فهرست مطالب

International Journal Of Nonlinear Analysis And Applications
Volume:6 Issue: 3, Summer - Autumn 2015

  • تاریخ انتشار: 1393/12/28
  • تعداد عناوین: 15
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  • S. Manro* Pages 1-8
    In this paper, employing the common property (E:A), we prove a common xed theorem for weakly compatible mappings via an implicit relation in Intuitionistic fuzzy metric space. Our results gener- alize the results of S. Kumar [11] and C. Alaca et al. [2].
  • B. Bao, S. Xu, L. Shi, V. Cojbasic Rajic Pages 9-22
    In this paper, we introduce a concept of a generalized $c$-distance in ordered cone $b$-metric spaces and, by using the concept, we prove some fixed point theorems in ordered cone $b$-metric spaces. Our results generalize the corresponding results obtained by Y. J. Cho, R. Saadati, Shenghua Wang (Y. J. Cho, R. Saadati, Shenghua Wang, Common fixed point heorems on generalized distance in ordered cone metric spaces, J. Computers and Mathematics with Application. 61 (2011), 1254-1260). Furthermore, we give some examples and an application to support our main results.
    Keywords: Fixed point, Cone $b$, metric spaces, Generalized $c$, distance
  • G. Zabandan Pages 23-34
    In this paper we establish several polynomials similar to Bernstein''s polynomials and several refinements of Hermite-Hadamard inequality for convex functions.
    Keywords: Hermite, Hadamard inequality, Convex functions, Bernstein's polynomials
  • S. Ostadbashi, J. Kazemzadeh Pages 35-43
    In this paper, we consider orthogonal stability of mixed type additive and cubic functional equation of the form $$f(2x+y)+f(2x-y)-f(4x)=2f (x+y)+2f(x-y)-8f(2x) +10f(x)-2f(-x),$$ with $xbot y$, where $bot$ is orthogonality in the sense of Ratz.
    Keywords: Hyers, Ulam, Aoki, Rassias stability, mixed type additive, cubic functional equation, orthogonality space
  • F. Amouei Arani, M. Eshaghi Pages 44-52
    The concept of statistical convergence in 2-normed spaces for double sequence was introduced in [17]. In the first, we introduce concept strongly statistical convergence in $2$- normed spaces and generalize some results. Moreover, we define the concept of statistical uniform convergence in $2$- normed spaces and prove a basic theorem of uniform convergence in double sequences to the case of statistical convergence.
    Keywords: statistical convergence, statistical uniform convergence, double sequences, 2, normed space
  • P. Nasertayoob, S. M. Vaezpour Pages 53-61
    In this paper, sufficient conditions are investigated for the existence of periodic (not necessarily positive) solutions for nonlinear several time delay population system with feedback control. Nonlinear system affected by an periodic external source is studied. Existence of a control variable provides the extension of some previous results obtained in other studies. We give a illustrative example in order to indicate the validity of the assumptions.
    Keywords: Schauder's fixed, point theorem, Periodic solution, Population equation, Feedback control
  • S. Moradi, M. Mohammadi Anjedani, E. Analoei Pages 62-68
    In this paper we investigate the existence and uniqueness for Volterra-Fredholm type integral equations and extension of this type of integral equations. The result is obtained by using the coupled fixed point theorems in the framework of Banach space $ X=C([a,b],mathbb{R})$. Finally, we give an example to illustrate the applications of our results.
    Keywords: Integral Equation, partially ordered set, Coupled fixed point, Mixed monotone property
  • F. Ahmad Shah* Pages 69-84
    The objective of this paper is to establish a complete characterization of multiwavelet packets associated with matrix dilation on general lattices $Gamma$ in $mathbb R^d$ by virtue of time-frequency analysis, matrix theory and operator theory.
    Keywords: Multiwavelet, Multiwavelet Packets, General Lattices, Dilation Matrix
  • P. Papadopoulos*, N.L. Matiadou, A. Pappas Pages 85-95
    We discuss the asymptotic behaviour of solutions for the nonlocal quasilinear hyperbolic problem of Kirchhoff Type [u_{tt}-phi (x)||nabla u(t)||^{2}Delta u+delta u_{t}=|u|^{a}u,, x in mathbb{R} {N}, ,tgeq 0;,] with initial conditions $u(x,0) = u_0 (x)$ and $u_t(x,0) = u_1 (x)$, in the case where $N geq 3,; delta geq 0$ and $(phi (x))^{-1} =g (x)$ is a positive function lying in $L^ {N/2}(mathbb{R}^{N})cap L^{infty}(mathbb{R}^{N})$. It is proved that, when the initial energy $ E(u_{0},u_{1})$, which corresponds to the problem, is non-negative and small, there exists a unique global solution in time in the space ${cal{X}}_{0}=:D(A) times {cal{D}}^{1,2}(mathbb{R}^{N})$. When the initial energy $E(u_{0},u_{1})$ is negative, the solution blows-up in finite time. For the proofs, a combination of the modified potential well method and the concavity method is used. Also, the existence of an absorbing set in the space ${cal{X}}_{1}=:{cal{D}}^{1,2}(mathbb{R}^{N}) times L {2}_{g}(mathbb{R}^{N})$ is proved and that the dynamical system generated by the problem possess an invariant compact set ${cal {A}}$ in the same space. Finally, for the generalized dissipative Kirchhoff''s String problem [u_{tt}=-||A^{1/2}u||^{2}_{H} Au-delta Au_{t}+f(u), ;; x in mathbb{R}^{N},; ; t geq 0;,]with the same hypotheses as above, we study the stability of the trivial solution $uequiv 0$. It is proved that if $f''(0)>0$, then the solution is unstable for the initial Kirchhoff''s system, while if $f''(0)<0$ the solution is asymptotically stable. In the critical case, where $f''(0)=0$, the stability is studied by means of the central manifold theory. To do this study we go through a transformation of variables similar to the one introduced by R. Pego.
    Keywords: Quasilinear Hyperbolic Equations, Global Solution, Blow, Up, Dissipation, Potential Well, Concavity Method, Unbounded Domains, Kirchhoff Strings, Generalised Sobolev Spaces
  • Zoran Kadelburg, Stojan Radenovic Pages 96-104
    In this paper, some recent results established by Marin Borcut [M. Borcut, Tripled fixed point theorems for monotone mappings in partially ordered metric spaces, Carpathian J. Math. 28, 2 (2012), 207--214] and [M. Borcut, Tripled coincidence theorems for monotone mappings in partially ordered metric spaces, Creat. Math. Inform. 21, 2 (2012), 135--142] are generalized and improved, with much shorter proofs. Also, examples are given to support these improvements.
    Keywords: Tripled coincidence point, $g$, monotone property, partially ordered set
  • Surjan Singh, Dinesh Kumar, K. N. Rai Pages 105-118
    In this paper, Wavelet Collocation Method has been used to solve nonlinear fin problem with temperature dependent thermal conductivity and heat transfer coefficient. Thermal conductivity of fin materials varies any type so that we consider thermal conductivity as the general function of temperature. Here we consider three particular cases, where we assume that thermal conductivity is constant, linear and exponential function oftemperature. In each case efficiency of fin is evaluated. The whole analysis is presented in dimensionless form and the effect of variability of fin parameter, exponent and thermal conductivity parameter on temperature distribution and fin efficiency is shown graphically and discussed in detail.
    Keywords: Collocation, conductivity, fin, temperature, transfer, wavelet
  • Panayotis Vyridis Pages 119-134
    We study the equilibrium states for an energy functional with a parametric force field on a region of a surface. Consideration of free equilibrium states is based on Lyusternik - Schnirelman''s and Skrypnik''s variational methods. Consideration of equilibrium states under a constraint of geometrical character is based on an analog of Skrypnik''s method, described in cite{vyr3}. In local coordinates, equilibrium points satisfy an elliptic boundary value problem.
    Keywords: Calculus of Variations, Critical points for the Energy Functional, Boundary Value Problem for an Elliptic PDE, Surface, Curvature
  • Abbas Javadian Pages 135-139
    We prove the generalized Hyers--Ulam stability of n--th order linear differential equation of the form $y^{(n)}+p_{1}(x)y^{(n-1)}+ cdots+p_{n-1}(x)y^{prime}+p_{n}(x)y=f(x $, with condition that there exists a non--zero solution of corresponding homogeneous equation. Our main results extend and improve the corresponding results obtained by many authors.
    Keywords: Hyers, Ulam stability, Linear differential equation, homogeneous equation
  • Sushanta Kumar Mohanta, Rima Maitra Pages 140-152
    In this paper, we prove some coupled coincidence point theorems for mappings satisfying generalized contractive conditions under a new invariant set in ordered cone metric spaces. In fact, we obtain sufficient conditions for existence of coupled coincidence points in the setting of cone metric spaces. Some examples are provided to verify the effectiveness and applicability of our results.
    Keywords: $psi $, map, $varphi $, map, coupled coincidence point, strongly $(F, g)$, invariant set
  • Zohreh Karimi, Mohsen Madadi, Mohsen Rezapour Pages 153-162
    In this paper, we obtain Bayesian prediction intervals as well as Bayes predictive estimators under square error loss for generalized order statistics when the distribution of the underlying population belongs to a family which includes several important distributions.
    Keywords: Bayes predictive estimators, Bayesian prediction intervals, order statistics, record values, $k$, record values, generalized order statistics