@Article{,
author="",
title="Bulletin of the Iranian Mathematical Society",
journal="Bulletin of the Iranian Mathematical Society",
year="2016",
volume="42",
number="2",
pages="-",
abstract="",
issn="1017-060X",
doi="",
url="http://bims.iranjournals.ir/article_755.html"
}
@Article{Forouzesh2016,
author="Forouzesh, F.",
title="Radical of $\cdot$-ideals in $PMV$-algebras",
journal="Bulletin of the Iranian Mathematical Society",
year="2016",
volume="42",
number="2",
pages="233-246",
abstract="In this paper, we introduce the notion of the radical of a $PMV$-algebra $A$ and we charactrize radical $A$ via elements of $A$. Also, we introduce the notion of the radical of a $\cdot$-ideal in $PMV$-algebras. Several characterizations of this radical is given. We define the notion of a semimaximal $\cdot$-ideal in a $PMV$-algebra. Finally we show that $A/I$ has no nilpotent elements if and only if $I$ is a semi-maximal $\cdot$-ideal of $A$.",
issn="1017-060X",
doi="",
url="http://bims.iranjournals.ir/article_756.html"
}
@Article{Yan2016,
author="Yan, R. A.
and Sun, S. R.
and Han, Z. L.",
title="Existence of solutions of boundary value problems for Caputo fractional differential equations on time scales",
journal="Bulletin of the Iranian Mathematical Society",
year="2016",
volume="42",
number="2",
pages="247-262",
abstract="In this paper, we study the boundary-value problem of fractional order dynamic equations on time scales, $$ ^c{\Delta}^{\alpha}u(t)=f(t,u(t)),\;\;t\in [0,1]_{\mathbb{T}^{\kappa^{2}}}:=J,\;\;1<\alpha<2, $$ $$ u(0)+u^{\Delta}(0)=0,\;\;u(1)+u^{\Delta}(1)=0, $$ where $\mathbb{T}$ is a general time scale with $0,1\in \mathbb{T}$, $^c{\Delta}^{\alpha}$ is the Caputo $\Delta$-fractional derivative. We investigate the existence and uniqueness of solution for the problem by Banach's fixed point theorem and Schaefer's fixed point theorem. We also discuss the existence of positive solutions of the problem by using the Krasnoselskii theorem.",
issn="1017-060X",
doi="",
url="http://bims.iranjournals.ir/article_757.html"
}
@Article{Chang2016,
author="Chang, G. W.
and Dumitrescu, T.
and Zafruhhah, M.",
title="Locally GCD domains and the ring $D+XD_S[X]$",
journal="Bulletin of the Iranian Mathematical Society",
year="2016",
volume="42",
number="2",
pages="263-284",
abstract="An integral domain $D$ is called a emph{locally GCD domain} if $D_{M}$ is a GCD domain for every maximal ideal $M$ of $D$. We study some ring-theoretic properties of locally GCD domains. E.g., we show that $D$ is a locally GCD domain if and only if $aD\cap bD$ is locally principal for all $0\neq a,b\in D$, and flat overrings of a locally GCD domain are locally GCD. We also show that the t-class group of a locally GCD domain is just its Picard group. We study when a locally GCD domain is Pr"{u}fer or a generalized GCD domain. We also characterize locally factorial domains as domains $D$ whose minimal prime ideals of a nonzero principal ideal are locally principal and discuss conditions that make them Krull domains. We use the $D+XD_{S}[X]$ construction to give some interesting examples of locally GCD domains that are not GCD domains.",
issn="1017-060X",
doi="",
url="http://bims.iranjournals.ir/article_758.html"
}
@Article{Jiao2016,
author="Jiao, H.",
title="Sufficiency and duality for a nonsmooth vector optimization problem with generalized $\alpha$-$d_{I}$-type-I univexity over cones",
journal="Bulletin of the Iranian Mathematical Society",
year="2016",
volume="42",
number="2",
pages="285-295",
abstract="In this paper, using Clarke’s generalized directional derivative and dI-invexity we introduce new concepts of nonsmooth K-α-dI-invex and generalized type I univex functions over cones for a nonsmooth vector optimization problem with cone constraints. We obtain some sufficient optimality conditions and Mond-Weir type duality results under the foresaid generalized invexity and type I cone-univexity assumptions.",
issn="1017-060X",
doi="",
url="http://bims.iranjournals.ir/article_759.html"
}
@Article{Golbabai2016,
author="Golbabai, A.
and P. A. Beik, S.
and K. Salkuyeh, D.",
title="A new approach for solving the first-order linear matrix differential equations",
journal="Bulletin of the Iranian Mathematical Society",
year="2016",
volume="42",
number="2",
pages="297-314",
abstract="Abstract. The main contribution of the current paper is to propose a new effective numerical method for solving the first-order linear matrix differential equations. Properties of the Legendre basis operational matrix of integration together with a collocation method are applied to reduce the problem to a coupled linear matrix equations. Afterwards, an iterative algorithm is examined for solving the obtained coupled linear matrix equations. Numerical experiments are presented to demonstrate the applicably and efficiency of our method.",
issn="1017-060X",
doi="",
url="http://bims.iranjournals.ir/article_760.html"
}
@Article{Jahanshahi2016,
author="Jahanshahi, M.
and Darabadi, M.",
title="An analytic solution for a non-local initial-boundary value problem including a partial differential equation with variable coefficients",
journal="Bulletin of the Iranian Mathematical Society",
year="2016",
volume="42",
number="2",
pages="315-326",
abstract="This paper considers a non-local initial-boundary value problem containing a first order partial differential equation with variable coefficients. At first, the non-self-adjoint spectral problem is derived. Then its adjoint problem is calculated. After that, for the adjoint problem the associated eigenvalues and the subsequent eigenfunctions are determined. Finally the convergence of series solution and the uniqueness of this solution will be proved.",
issn="1017-060X",
doi="",
url="http://bims.iranjournals.ir/article_761.html"
}
@Article{Talati2016,
author="Talati, D.",
title="Trivially related lax pairs of the Sawada-Kotera equation",
journal="Bulletin of the Iranian Mathematical Society",
year="2016",
volume="42",
number="2",
pages="327-330",
abstract="We show that a recently introduced Lax pair of the Sawada-Kotera equation is nota new one but is trivially related to the known old Lax pair. Using the so-called trivialcompositions of the old Lax pairs with a differentially constrained arbitrary operators,we give some examples of trivial Lax pairs of KdV and Sawada-Kotera equations.",
issn="1017-060X",
doi="",
url="http://bims.iranjournals.ir/article_762.html"
}
@Article{Nabardi2016,
author="Nabardi, K.
and Izadi, F.",
title="On Silverman's conjecture for a family of elliptic curves",
journal="Bulletin of the Iranian Mathematical Society",
year="2016",
volume="42",
number="2",
pages="331-340",
abstract="Let $E$ be an elliptic curve over $\Bbb{Q}$ with the given Weierstrass equation $ y^2=x^3+ax+b$. If $D$ is a squarefree integer, then let $E^{(D)}$ denote the $D$-quadratic twist of $E$ that is given by $E^{(D)}: y^2=x^3+aD^2x+bD^3$. Let $E^{(D)}(\Bbb{Q})$ be the group of $\Bbb{Q}$-rational points of $E^{(D)}$. It is conjectured by J. Silverman that there are infinitely many primes $p$ for which $E^{(p)}(\Bbb{Q})$ has positive rank, and there are infinitely many primes $q$ for which $E^{(q)}(\Bbb{Q})$ has rank $0$. In this paper, assuming the parity conjecture, we show that for infinitely many primes $p$, the elliptic curve $E_n^{(p)}: y^2=x^3-np^2x$ has odd rank and for infinitely many primes $p$, $E_n^{(p)}(\Bbb{Q})$ has even rank, where $n$ is a positive integer that can be written as biquadrates sums in two different ways, i.e., $n=u^4+v^4=r^4+s^4$, where $u, v, r, s$ are positive integers such that $\gcd(u,v)=\gcd(r,s)=1$. More precisely, we prove that: if $n$ can be written in two different ways as biquartic sums and $p$ is prime, then under the assumption of the parity conjecture $E_n^{(p)}(\Bbb{Q})$ has odd rank (and so a positive rank) as long as $n$ is odd and $p\equiv5, 7\pmod{8}$ or $n$ is even and $p\equiv1\pmod{4}$. In the end, we also compute the ranks of some specific values of $n$ and $p$ explicitly.",
issn="1017-060X",
doi="",
url="http://bims.iranjournals.ir/article_763.html"
}
@Article{Qiao2016,
author="Qiao, H.
and Wang, L.
and Ma, X.",
title="Every class of $S$-acts having a flatness property is closed under directed colimits",
journal="Bulletin of the Iranian Mathematical Society",
year="2016",
volume="42",
number="2",
pages="341-351",
abstract="Let $S$ be a monoid. In this paper, we prove every class of $S$-acts having a flatness property is closed underdirected colimits, it extends some known results. Furthermore thisresult implies that every $S$-act has a flatness cover if and only if it has a flatness precover.",
issn="1017-060X",
doi="",
url="http://bims.iranjournals.ir/article_764.html"
}
@Article{Mushtaq2016,
author="Mushtaq, Q.
and Razaq, A.",
title="Partial proof of Graham Higman's conjecture related to coset diagrams",
journal="Bulletin of the Iranian Mathematical Society",
year="2016",
volume="42",
number="2",
pages="353-369",
abstract="Graham Higman has defined coset diagrams for PSL(2,ℤ). These diagrams are composed of fragments, and the fragments are further composed of two or more circuits. Q. Mushtaq has proved in 1983 that existence of a certain fragment γ of a coset diagram in a coset diagram is a polynomial f in ℤ[z]. Higman has conjectured that, the polynomials related to the fragments are monic and for a fixed degree, there are finite number of such polynomials. In this paper, we consider a family Ϝ of fragments such that each fragment in Ϝ contains one vertex fixed byF_v [(〖xy〗^(-1) )^(s_1 ) (xy)^(s_2 ) (〖xy〗^(-1) )^(s_3 ),(xy)^(q_1 ) (〖xy〗^(-1) )^(q_2 ) (xy)^(q_3 ) ]where s₁,s₂,s₃,q₁,q₂,q₃∈ℤ⁺, and prove Higman's conjecture for the polynomials obtained from the fragments in Ϝ.",
issn="1017-060X",
doi="",
url="http://bims.iranjournals.ir/article_765.html"
}
@Article{Ahmadian2016,
author="Ahmadian, R.",
title="Toroidalization of locally toroidal morphisms of 3-folds",
journal="Bulletin of the Iranian Mathematical Society",
year="2016",
volume="42",
number="2",
pages="371-405",
abstract="A toroidalization of a dominant morphism $\varphi: X\to Y$ of algebraic varieties over a field of characteristic zero is a toroidal lifting of $\varphi$ obtained by performing sequences of blow ups of nonsingular subvarieties above $X$ and $Y$. We give a proof of toroidalization of locally toroidal morphisms of 3-folds.",
issn="1017-060X",
doi="",
url="http://bims.iranjournals.ir/article_766.html"
}
@Article{Yi2016,
author="Yi, X.
and Yang, X.",
title="Finite groups with $X$-quasipermutable subgroups of prime power order",
journal="Bulletin of the Iranian Mathematical Society",
year="2016",
volume="42",
number="2",
pages="407-416",
abstract="Let $H$, $L$ and $X$ be subgroups of a finite group$G$. Then $H$ is said to be $X$-permutable with $L$ if for some$xin X$ we have $AL^{x}=L^{x}A$. We say that $H$ is emph{$X$-quasipermutable } (emph{$X_{S}$-quasipermutable}, respectively) in $G$ provided $G$ has a subgroup$B$ such that $G=N_{G}(H)B$ and $H$ $X$-permutes with $B$ and with all subgroups (with all Sylowsubgroups, respectively) $V$ of $B$ such that $(|H|, |V|)=1$. Inthis paper, we analyze the influence of $X$-quasipermutable and$X_{S}$-quasipermutable subgroups on the structure of $G$. Some known results are generalized.",
issn="1017-060X",
doi="",
url="http://bims.iranjournals.ir/article_767.html"
}
@Article{Ali2016,
author="Ali, A.
and Bhatti, A.
and Raza, Z.",
title="The augmented Zagreb index, vertex connectivity and matching number of graphs",
journal="Bulletin of the Iranian Mathematical Society",
year="2016",
volume="42",
number="2",
pages="417-425",
abstract="Let $Gamma_{n,kappa}$ be the class of all graphs with $ngeq3$ vertices and $kappageq2$ vertex connectivity. Denote by $Upsilon_{n,beta}$ the family of all connected graphs with $ngeq4$ vertices and matching number $beta$ where $2leqbetaleqlfloorfrac{n}{2}rfloor$. In the classes of graphs $Gamma_{n,kappa}$ and $Upsilon_{n,beta}$, the elements having maximum augmented Zagreb index are determined.",
issn="1017-060X",
doi="",
url="http://bims.iranjournals.ir/article_768.html"
}
@Article{Ashrafi2016,
author="Ashrafi, N.
and Pouyan, N.",
title="The unit sum number of Baer rings",
journal="Bulletin of the Iranian Mathematical Society",
year="2016",
volume="42",
number="2",
pages="427-434",
abstract="In this paper we prove that each element of any regular Baer ring is a sum of two units if no factor ring of R is isomorphic to Z_2 and we characterize regular Baer rings with unit sum numbers $omega$ and $infty$. Then as an application, we discuss the unit sum number of some classes of group rings.",
issn="1017-060X",
doi="",
url="http://bims.iranjournals.ir/article_769.html"
}
@Article{Abazari2016,
author="Abazari, R.
and Niknam, A.",
title="Existence of ground states for approximately inner two--parameter $C_0$--groups on $C^*$--algebras",
journal="Bulletin of the Iranian Mathematical Society",
year="2016",
volume="42",
number="2",
pages="435-446",
abstract="In this paper, we generalize the definitions of approximately inner $C_0$-groups and their ground states to the two- parameter case and study necessary and sufficient conditions for a state to be ground state. Also we prove that any approximately inner two- parameter $C_0$--group must have at least one ground state. Finally some applications are given.",
issn="1017-060X",
doi="",
url="http://bims.iranjournals.ir/article_770.html"
}
@Article{Olko2016,
author="Olko, J.",
title="Remarks on microperiodic multifunctions",
journal="Bulletin of the Iranian Mathematical Society",
year="2016",
volume="42",
number="2",
pages="447-459",
abstract="It is well known that a microperiodic function mapping a topological group into reals, which is continuous at some point is constant. We introduce the notion of a microperiodic multifunction, defined on a topological group with values in a metric space, and study regularity conditions implying an analogous result. We deal with Vietoris and Hausdorff continuity concepts.Stability of microperiodic multifunctions is considered, namely we show that an approximately microperiodic multifunction is close to a constant one, provided it is continuous at some point. As a consequence we obtain stability result for an approximately microperiodic single-valued function.",
issn="1017-060X",
doi="",
url="http://bims.iranjournals.ir/article_771.html"
}
@Article{Hoseini2016,
author="Hoseini, N.
and Erfanian, A.
and Azimi, A.
and Farrokhi D. G., M.",
title="On cycles in intersection graphs of rings",
journal="Bulletin of the Iranian Mathematical Society",
year="2016",
volume="42",
number="2",
pages="461-470",
abstract="Let $R$ be a commutative ring with non-zero identity. We describe all $C_3$- and $C_4$-free intersection graph of non-trivial ideals of $R$ as well as $C_n$-free intersection graph when $R$ is a reduced ring. Also, we shall describe all complete, regular and $n$-claw-free intersection graphs. Finally, we shall prove that almost all Artin rings $R$ have Hamiltonian intersection graphs. We show that such graphs are indeed pancyclic.",
issn="1017-060X",
doi="",
url="http://bims.iranjournals.ir/article_772.html"
}
@Article{IlkhanizadehManesh2016,
author="Ilkhanizadeh Manesh, A.",
title="On linear preservers of sgut-majorization on $\textbf{M}_{n,m}$",
journal="Bulletin of the Iranian Mathematical Society",
year="2016",
volume="42",
number="2",
pages="471-481",
abstract="Abstract. Let Mn;m be the set of n-by-m matrices with entries inthe field of real numbers. A matrix R in Mn = Mn;n is a generalizedrow substochastic matrix (g-row substochastic, for short) if Re e, where e = (1; 1; : : : ; 1)t. For X; Y 2 Mn;m, X is said to besgut-majorized by Y (denoted by X sgut Y ) if there exists ann-by-n upper triangular g-row substochastic matrix R such thatX = RY . This paper characterizes all linear preservers and stronglinear preservers of sgut on Rn and Mn;m respectively.",
issn="1017-060X",
doi="",
url="http://bims.iranjournals.ir/article_773.html"
}
@Article{Hosseinzadeh2016,
author="Hosseinzadeh, N.
and Doostie, H.",
title="Examples of non-quasicommutative semigroups decomposed into unions of groups",
journal="Bulletin of the Iranian Mathematical Society",
year="2016",
volume="42",
number="2",
pages="483-487",
abstract="Decomposability of an algebraic structure into the union of its sub-structures goes back to G. Scorza's Theorem of 1926 for groups. An analogue of this theorem for rings has been recently studied by A. Lucchini in 2012. On the study of this problem for non-group semigroups, the first attempt is due to Clifford's work of 1961 for the regular semigroups. Since then, N.P. Mukherjee in 1972 studied the decomposition of quasicommutative semigroups where, he proved that: a regular quasicommutative semigroup is decomposable into the union of groups. The converse of this result is a natural question. Obviously, if a semigroup $S$ is decomposable into a union of groups then $S$ is regular so, the aim of this paper is to give examples of non-quasicommutative semigroups which are decomposable into the disjoint unions of groups. Our examples are the semigroups presented by the following presentations: $$\pi_1 =\langle a,b\mid a^{n+1}=a, b^3=b, ba=a^{n-1}b\rangle,~(n\geq 3),$$ $$\pi_2 =\langle a,b\mid a^{1+p^\alpha}=a, b^{1+p^\beta}=b, ab=ba^{1+p^{\alpha-\gamma}}\rangle$$where, $p$ is an odd prime, $\alpha, \beta$ and $\gamma$ are integers such that $\alpha \geq 2\gamma$, $\beta \geq \gamma \geq 1$ and $\alpha +\beta > 3$.",
issn="1017-060X",
doi="",
url="http://bims.iranjournals.ir/article_774.html"
}
@Article{Hui2016,
author="Hui, S. k.
and Matsuyama, Y.",
title="Pseudo Ricci symmetric real hypersurfaces of a complex projective space",
journal="Bulletin of the Iranian Mathematical Society",
year="2016",
volume="42",
number="2",
pages="489-497",
abstract="Pseudo Ricci symmetric real hypersurfaces of a complex projective space are classified and it is proved that there are no pseudo Ricci symmetric real hypersurfaces of the complex projective space CPn for which the vector field ξ from the almost contact metric structure (φ, ξ, η, g) is a principal curvature vector field.",
issn="1017-060X",
doi="",
url="http://bims.iranjournals.ir/article_775.html"
}