ORIGINAL_ARTICLE
A PRELUDE TO THE THEORY OF RANDOM WALKS IN RANDOM ENVIRONMENTS
A random walk on a lattice is one of the most fundamental models in probability theory.
When the random walk is inhomogenous and its inhomogeniety comes from an ergodic stationary process, the walk is called a
random walk in a random environment (RWRE). The basic questions such as the law of large numbers (LLN), the central limit theorem (CLT),
and the large deviation principle (LDP) are not fully understood for RWRE. Some known results in the case of LLN and LDP are reviewed.
These results are closely related to the homogenization phenomenon
for Hamilton-Jacobi-Bellman equations when both space and time are discretized.
http://bims.iranjournals.ir/article_321_2248c4b14c7fdc0b2336fbd3371b2af0.pdf
2011-07-15T11:23:20
2018-06-19T11:23:20
5
20
Random walk in a random environment
law of large numbers
large deviation principle
homogenization
F.
REZAKHANLOU
rezakhan@math.berkeley.edu
true
1
LEAD_AUTHOR
ORIGINAL_ARTICLE
COMPOSITE INTERPOLATION METHOD AND THE
CORRESPONDING DIFFERENTIATION MATRIX
Properties of the hybrid of block-pulse functions and Lagrange
polynomials based on the Legendre-Gauss-type points are
investigated and utilized to define the composite interpolation
operator as an extension of the well-known Legendre interpolation
operator. The uniqueness and interpolating properties are
discussed and the corresponding differentiation matrix is also
introduced. The applicability and effectiveness of the method are
illustrated by two numerical experiments.
http://bims.iranjournals.ir/article_322_2b6066753cacb933c98a78dbdfe8997a.pdf
2011-12-15T11:23:20
2018-06-19T11:23:20
21
34
Block-pulse functions
Lagrange polynomials
Hybrid functions
Gauss pseudospectral method
differentiation
matrices
H.
MARZBAN
hmarzban@cc.iut.ac.ir
true
1
LEAD_AUTHOR
H.
TABRIZIDOOZ
htabrizidooz@kashanu.ac.ir
true
2
AUTHOR
ORIGINAL_ARTICLE
A SYSTEM OF GENERALIZED VARIATIONAL
INCLUSIONS INVOLVING G-eta-MONOTONE MAPPINGS
We introduce a new concept of general
$G$-$eta$-monotone operator generalizing the general
$(H,eta)$-monotone operator cite{arvar2, arvar1}, general
$H-$ monotone operator cite{xiahuang} in Banach spaces, and also
generalizing $G$-$eta$-monotone operator cite{zhang}, $(A,
eta)$-monotone operator cite{verma2}, $A$-monotone operator
cite{verma0}, $(H, eta)$-monotone operator cite{fanghuang},
$H$-monotone operator cite{fanghuang1, {fanghuangthompson}},
maximal $eta$-monotone operator cite{fanghuang0} and classical
maximal monotone operators cite{zeid} in Hilbert spaces. We provide
some examples and study some properties of general
$G$-$eta$-monotone operators. Moreover, the generalized proximal
mapping associated with this type of monotone operator is defined
and its Lipschitz continuity is established. Finally, using
Lipschitz continuity of generalized proximal mapping under some
conditions a new system of variational inclusions is solved.
http://bims.iranjournals.ir/article_323_98793a2abdc7993aabb4da3945e1d63f.pdf
2011-07-15T11:23:20
2018-06-19T11:23:20
35
47
Variational inclusions
proximal mapping
Monotone Operator
M.
ROOHI
m.roohi@umz.ac.ir
true
1
LEAD_AUTHOR
M.
ALIMOHAMMADY
amohsen@umz.ac.ir
true
2
AUTHOR
ORIGINAL_ARTICLE
EXACT SOLUTIONS FOR FLOW OF A SISKO FLUID
IN PIPE
By means of He's homotopy perturbation method
(HPM) an approximate solution of velocity eld is derived for the
ow in straight pipes of non-Newtonian
uid obeying the Sisko
model. The nonlinear equations governing the
ow in pipe are for-
mulated and analyzed, using homotopy perturbation method due
to He. Furthermore, the obtained solutions for velocity eld is
graphically sketched and compared with Newtonian
uid to show
the accuracy of this work. Volume
ux, average velocity and pres-
sure gradient are also calculated. Results reveal that the proposed
method is very eective and simple for solving nonlinear equations
like non-Newtonian
uids.
http://bims.iranjournals.ir/article_324_05383a13d44736bbb607dc866bd74fb3.pdf
2011-07-15T11:23:20
2018-06-19T11:23:20
49
60
Non-Newtonian
uid
nonlinear equation
Sisko model
homotopy perturbation
method (HPM)
N.
MOALLEMI
nima.moallemi@yahoo.com
true
1
LEAD_AUTHOR
I.
SHAFIEENEJAD
shafiee-iman@yahoo.com
true
2
AUTHOR
A.
NOVINZADEH
novinzadeh@kntu.ac.ir
true
3
AUTHOR
ORIGINAL_ARTICLE
APPROXIMATION OF STOCHASTIC PARABOLIC
DIFFERENTIAL EQUATIONS WITH TWO DIFFERENT
FINITE DIFFERENCE SCHEMES
We focus on the use of two stable and accurate explicit
finite difference schemes in order to approximate the solution of
stochastic partial differential equations of It¨o type, in particular,
parabolic equations. The main properties of these deterministic
difference methods, i.e., convergence, consistency, and stability, are
separately developed for the stochastic cases.
http://bims.iranjournals.ir/article_325_50c2301dc8a08d7ed9e358edb432b737.pdf
2011-07-15T11:23:20
2018-06-19T11:23:20
61
83
Stochastic partial differential equations
finite difference methods
Saul’yev methods
convergence
Stability
Wiener process
A.
SOHEILI
soheili@um.ac.ir
true
1
LEAD_AUTHOR
M.
NIASAR
bishei@mail.usb.ac.ir
true
2
AUTHOR
M.
AREZOOMANDAN
arezoomandan@ mail.usb.ac.ir
true
3
AUTHOR
ORIGINAL_ARTICLE
PROJECTED DYNAMICAL SYSTEMS AND
OPTIMIZATION PROBLEMS
We establish a relationship between general constrained
pseudoconvex optimization problems and globally projected dynamical
systems. A corresponding novel neural network model,
which is globally convergent and stable in the sense of Lyapunov,
is proposed. Both theoretical and numerical approaches are considered.
Numerical simulations for three constrained nonlinear optimization
problems are given to show that the numerical behaviors
are in good agreement with the theoretical results.
http://bims.iranjournals.ir/article_326_2e2eda1f0dba9e345cd2cb4e8b33ad8b.pdf
2011-07-15T11:23:20
2018-06-19T11:23:20
85
100
Dynamical systems
optimization problems
neural networks
variational inequalities
globally convergence
A.
MALEK
mala@modares.ac.ir
true
1
LEAD_AUTHOR
S.
EZAZIPOUR
ezazipour@modares.ac.ir
true
2
AUTHOR
N.
HOSSEINIPOUR-MAHANI
n.mahani@modares.ac.ir
true
3
AUTHOR
ORIGINAL_ARTICLE
LINEAR ESTIMATE OF THE NUMBER OF ZEROS OF
ABELIAN INTEGRALS FOR A KIND OF QUINTIC
HAMILTONIANS
We consider the number of zeros of the integral $I(h) = oint_{Gamma_h} omega$ of real polynomial form $omega$ of degree not greater than $n$ over a family of vanishing cycles on curves $Gamma_h:$ $y^2+3x^2-x^6=h$, where the integral is considered as a function of the parameter $h$. We prove that the number of zeros of $I(h)$, for $0 < h < 2$, is bounded above by $2[frac{n-1}{2}]+1$.
http://bims.iranjournals.ir/article_327_167f1b64e2cf1377a8f6fed876cb6919.pdf
2011-07-15T11:23:20
2018-06-19T11:23:20
101
116
Zeros of Abelian integrals
Hilbert's 16th problem
limit cycles
N.
NYAMORADI
nyamoradi@math.iut.ac.ir
true
1
AUTHOR
H.
ZANGENEH
hamidz@cc.iut.ac.ir
true
2
LEAD_AUTHOR
ORIGINAL_ARTICLE
PAIRED ANISOTROPIC DISTRIBUTION FOR IMAGE
SELECTIVE SMOOTHING
In this paper, we present a novel approach for image selective smoothing by the evolution of two paired nonlinear
partial differential equations. The distribution coefficient in de-noising equation controls the speed of distribution, and is
determined by the edge-strength function. In the previous works, the edge-strength function depends on isotropic
smoothing of the image, which results in failing to preserve corners and junctions, and may also result in failing to resolve
small features that are closely grouped together. The proposed approach obtains the edge-strength function by solving a
nonlinear distribution equation governed by the norm of the image gradient. This edge-strength function is then introduced
into a well-studied anisotropic distribution model to yield a regularized distribution coefficient for image smoothing. An explicit
numerical scheme is employed to efficiently solve these two paired equations. Compared with the existing methods, the
proposed approach has the advantages of more detailed preservation and implementational simplicity. Experimental results
on the synthesis and real images confirm the validity of the proposed approach.
http://bims.iranjournals.ir/article_328_5608c91977234ae7dcadecda4d587e07.pdf
2011-07-15T11:23:20
2018-06-19T11:23:20
117
131
Computer vision
anisotropic distribution
Image smoothing
partial differential
equation
A.
MADANKAN
amadankan@gmail.com
true
1
LEAD_AUTHOR
ORIGINAL_ARTICLE
AN INTRODUCTION TO HIGHER CLUSTER
CATEGORIES
In this survey, we give an overview over some aspects
of the set of tilting objects in an $m-$cluster category, with focus
on those properties which are valid for all $m geq 1$. We focus on the
following three combinatorial aspects: modeling the set of tilting
objects using arcs in certain polygons, the generalized assicahedra
of Fomin and Reading, and colored quiver mutation.
http://bims.iranjournals.ir/article_329_995a3b87119ae4d18ab2fb1a2224a40c.pdf
2011-07-15T11:23:20
2018-06-19T11:23:20
137
157
Cluster categories
tilting
triangulated categories
A.
BUAN
aslakb@math.ntnu.no
true
1
LEAD_AUTHOR
ORIGINAL_ARTICLE
ALGEBRAS WITH CYCLE-FINITE STRONGLY SIMPLY
CONNECTED GALOIS COVERINGS
Let $A$ be a nite dimensional $k-$algebra and $R$ be a
locally bounded category such that $R rightarrow R/G = A$ is a Galois covering
dened by the action of a torsion-free group of automorphisms
of $R$. Following [30], we provide criteria on the convex subcategories
of a strongly simply connected category R in order to be a cycle-
nite category and describe the module category of $A$. We provide
criteria for $A$ to be of polynomial growth
http://bims.iranjournals.ir/article_330_c71915e6b4ef58de1db68fafba6d960c.pdf
2011-07-15T11:23:20
2018-06-19T11:23:20
159
186
Module category of an algebra
infinite radical
Galois coverings
cycles of modules
J.
DE LA PENA
jap@matem.unam.mx
true
1
LEAD_AUTHOR
ORIGINAL_ARTICLE
CLUSTER ALGEBRAS AND CLUSTER CATEGORIES
These are notes from introductory survey lectures given
at the Institute for Studies in Theoretical Physics and Mathematics
(IPM), Teheran, in 2008 and 2010. We present the definition and
the fundamental properties of Fomin-Zelevinsky’s cluster algebras.
Then, we introduce quiver representations and show how they can
be used to construct cluster variables, which are the canonical generators
of cluster algebras. From quiver representations, we proceed
to the cluster category, which yields a complete categorification of
the cluster algebra and its combinatorial underpinnings.
http://bims.iranjournals.ir/article_331_d4a48fe4c80e61417522a29c539ecce5.pdf
2011-07-15T11:23:20
2018-06-19T11:23:20
187
234
Cluster algebra
quiver representation
cluster category
triangulated category
B.
KELLER
keller@math.jussieu.fr
true
1
LEAD_AUTHOR
ORIGINAL_ARTICLE
Rings of Singularities
This paper is a slightly revised version of an introduction into singularity theory corresponding to a series of lectures given at the ``Advanced School and Conference on homological and geometrical methods in representation theory'' at the International Centre for Theoretical Physics (ICTP), Miramare - Trieste, Italy, 11-29 January 2010.
We show how to associate to a triple of positive integers $(p_1,p_2,p_3)$ a two-dimensional isolated graded singularity by an elementary procedure that works over any field $k$ (with no assumptions on characteristic, algebraic closedness or cardinality). This assignment starts from the triangle singularity $x_1^{p_1}+x_2^{p_2}+x_3^{p_3}$ and when applied to the Platonic (or Dynkin) triples, it produces the famous list of A-D-E-singularities. As another particular case, the procedure yields Arnold's famous strange duality list consisting of the 14 exceptional unimodular singularities (and an infinite sequence of further singularities not treated here in detail).
As we are going to show, weighted projective lines and various triangulated categories attached to them play a key role in the study of the triangle and associated singularities.
http://bims.iranjournals.ir/article_332_2305be4c2f9611a65dc6ead6821fd829.pdf
2011-07-15T11:23:20
2018-06-19T11:23:20
235
271
Weighted projective line
(extended) canonical algebra
simple singularity
Arnold's strange duality
stable category of vector bundles
H.
LENZING
helmut@math.uni-paderborn.de
true
1
LEAD_AUTHOR
ORIGINAL_ARTICLE
RIGID DUALIZING COMPLEXES
Let $X$ be a sufficiently nice scheme.
We survey some recent progress on dualizing complexes. It turns
out that a complex in $kinj X$ is dualizing if and only if
tensor product with it induces an equivalence of categories
from Murfet's new
category $kmpr X$ to the category
$kinj X$. In these terms, it
becomes interesting to wonder how to glue such equivalences.
http://bims.iranjournals.ir/article_333_341c4f567b539260a85b4d60696ed342.pdf
2011-07-15T11:23:20
2018-06-19T11:23:20
273
290
Dualizing complex
Grothendieck duality
A.
NEEMAN
Amnon.Neeman@anu.edu.au
true
1
LEAD_AUTHOR
ORIGINAL_ARTICLE
ON THE USE OF KULSHAMMER TYPE INVARIANTS
IN REPRESENTATION THEORY
Since 2005 a new powerful invariant of an algebra has
emerged using the earlier work of Horvath, Hethelyi, Kulshammer
and Murray. The authors studied Morita invariance of a sequence
of ideals of the center of a nite dimensional algebra over a eld
of nite characteristic. It was shown that the sequence of ideals is
actually a derived invariant, and most recently a slightly modied
version of it is an invariant under stable equivalences of Morita
type. The invariant was used in various contexts to distinguish
derived and stable equivalence classes of pairs of algebras in very
subtle situations. Generalisations to non symmetric algebras and to
higher Hochschild (co-)homology were given. This article surveys
the results and gives some of the constructions in more details.
http://bims.iranjournals.ir/article_334_ab264858c64fce7ff1142c607288bc5c.pdf
2011-07-15T11:23:20
2018-06-19T11:23:20
291
341
Derived equivalences
stable equivalences
tame algebras
periodic algebras
A.
ZIMMERMANN
alexander.zimmermann@u-picardie.fr
true
1
LEAD_AUTHOR