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This work determines the entire family of positive integer solutions of the considered Diophantine equation. The solution is described in terms of (m−1)(m+n−2) 2 or (m−1)(m+n−1) 2 positive param ... Read More
The aim of this paper is to determine the monogenity of imaginary, and real biquadratic fields K over the field Q of rational numbers and the relative monogenity of K over its quadratic subfield k. ... Read More
In the present paper, the notion of (σ, t)-convex functions is used to proved some new results on inequalities for r-times differntiable convex functions, which are much same as famous Hermite Hadam ... Read More
In this paper, we study the family of graphs Wc2n for n ≥ 2, defined by removing the alternate spokes of a wheel graph with 2n rim vertices. We then determine the abstract structure of the critical ... Read More
In this paper, we proposed an unconditionally stable NonStandard Finite Difference (NSFD) scheme to solve nonlinear Riccati differential equation. The accuracy and efficiency of the proposed scheme i ... Read More
In this paper, liquid layer flow considering surface tension effect, encountering a convex corner has been discussed. The flow profile far upstream is fully developed. Half-Poiseuille gives exact s ... Read More
We use local cohomology to compute dimension and depth of monomial edge ideals of line and cycle graphs. In both cases we computed projective dimension as an application. ... Read More
A new Hermite-Hadamard inequality for p-convex(nonconvex) functions is obtained, which can be viewed as a refinement of known results. We derive some new inequalities for functions whose derivatives i ... Read More
Scores of intricate problems are churned out in mammalian cell owing to the influence of lipophilic aromatic hydrocarbons. Diffusion and reaction of these noxious compounds obliterate the cellular st ... Read More
Let C = (M, N) be a finite, undirected and simple graph with |M(C)| = t and |N(C)| = s. The labeling of a particular graph is a function which maps vertices and edges of graph or both into numbers ... Read More
In the following text we prove that for bijection ϕ : N → N and discrete set {1, . . . , k} with k ≥ 2, the generalized shift dynamical system ({1, . . . , k} N, σϕ) is e−chaotic, (expansive, posit ... Read More
Mathematical programming can be classified into linear and non linear programming. This study involved a literature knowledge of formal theory essential for understanding of optimization and investi ... Read More
In this article we give some characterizations of exponential stability for a periodic discrete evolution family of bounded linear operators acting on a Banach space in terms of discrete evolution se ... Read More
This paper is devoted to the concepts of fuzzy upper and fuzzy lower contra-continuous, contra-irresolute and contra semi-continuous multifunctions. Several characterizations and properties of these ... Read More
This paper is devoted to study a computation scheme to approximate solution of fractional differential equations (FDEs) and coupled system of FDEs with variable coefficients. We study some interesting ... Read More
.Queuing theory is the branch of Operations research in applied mathematics and deals with phenomenon of waiting lines. Queuing theory is concerned with the mathematical modeling and analysis of syst ... Read More
In this paper, we derive several weighted Hermite-HadmardNoor type inequalities for the differentiable preinvex functions and quasi preinvex functions. ... Read More
In this paper, we extend the idea of pseudo spectral method to approximate solution of time fractional order three-dimensional heat conduction equations on a cubic domain. We study shifted Jacobi po ... Read More
In this paper, we study the slicing of currents, with respect to a locally bounded plurisubharmonic function. For a positive closed current and its associated Lelong-Skoda potential, we prove that, ... Read More
Let G be a subdivision of a ladder graph. In this paper, we study magic evaluation with type (1, 1, 1) for a given any general ladder graph G. We prove that subdivided ladder admits magic evaluation ... Read More
We expand the convergence domain of Newton–like methods for solving nonlinear equations in a Banach space setting. Using more precise majorizing sequences, we provide a more precise local as well a ... Read More