University of Tehran
Journal of Sciences, Islamic Republic of Iran
1016-1104
2345-6914
18
4
2007
12
01
Synthesis of Binary Ti-Si Mixed Oxides Nanoparticles with Rutile Structure as Selective Catalyst for Epoxidation of Alkenes
303
395
EN
F.
Farzaneh
Department of Chemistry, Alzahra University, Vanak, Tehran, Islamic Republic of Iran
The nanoparticles of Ti-Si mixed oxides (NTSO) with Rutile structure were prepared by sol-gel method in a mixture of alcohol and water as solvent. The solid product was characterized by XRD, FTIR, SEM, TEM, UV, TGA and laser Raman spectroscopy. The catalytic activity of NTSO (5-10 nm) was investigated in the epoxidation of cis stilbene, trans stilbene, and norbornene by using oxidants such as tert-butylhydroperoxide (TBHP), molecular oxygen (O2)/isobutyraldehyde (IBA) and hydrogen peroxide (H2O2). It was found that epoxides of trans-stilbene andnorbornenewereformedquantitativelywiththegreenH2O2oxidantduring12h.
Epoxidation,Alkenes,Ti-Si mixed oxides,nanoparticles,Heterogeneous catalysis
https://jsciences.ut.ac.ir/article_35065.html
https://jsciences.ut.ac.ir/article_35065_7dd368e2a660d1b78517bb5587f186ec.pdf
University of Tehran
Journal of Sciences, Islamic Republic of Iran
1016-1104
2345-6914
18
4
2007
12
01
Complete Convergence and Some Maximal Inequalities for Weighted Sums of Random Variables
311
316
EN
M.
Amini
Department of Statistics, Faculty of Mathematical Sciences, Ferdowsi University
of Mashhad, Mashhad, Islamic Republic of Iran
Let be a sequence of arbitrary random variables with and , for every and be an array of real numbers. We will obtain two maximal inequalities for partial sums and weighted sums of random variables and also, we will prove complete convergence for weighted sums , under some conditions on and sequence .
https://jsciences.ut.ac.ir/article_35073.html
https://jsciences.ut.ac.ir/article_35073_d621f17bd3310b1e9969d451974cb757.pdf
University of Tehran
Journal of Sciences, Islamic Republic of Iran
1016-1104
2345-6914
18
4
2007
12
01
A Computational Meshless Method for Solving Multivariable Integral Equations
317
321
EN
E.
Babolian
Department of Mathematics, Teacher Training University, Tehran, Islamic Republic of Iran
In this paper we use radial basis functions to solve multivariable integral equations. We use collocation method for implementation. Numerical experiments show the accuracy of the method.
https://jsciences.ut.ac.ir/article_35075.html
https://jsciences.ut.ac.ir/article_35075_efa1cb388921b5a382f132d3c315a55d.pdf
University of Tehran
Journal of Sciences, Islamic Republic of Iran
1016-1104
2345-6914
18
4
2007
12
01
On the U-WPF Acts over Monoids
323
328
EN
A.
Golchin
Department of Mathematics, University of Sistan and Baluchestan, Zahedan, Islamic Republic of Iran
Valdis Laan in [5] introduced an extension of strong flatness which is called weak pullback flatness. In this paper we introduce a new property of acts over monoids, called U-WPF which is an extension of weak pullback flatness and give a classification of monoids by this property of their acts and also a classification of monoids when this property of acts implies others. We also show that regularity and strong faithfulness of acts both imply U-WPF. An equivalent of that over monoids for which torsion freeness implies U-WPF is given too.
U-WPF,Strongly faithful,Regular
https://jsciences.ut.ac.ir/article_35076.html
https://jsciences.ut.ac.ir/article_35076_7179cbf62319b0387870e23cc9c2338f.pdf
University of Tehran
Journal of Sciences, Islamic Republic of Iran
1016-1104
2345-6914
18
4
2007
12
01
Nonlinear Two-Phase Stefan Problem
329
337
EN
K.
Ivaz
Department of Mathematics, University of Tabriz, Tabriz, Islamic Republic of Iran
In this paper we consider a nonlinear two-phase Stefan problem in one-dimensional space. The problem is mapped into a nonlinear Volterra integral equation for the free boundary.
Free boundary problems,integral equation
https://jsciences.ut.ac.ir/article_35077.html
https://jsciences.ut.ac.ir/article_35077_32721d24440447cca51b48fcd81190bb.pdf
University of Tehran
Journal of Sciences, Islamic Republic of Iran
1016-1104
2345-6914
18
4
2007
12
01
Derivations on Certain Semigroup Algebras
339
345
EN
M.
Lashkarizadeh Bami
Department of Mathematics, University of Isfahan, Isfahan, Islamic Republic of Iran
In the present paper we give a partially negative answer to a conjecture of Ghahramani, Runde and Willis. We also discuss the derivation problem for both foundation semigroup algebras and Clifford semigroup algebras. In particular, we prove that if S is a topological Clifford semigroup for which Es is finite, then H1(M(S),M(S))={0}.
Foundation semigroup,Semigroup algebra,Derivation,First order cohomology,Clifford semigroup
https://jsciences.ut.ac.ir/article_35078.html
https://jsciences.ut.ac.ir/article_35078_5dc248c0cdd852f58b420f59cb5d150c.pdf
University of Tehran
Journal of Sciences, Islamic Republic of Iran
1016-1104
2345-6914
18
4
2007
12
01
Modified Progressive Type-II Censoring Procedure in Life-Testing under the Weibull Model
347
354
EN
M.
Khodadadi
Department of Statistics, Faculty of Mathematical Sciences, Shahid Beheshti
University, Tehran, Islamic Republic of Iran
In this paper we introduce a new scheme of censoring and study it under the Weibull distribution. This scheme is a mixture of progressive Type II censoring and self relocating design which was first introduced by Srivastava [8]. We show the superiority of this censoring scheme (PSRD) relative to the classical schemes with respect to “asymptotic variance”. Comparisons are also made with respect to the total expected time under experiment (TETUE) as an important feature of time and cost saving. These comparisons show that TETUE(SRD) < TETUE(PSRD) < TETUE(PC2) if 0 < β < 1, TETUE(PSRD) = TETUE(SRD) < TETUE(PC2) if β = 1 and TETUE(PSRD) is the best among all the designs if β = 2 (Rayleigh distribution case).
Asymptotic variance,Fisher information matrix,Maximum likelihood,Self relocating design (SRD),Total expected time under experiment
https://jsciences.ut.ac.ir/article_35079.html
https://jsciences.ut.ac.ir/article_35079_97b138e63d61d51fa7c1effe3f11847d.pdf
University of Tehran
Journal of Sciences, Islamic Republic of Iran
1016-1104
2345-6914
18
4
2007
12
01
Essentially Retractable Modules
355
360
EN
M.R.
Vedadi
Department of Mathematical Sciences, Isfahan University of Technology,
Isfahan 84156-83111, Islamic Republic of Iran
We call a module essentially retractable if HomR for all essential submodules N of M. For a right FBN ring R, it is shown that: (i) A non-zero module is retractable (in the sense that HomR for all non-zero ) if and only if certain factor modules of M are essentially retractable nonsingular modules over R modulo their annihilators. (ii) A non-zero module is essentially retractable if and only if there exists a prime ideal such that HomR. Over semiprime right nonsingular rings, a nonsingular essentially retractable module is precisely a module with non-zero dual. Moreover, over certain rings R, including right FBN rings, it is shown that a nonsingular module M with enough uniforms is essentially retractable if and only if there exist uniform retractable R-modules and R-homomorphisms with .
Dual module,Essentially retractable,Homo-related
https://jsciences.ut.ac.ir/article_35080.html
https://jsciences.ut.ac.ir/article_35080_daa38f2a160fc3e3a8b0aafa70c41eff.pdf