, Iran.
Iran
a.ghodousian@ut.ac.ir


Sara
Zal
University of Tehran, Department of Algorithms and Computation
Iran
sarazl1392@gmail.com
Fuzzy relational equalities
mean operators
weighted power mean
fuzzy compositions
Linear programming
1

Pair Difference Cordiality of Some Snake and Butterfly Graphs
https://jac.ut.ac.ir/article_81649.html
1
noindent Let $G = (V, E)$ be a $(p,q)$ graph.\Define begin{equation*}rho =begin{cases}frac{p}{2} ,& text{if $p$ is even}\frac{p1}{2} ,& text{if $p$ is odd}\end{cases}end{equation*}\ and $L = {pm1 ,pm2, pm3 , cdots ,pmrho}$ called the set of labels.\noindent Consider a mapping $f : V longrightarrow L$ by assigning different labels in L to the different elements of V when p is even and different labels in L to p1 elements of V and repeating a label for the remaining one vertex when $p$ is odd.The labeling as defined above is said to be a pair difference cordial labeling if for each edge $uv$ of $G$ there exists a labeling $leftf(u)  f(v)right$ such that $leftDelta_{f_1}  Delta_{f_1^c}right leq 1$, where $Delta_{f_1}$ and $Delta_{f_1^c}$ respectively denote the number of edges labeled with $1$ and number of edges not labeled with $1$. A graph $G$ for which there exists a pair difference cordial labeling is called a pair difference cordial graph. In this paper we investigate the pair difference cordial labeling behavior of some snake and butterfly graphs.
0

149
163


R
Ponraj
Department of Mathematics
Sri Parakalyani College
Alwarkurichi 627 412, India
Iran
ponrajmaths@gmail.com


A
Gayathri
Research Scholor,Reg.No:20124012092023
Department of Mathematics
Manonmaniam Sundaranar University,
Abhishekapati,Tirunelveli–627 012, India
Iran
gayugayathria555@gmail.com


S
Somasundaram
Department of Mathematics
Manonmaniam sundarnar university, Abishekapatti, Tirunelveli627012,
Tamilnadu, India
Iran
somutvl@gmail.com
Triangular snake
Alternate triangular snake
Quadrilatral Snake
Alternate Quadrilatral Snake
Butter fly
1

Use of Digital Image Watermarking to Enhance the Security of Graphical Password Authentication
https://jac.ut.ac.ir/article_81653.html
1
There are several techniques for implement an authentication system for computers that most commonly use the clear text password. One of the security problems is the use of a text password, the lack of choosing a complicated password by users due to forgetting, and being guessable and retrieved by attackers. One of the methods for passing text passwords is the use of graphical password authentication systems that increase the amount of forgetting passwords by using images instead of text characters. In this paper, the security challenges of using a graphical password are discussed. Then, explain a method for using the watermarking digital image for the authentication process and providing an algorithm suitable for watermarking and enhance the security of graphical password authentication system, and its quantitative and qualitative security parameters will be examined.
0

165
180


Saeid
Sadeghi
Department of computer engineering, Islamic azad unievrsity (central branch), Tehran, Iran
Iran
saeid.sadeghi71@gmail.com


Kooroush
Manochehri
Department of computer engineering, Amirkabir university of Technology, Tehran, Iran
Iran
kmanochehri@aut.ac.ir


mohsen
jahanshahi
Department of Computer Engineering.Software, Islamic Azad University, Central Tehran Branch, Tehran,Iran
Iran
mjahanshahi@iauctb.ac.ir
Digital Image
Watermarking
Graphical Password
Computer Security
authentication
1

A Survey on Tenacity Parameter\Part I
https://jac.ut.ac.ir/article_81721.html
1
If we think of the graph as modeling a network, the vulnerability measurethe resistance of the network to disruption of operation after the failure of certainstations or communication links. In assessing the "vulnerability"of a graph one determines the extent to which the graph retains certainproperties after the removal of vertices and / or edges. Many graph theoretical parameters have been used to describe the vulnerability of communication networks, including connectivity, integrity, toughness, binding number, tenacity and... . In this paper we survey and discuss tenacity and its properties in vulnerability calculation and we will comparedifferent measures of vulnerability with tenacity for several classes ofgraphs.
0

181
196


Asieh
Khoshnood
University of Tehran
Department of Algorihthms and Computation, Tehran, Iran
Iran
asieh.khoshnood@ut.ac.ir


Dara
Moazzami
University of Tehran, College of Engineering, Department of Engineering Science
Iran
dmoazzami@ut.ac.ir
Vulnerability
Tenacity
connectivity
Integrity
toughness
binding number
1

BloomEclat: Efficient Eclat Algorithm based on Bloom filter
https://jac.ut.ac.ir/article_81890.html
1
Eclat is an algorithm that finds frequent itemsets. It uses a vertical database and calculates item's support by intersecting transactions. However, Eclat suffers from the exponential time complexity of calculating the intersection of transactions. In this paper, a randomized algorithm called BloomEclat based on Bloom filter is presented to improve the Eclat algorithm complexity in finding frequent itemsets. Through Bloom Filter, an element’s membership to a set, can be checked and set operations such as intersection and union of two sets can be executed in a time efficient manner. By using these capabilities, Eclat algorithm’s intersecting problem can significantly improve. In BloomEclat algorithm with slight false positive error, the speed of the intersecting transactions is increased, and consequently the execution time is reduced.
0

197
208


sina
abbasi
Department of Algorithms and Computation, School of Engineering Science, College of Engineering, University of Tehran, Iran
Iran
sina.abbasi.415@ut.ac.ir


Ali
Moieni
Department of Algorithms and Computation, School of Engineering Science, College of Engineering, University of Tehran, Iran.
Iran
moeini@ut.ac.ir
Eclat algorithm
bloom filter
frequent pattern mining
association rules mining
Data Mining
Union
Intersection