2019-07-20T20:34:35Z
http://scma.maragheh.ac.ir/?_action=export&rf=summon&issue=5470
Sahand Communications in Mathematical Analysis
SCMA
2322-5807
2322-5807
2019
13
1
The Existence Theorem for Contractive Mappings on $wt$-distance in $b$-metric Spaces Endowed with a Graph and its Application
Kamal
Fallahi
Dragan
Savic
Ghasem
Soleimani Rad
In this paper, we study the existence and uniqueness of fixed points for mappings with respect to a $wt$-distance in $b$-metric spaces endowed with a graph. Our results are significant, since we replace the condition of continuity of mapping with the condition of orbitally $G$-continuity of mapping and we consider $b$-metric spaces with graph instead of $b$-metric spaces, under which can be generalized, improved, enriched and unified a number of recently announced results in the existing literature. Additionally, we elicit all of our main results by a non-trivial example and pose an interesting two open problems for the enthusiastic readers.
$b$-metric space
$wt$-distance
Fixed point
Orbitally $G$-continuous mapping
2019
02
01
1
15
http://scma.maragheh.ac.ir/article_34322_c1a6f4a5bb424cbcce7290bf293886ca.pdf
Sahand Communications in Mathematical Analysis
SCMA
2322-5807
2322-5807
2019
13
1
$C$-class Functions and Common Fixed Point Theorems Satisfying $varphi $-weakly Contractive Conditions
Arslan
Hojat Ansari
Tatjana
Dosenovic
Stojan
Radenovic
Jeong Sheok
Ume
In this paper, we discuss and extend some recent common fixed point results established by using $varphi-$weakly contractive mappings. A very important step in the development of the fixed point theory was given by A.H. Ansari by the introduction of a $C-$class function. Using $C-$class functions, we generalize some known fixed point results. This type of functions is a very important class of functions which contains almost all known type contraction starting from 1922. year, respectively from famous Banach contraction principle. Three common fixed point theorems for four mappings are presented. The obtained results generalizes several existing ones<br />in literature.We finally propose three open problems.
Common fixed point
$varphi $-weakly contractive conditions
Complete metric space
Weakly compatible mappings
$C$-class function
2019
02
01
17
30
http://scma.maragheh.ac.ir/article_31846_d6c970ed6b5f3e0d466239bb147f4213.pdf
Sahand Communications in Mathematical Analysis
SCMA
2322-5807
2322-5807
2019
13
1
Common Fixed Point Theory in Modified Intuitionistic Probabilistic Metric Spaces with Common Property (E.A.)
Hamid
Shayanpour
Asiyeh
Nematizadeh
In this paper, we define the concepts of modified intuitionistic probabilistic metric spaces, the property (E.A.) and the common property (E.A.) in modified intuitionistic probabilistic metric spaces.<br />Then, by the common<br />property (E.A.), we prove some common fixed point theorems in modified intuitionistic Menger probabilistic metric spaces satisfying an implicit relation.
Modified intuitionistic probabilistic Menger metric space
Property (E.A.)
Common property (E.A.)
2019
02
01
31
50
http://scma.maragheh.ac.ir/article_30018_01319582d03c748575cc8fcb9b401e9c.pdf
Sahand Communications in Mathematical Analysis
SCMA
2322-5807
2322-5807
2019
13
1
The Uniqueness Theorem for the Solutions of Dual Equations of Sturm-Liouville Problems with Singular Points and Turning Points
Seyfollah
Mosazadeh
In this paper, linear second-order differential equations of Sturm-Liouville type having a finite number of singularities and turning points in a finite interval are investigated. First, we obtain the dual equations associated with the Sturm-Liouville equation. Then, we prove the uniqueness theorem for the solutions of dual initial value problems.
Sturm-Liouville equation
Singular points
Turning points
Dual equations
2019
02
01
51
65
http://scma.maragheh.ac.ir/article_34300_558e5017059030a2a631d70b10382c96.pdf
Sahand Communications in Mathematical Analysis
SCMA
2322-5807
2322-5807
2019
13
1
Generalized Regular Fuzzy Irresolute Mappings and Their Applications
Elangovan
Elavarasan
In this paper, the notion of generalized regular fuzzy irresolute, generalized regular fuzzy irresolute open and generalized regular fuzzy irresolute closed maps in fuzzy topological spaces are introduced and studied. Moreover, some separation axioms and $r$-GRF-separated sets are established. Also, the relations between generalized regular fuzzy continuous maps and generalized regular fuzzy irresolute maps are investigated. As a natural follow-up of the study of r-generalized regular fuzzy open sets, the concept of r-generalized regular fuzzy connectedness of a fuzzy set is introduced and studied.
Generalized regular fuzzy irresolute
Generalized regular fuzzy irresolute open
Generalized regular fuzzy irresolute closed mapping
$r$-FRCO-$T_{1}$
$r$-FRCO-$T_{2}$
$r$-GRF-$T_{1}$
$r$-GRF-$T_{2}$
$r$-FRCO-regular
$r$-FRCO-normal
Strongly GRF-regular
strongly GRF-normal
$r$-GRF-separated sets
$r$-GRF-connectedness
2019
02
01
67
81
http://scma.maragheh.ac.ir/article_32569_defba3886a0dcdce9088bd3affc8b0d8.pdf
Sahand Communications in Mathematical Analysis
SCMA
2322-5807
2322-5807
2019
13
1
Extensions of Saeidi's Propositions for Finding a Unique Solution of a Variational Inequality for $(u,v)$-cocoercive Mappings in Banach Spaces
Ebrahim
Soori
Let $C$ be a nonempty closed convex subset of a real Banach space $E$, let $B: C rightarrow E $ be a nonlinear map, and let $u, v$ be positive numbers. In this paper, we show that the generalized variational inequality $V I (C, B)$ is singleton for $(u, v)$-cocoercive mappings under appropriate assumptions on Banach spaces. The main results are extensions of the Saeidi's Propositions for finding a unique solution of the variational inequality for $(u, v)$-cocoercive mappings in Banach spaces.
Variational inequality
Nonexpansive mapping
$(u
v)$-cocoercive mapping
Metric projection
Sunny nonexpansive retraction
2019
02
01
83
92
http://scma.maragheh.ac.ir/article_25887_4d361d95ff4721a03622269726d897e2.pdf
Sahand Communications in Mathematical Analysis
SCMA
2322-5807
2322-5807
2019
13
1
A class of new results in FLM algebras
Ali
Naziri-Kordkandi
Ali
Zohri
Fariba
Ershad
Bahman
Yousefi
In this paper, we first derive some results by using the Gelfand spectrum and spectrum in FLM algebras. Then, the characterizations of multiplicative linear mappings are also discussed in these algebras.
Fundamental topological algebra
FLM algebra
Spectrum
Multiplicative linear functional
2019
02
01
93
100
http://scma.maragheh.ac.ir/article_28459_b7a5cf314e4ef6915c21f824caf64ba6.pdf
Sahand Communications in Mathematical Analysis
SCMA
2322-5807
2322-5807
2019
13
1
Observational Modeling of the Kolmogorov-Sinai Entropy
Uosef
Mohammadi
In this paper, Kolmogorov-Sinai entropy is studied using mathematical modeling of an observer $ Theta $. The relative entropy of a sub-$ sigma_Theta $-algebra having finite atoms is defined and then the ergodic properties of relative semi-dynamical systems are investigated. Also, a relative version of Kolmogorov-Sinai theorem is given. Finally, it is proved that the relative entropy of a relative $ Theta $-measure preserving transformations with respect to a relative sub-$sigma_Theta$-algebra having finite atoms is affine.
Relative entropy
Relative semi-dynamical system
$m_Theta$-equivalence
$m_Theta$-generator
$ (Theta_1
Theta_2) $-isomorphism
2019
02
01
101
114
http://scma.maragheh.ac.ir/article_29983_7a5face43ae162c0c5d62beecf8dc888.pdf
Sahand Communications in Mathematical Analysis
SCMA
2322-5807
2322-5807
2019
13
1
A Class of Convergent Series with Golden Ratio Based on Fibonacci Sequence
Moosa
Ebadi
Farnaz
Soltanpour
In this article, a class of convergent series based on Fibonacci sequence is introduced for which there is a golden ratio (i.e. $frac{1+sqrt 5}{2}),$ with respect to convergence analysis. A class of sequences are at first built using two consecutive numbers of Fibonacci sequence and, therefore, new sequences have been used in order to introduce a new class of series. All properties of the sequences and related series are illustrated in the work by providing the details including sequences formula, related theorems, proofs and convergence analysis of the series.
Fibonacci numbers
Golden Ratio
Convergence analysis
2019
02
01
115
127
http://scma.maragheh.ac.ir/article_34323_062ea721f5f1adbe65dd5025387cba8d.pdf
Sahand Communications in Mathematical Analysis
SCMA
2322-5807
2322-5807
2019
13
1
Richardson and Chebyshev Iterative Methods by Using G-frames
Hassan
Jamali
Mohsen
Kolahdouz
In this paper, we design some iterative schemes for solving operator equation $ Lu=f $, where $ L:Hrightarrow H $ is a bounded, invertible and self-adjoint operator on a separable Hilbert space $ H $. In this concern, Richardson and Chebyshev iterative methods are two outstanding as well as long-standing ones. They can be implemented in different ways via different concepts.<br />In this paper, these schemes exploit the almost recently developed notion of g-frames which result in modified convergence rates compared with early computed ones in corresponding classical formulations. <br />In fact, these convergence rates are formed by the lower and upper bounds of the given g-frame. Therefore, we can determine any convergence rate by considering an appropriate g-frame.
Hilbert space
$g$-frame
Operator equation
Iterative method
Chebyshev polynomials
2019
02
01
129
139
http://scma.maragheh.ac.ir/article_31814_ef793a9c97fed9f9c9716480c9dad7d0.pdf
Sahand Communications in Mathematical Analysis
SCMA
2322-5807
2322-5807
2019
13
1
Some Fixed Point Results on Intuitionistic Fuzzy Metric Spaces with a Graph
Mohammad Esmael
Samei
In 2006, Espinola and Kirk made a useful contribution on combining fixed point theory<br />and graph theory. Recently, Reich and Zaslavski studied a new inexact iterative scheme for fixed points of contractive and nonexpansive multifunctions. In this paper, by using the main idea of their work and the idea of combining fixed point theory on intuitionistic fuzzy metric spaces and graph theory, we present some iterative scheme results for $G$-fuzzy contractive and $G$-fuzzy nonexpansive mappings on graphs.
Fixed point
Intuitionistice fuzzy metric space
Connected graph
$G$-fuzzy contractive
$G$-fuzzy nonexpansive
2019
02
01
141
152
http://scma.maragheh.ac.ir/article_29018_3207b7fee935ce78fea9497d8eb53f58.pdf
Sahand Communications in Mathematical Analysis
SCMA
2322-5807
2322-5807
2019
13
1
On Approximate Birkhoff-James Orthogonality and Approximate $ast$-orthogonality in $C^ast$-algebras
Seyed Mohammad Sadegh
Nabavi Sales
We offer a new definition of $varepsilon$-orthogonality in normed spaces, and we try to explain some properties of which. Also we introduce some types of $varepsilon$-orthogonality in an arbitrary $C^ast$-algebra $mathcal{A}$, as a Hilbert $C^ast$-module over itself, and investigate some of its properties in such spaces. We state some results relating range-kernel orthogonality in $C^*$-algebras.
Approximate orthogonality
Birkhoff--James orthogonality
Range-kernel orthogonality
$C^ast$-algebra
$ast$-orthogonality
2019
02
01
153
163
http://scma.maragheh.ac.ir/article_30861_f0543a2f5639a20e512cc2c244fb4bd2.pdf
Sahand Communications in Mathematical Analysis
SCMA
2322-5807
2322-5807
2019
13
1
Duals of Some Constructed $*$-Frames by Equivalent $*$-Frames
Azadeh
Alijani
Hilbert frames theory have been extended to frames in Hilbert $C^*$-modules. The paper introduces equivalent $*$-frames and presents ordinary duals of a constructed $*$-frame by an adjointable and invertible operator. Also, some necessary and sufficient conditions are studied such that $*$-frames and ordinary duals or operator duals of another $*$-frames are equivalent under these conditions. We obtain a $*$-frame by an orthogonal projection and a given $*$-frame, characterize its duals, and give a bilateral condition for commutating frame operator of a primary $*$-frame and an orthogonal projection. At the end of paper, pre-frame operator of a dual frame is computed by pre-frame operator of a general $*$-frame and an orthogonal projection.
Dual frame
Equivalent $*$-frame
Frame operator
$*$-frame
Operator dual frame
2019
02
01
165
177
http://scma.maragheh.ac.ir/article_34304_f1fa1d7d30cfa5a319737d9fba040b79.pdf
Sahand Communications in Mathematical Analysis
SCMA
2322-5807
2322-5807
2019
13
1
Rational Geraghty Contractive Mappings and Fixed Point Theorems in Ordered $b_2$-metric Spaces
Roghaye
Jalal Shahkoohi
Zohreh
Bagheri
In 2014, Zead Mustafa introduced $b_2$-metric spaces, as a generalization of both $2$-metric and $b$-metric spaces. Then new fixed point results for the classes of rational Geraghty contractive mappings of type I,II and III in the setup of $b_2$-metric spaces are investigated. Then, we prove some fixed point theorems under various contractive conditions in partially ordered $b_2$-metric spaces. These include Geraghty-type conditions, conditions that use comparison functions and almost generalized weakly contractive conditions. Berinde in [17-20] initiated the concept of almost contractions and obtained many interesting fixed point theorems. Results with similar conditions were obtained, textit{e.g.}, in [21] and [22]. In the last section of the paper, we define the notion of almost generalized $(psi ,varphi )_{s,a}$-contractive mappings and prove some new results. In particular, we extend Theorems 2.1, 2.2 and 2.3 of Ciric et.al. in [23] to the setting of $b_{2}$-metric spaces. Also, some examples are provided to illustrate the results presented herein and several interesting consequences of our theorems are also provided. The findings of the paper are based on generalization and modification of some recently reported theorems in the literature.
Fixed point
Complete metric space
Ordered $b_2$-metric space
2019
02
01
179
212
http://scma.maragheh.ac.ir/article_29263_f6da7913f6ba4c54cf195c5e7a308a31.pdf
Sahand Communications in Mathematical Analysis
SCMA
2322-5807
2322-5807
2019
13
1
Surjective Real-Linear Uniform Isometries Between Complex Function Algebras
Hadis
Pazandeh
Davood
Alimohammadi
In this paper, we first give a description of a surjective unit-preserving real-linear uniform isometry $ T : A longrightarrow B$, where $ A $ and $ B $ are complex function spaces on compact Hausdorff spaces $ X $ and $ Y $, respectively, whenever ${rm ER}left (A, Xright ) = {rm Ch}left (A, Xright )$ and ${rm ER}left (B, Yright ) = {rm Ch}left (B, Yright )$. Next, we give a description of $ T $ whenever $ A $ and $ B $ are complex function algebras and $ T $ does not assume to be unit-preserving.
Choquet boundary
Function algebra
Function space
Real-linear uniform isometry
2019
02
01
213
240
http://scma.maragheh.ac.ir/article_30145_1313cd222b3fef5233599be64c52c1b4.pdf