Volume 31 (2020)
Volume 30 (2019)
Volume 29 (2018)
Volume 28 (2017)
Volume 27 (2016)
Volume 26 (2015)
Volume 25 (2014)
Volume 24 (2013)
Volume 23 (2012)
Volume 22 (2011)
Volume 21 (2010)
Volume 20 (2009)
Volume 19 (2008)
Volume 18 (2007)
Volume 17 (2006)
Volume 16 (2005)
Volume 15 (2004)
Volume 14 (2003)
Volume 13 (2002)
Volume 12 (2001)
Volume 11 (2000)
Volume 10 (1999)
Volume 9 (1998)
Volume 8 (1997)
Volume 7 (1996)
Volume 6 (1995)
Volume 5 (1994)
Volume 4 (1993)
Volume 3 (1992)
Volume 2 (1991)
Volume 1 (1990)
Volume 1 (1989)
1. Adopting the Multiresolution Wavelet Analysis in Radial Basis Functions to Solve the Perona-Malik Equation

A. Khatoon Abadi; K. Yahya; M. Amini

Volume 29, Issue 4 , Autumn 2018, , Pages 361-368

http://dx.doi.org/10.22059/jsciences.2018.67447

Abstract
  Wavelets and radial basis functions (RBF) have ubiquitously proved very successful to solve different forms of partial differential equations (PDE) using shifted basis functions, and as with the other meshless methods, they have been extensively used in scattered data interpolation. The current paper ...  Read More

2. Cesaro Supermodular Order and Archimedean Copulas

H.R. Nili Sani; M. Amini; M. Khanjari

Volume 26, Issue 1 , Winter 2015, , Pages 71-76

Abstract
  In this paper, we introduce a new kind of order, Cesaro supermodular order, which includes supermodular order and stochastic order. For this new order, we show that it almost fulfils all desirable properties of a multivariate positive dependence order that have been proposed by Joe (1997). Also, we obtain ...  Read More

3. Nonharmonic Gabor Expansions

M. Amini

Volume 25, Issue 2 , Spring 2014, , Pages 165-173

Abstract
  We consider Gabor systems generated by a Gaussian function and prove certain classical results of Paley and Wiener on nonharmonic Fourier series of complex exponentials for the Gabor expansion‎. ‎In particular, we prove a version of Plancherel-Po ́lya theorem for entire functions with finite ...  Read More

4. Complete Convergence and Some Maximal Inequalities for Weighted Sums of Random Variables

M. Amini

Volume 18, Issue 4 , Autumn 2007, , Pages 311-316

Abstract
  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 ...  Read More