The first order uniform chemical reaction of a viscous incompressible unsteady flow of fluid passing on an oscillatory infinite long vertical plate is studied with modified temperature and uniform mas ... Read More

In this paper, the right hand side for quantum analogue of the famous Hermite-Hadamard’s inequality for s-convex functions is presented. Some quantum estimates for the right hand side of the φ-analog ... Read More

To find the minima of an energy functional, is a well known problem in physics and engineering. Sobolev gradients have proven to be affective to find the critical points of a functional. Here, we in ... Read More

In this paper, we present wide-ranging families of subdivision schemes for fitting data to subdivision models. These schemes are constructed by fitting multivariate polynomial functions of any degree ... Read More

In this paper, we have modified Jungck Mann and Jungck Ishikawa iteration schemes, and their convergence has been proved in the arbitrary Banach space. Comparison of these modified iteration schemes ... Read More

First order tangent complex is studied by Siddiqui in [11]. There he has introduced morphisms for the first order tangent complex and connected this complex to the famous Grassmannian complex. In th ... Read More

This manuscript introduces a new alteration to the Homotopy Perturbation Method by coupling it with the Laplace Transform. The corresponding Homotopy Perturbation Laplace Method (HPLM) promises bett ... Read More

In this paper, we introduce and study certain subclasses of analytic functions involving Salagean operator. For these classes, the FeketeSzego type coefficient inequalities associated with the ¨ k-th ... Read More

There are several papers which discuss the Bayesian analysis of the mixture models under type I singly censored samples. This paper considers a new methodology for Bayesian analysis of mixture model ... Read More

In this article, first we prove a new integral identity and present some general inequalities of Hadamard’s type for the functions whose third derivative are concave (convex). Second applications fo ... Read More

The goal of this paper is to throw light on the novel concept of measurable soft mappings. The criteria for an extended real-valued soft mapping to be a Lebesgue measurable soft mapping would also b ... Read More

In this letter, we introduce meromorphically starlike functions by using a particular class of analytic functions that present authors applied in 2012 [cf.[1]]. These functions map the punctured unit ... Read More

The notions of closure∗ and interior∗ operators are extended to a fuzzy topology. We start with new concepts called fuzzy infra-semiopen (infra-semiclosed) sets. In applying these concepts, new sort ... Read More

In this paper, we prove the existence of a super edge magic total (SEMT) labeling on some particular subclasses of the disjoint union of subdivided stars. ... Read More

A magma that also satisfies the left invertive law, (ab) c = (cb) a is called an AG-groupoid. Generally, an AG-groupoid is a non-associative structure lying midway between a groupoid and a commutat ... Read More

Using a technique of Kalnins, unitary irreducible representation ( UIR) of principle series of SO(2, 1), decomposed according to the group T1, are realized in the space of homogeneous functions on th ... Read More

The aim of this paper is to establish similar results to that of G. Bennett[2] and C. P. Niculescu[4] in the context of functions which are 3-convex/concave at a point ... Read More

In this paper, we introduce a new class of bicomplex polynomials, namely self-inversive bicomplex polynomials, and investigate the necessary and sufficient condition for any bicomplex polynomial to b ... Read More

In this paper we apply an efficient approaches based on Bernstein polynomials to solve one-dimensional partial differential equations (PDEs) subject to the given nonlocal conditions. The main idea is ... Read More

In this study, an extension of Mangat Randomized Response Technique using alternative beta priors has been considered and new Bayes estimators of population proportion of respondents possessing stig ... Read More

The aim of this paper is to give new refinements of the Hardytype inequality for arbitrary convex function with different kernels. ... Read More

In this article, we use modified RiemannLiouville derivative and two transformations for converting the (2+1)-dimensional fractional Schrodinger equation into corresponding ordinary differential equ ... Read More

The study of optimal control problems (OCPs) are of great importance in our day life. In literature, there are many articles on the numerical solutions of OCPs on different mathematical methods. In ... Read More


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