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The study of motile microorganism and the nano-particles of the MHD fluid flow over the porous stretching sheet with buoyancy forces are made. Boundaries conditions along non-zero mass flux are impo ... Read More
In this study, vibration frequency analysis of three layered functionally graded material (FGM) cylinder-shaped shell is studied with FGM central layer whereas the internal and external layers are o ... Read More
In this paper, the concept of permuting tri-multiderivation on incline algebra is initiated and some results are proved by using this idea. ... Read More
In this paper, we explore for the bicomplex version of the well known Hadamard’s three circles theorem in complex analysis and also deduce its convex form. Also, the relation between zeros and poles ... Read More
The main purpose of this article is to present the new concepts of asymptotically deferred statistical equivalent and strongly asymptotically deferred statistical equivalence by considering two non n ... Read More
The target of the existing paper is to acquaint the new spaces B r,s ∞ , B r,s , B r,s bp and B r,s reg which consist of all double sequences whose binomial-transforms are in the spaces Mu, ... Read More
A magma that satisfies the left invertive law: ab · c = cb · a is called an AG-groupoid. The concept of right (left) abelian distributive groupoid (RAD resp. LAD) is extended to introduce some new s ... Read More
In mathematical chemistry, molecular structure of any chemical substance can be expressed by a numeric number or polynomial or sequence of number which represent the whole graph is called topological ... Read More
Syntactic models for generating the approximating polygon patterns of space-filling curves such as the well-known Peano and Hilbert curves have been studied in the recent past. Here we consider the ... Read More
In this paper, we will introduce the (s, t)-Padovan quaternions matrix sequence. Starting the studies based on the generalization of the Padovan quaternion coefficients in relation to their recurren ... Read More
Intensity inhomogeneity or bias field in natural and medical images make image processing challenging. In this paper we have introduced a novel technique in which we first estimate the bias field usi ... Read More
In this article, we exploit the cross-entropy of picture hesitant fuzzy set is established by distinguishing the cross-entropy of picture fuzzy set and hesitant fuzzy set. First, many measurement con ... Read More
Let G be a finite group with identity element e. The intersection power graph ΓIP (G) of G is the undirected graph whose vertex set is the elements of G and two distinct vertices a, b are adjacent in ... Read More
In this article, to monitor the rise in the public Ebola Virus, we will discuss the complex transmission and epidemic problems. The Caputo-Fabrizio fractional derivative operator of order Ω ∈ (0, 1] ... Read More
The motivation of this activity is to introduce the notion of bi p-sequentially complete ordered dislocated quasi G-metric spaces and to obtain fixed point results for a pair of multivalued mappings ... Read More
In this paper the author has considered two-step methods proposed by Ford and Moghrabi with new values of delta. As, it is evident in literature that quasi-Newton methods (single/multi-step) for solu ... Read More
The rank-based method is a well-known robust estimation technique in analyzing linear models, it serves as an alternative to Restricted Maximum Likelihood Estimation (REML) for non-normal error dist ... Read More
The main objective of this paper is to communicate the concept of a class of generalized functions, known as generalized geometrically convex functions. We derive numerous consequences associated to ... Read More
In this article, we establish some new integral inequalities on fractional calculus operator i.e. k-Caputo fractional derivative operator. As a consequence, we obtain new variety of fractional integ ... Read More
This paper is devoted to present a simple but efficient numerical method for solving the 2D Volterra-Fredholm integral equation (VFIE). Both mixed and separate types of VFIEs are considered. The unde ... Read More
This paper attempts to carry out a study on a specific type of time-fractional differential equation called Benjamin-Bona-MahonyBurger (BBM-Burger). This equation describes the mathematical model of ... Read More
In this paper, we compute many degree-based topological indices like First general Zagreb index, Randic index, ABC-index, Reciprocal Randic index, Reduced Reciprocal index, Inverse Sum index, Symmetri ... Read More
In probability theory, researchers always prefer a model having simple structure with small estimation cost and higher adequacy for real life data applications. Therefore, in this study we have devel ... Read More
A perfect coloring of a graph G with m color (a perfect mcoloring) is a surjective mapping P : V (G) → {1, 2, . . . , m} such that each vertex of color i has exactly mij neighbors of color j, for all ... Read More
Soft set theory has gained significant worth since its emergence. Soft algebraic structures have been discussed in numerous researches with the help of sub algebraic structures. Properties of soft a ... Read More
In this paper, we discuss some more properties of quasi topological loops when multiplication mapping is separately irresolute, separately semi-continuous and separately G-semi-continuous with their i ... Read More
In this paper, we study the oscillatory character of a generalized differential equation of order α + α with α ∈ (0, 1]. Generalized criteria of Kamenev type are obtained, which are extensions of sev ... Read More
This study aims to propose extensions of morphisms in the geometry of configuration and Goncharov motivic chain complexes. First, the geometry of these complexes will be extended for weight 3 by int ... Read More
We establish several basic inequalities for exponentially geometrically convex function in fractional integrals versions, also we define a new identity for Riemann-Liouville fractional integrals and u ... Read More
The main purpose of this paper is to give the Opial-type inequalities using radial fractional derivative operators, such as RiemannLiouville, Caputo radial fractional derivative operators with related ... Read More
We construct a family of 2-step simultaneous methods for determining all the distinct roots of single variable non-linear equations. We further extend this family of simultaneous methods to the case ... Read More
In the following text we compute possible heights of A (Alexandroff square), O (unit square [0, 1] × [0, 1] with lexicographic order topology) and U (unit square [0, 1] × [0, 1] with induced topology ... Read More
In this paper, we use a new weighted identity to establish new integral inequalities of Fejer and Hermite-Hadamard type involving ´ hconvex and quasi-convex functions. Several applications of our fin ... Read More
In this paper, we introduce a binomial ideal P(Tn) on a simple graph Tn obtained from n−triangulation of a 2−manifols. It is discussed on two particular classes of n−triangulation graphs: the class ... Read More
Mathematical modeling of the molecular graphs plays a fundamental part in the analysis of the quantitative structures activity relationship (QSAR) and quantitative structures property relationship mod ... Read More
We provide the optimal bounds for the sine and hyperbolic tangent means in terms of various weighted means of the arithmetic and root-mean square means ... Read More
The studies of inequalities regarding the fractional differential and integral operators are considered to be essential because of their potential applications among researchers. This paper consigns ... Read More
The objective of this article is to develop the link between probability distribution theory and subdivision schemes. The distribution theory is a field of statistics and subdivision is a field of Com ... Read More
The main objective of this work is to numerically solve three types of Fourth order Emden-Fowler equations by using Successive Differentiation Method (SDM) and to inspect its shape factor ‘k’ in deta ... Read More
Uncertainty is a human instinct that prevails on the mind of a person while making an important decision. Decision making is the most integral part of human life which has a potential to change an e ... Read More
The aim of this paper is to derive a new quantum analogue of an integral identity by using (p, q)-calculus. As a consequence of this identity, some new estimates for Ostrowski type inequality for (p ... Read More
The incompressible, steady and laminar micropolar fluid flow through a resistive porous medium between channel walls with mass and heat deportation, by considering the effect of heat generation, is ... Read More
. A topological index (TI) is a function from P to the set of real numbers, where P is the set of finite simple graphs. In fact, it is a final outcome of a logical, systematical and mathematical pro ... Read More
This paper is an exposition on how Grothendieck’s Quot scheme can be seen as a solution to the moduli problem of quotient sheaves. These schemes as corresponding moduli spaces play a significant rol ... Read More
Hepatitis C virus (HCV) is a single strained RNA virus. It is one of the leading cause of liver-related mortality worldwide. Globally, 115 million people are infected with HCV. This study aims to fin ... Read More
This article deals with the family of extended Mittag-Leffler function in short ML-function defined in terms of extended Beta function, which depends upon the bounded sequence {κn}. The focus of the ... Read More
We have defined a new generalised closed set called nIαg closed sets in nano ideal topological spaces. Also, association of nIαg closed sets with various existing closed sets are studied. Characteri ... Read More
Most of the real life problems embroil uncertainties, imprecision and vagueness. Fuzzy multisets and Pythagorean fuzzy sets, initially suggested by Yager, are significant mathematical models to hand ... Read More
This work comprises of development and analysis of a new mathematical model based on Descemet’s Stripping Endothelial Keratoplasty (DSEK). Formulating the nonlinear system of ordinary differential e ... Read More
In this article, we compute tables of values for the Riemann-Liouville fractional derivative of the generalized polylogarithm functions considering parameter values µ = 3; 4; 5 and s = 1 2 ; 3 2 ... Read More
The Inverse Kinematic Task of Robots of redundant open kinematic chain normally does not have closed form analytical solution. The generally viable approach applies the Differential Inverse Kinematic ... Read More
In this paper, time-fractional Gardner’s Ostrovsky equation is considered which represents the shallow water wave phenomena of strong interacting internal Waves with rotational effects. Using the n ... Read More
In this paper, we establish several new upper bounds of HermiteHadamard type integral inequalities for harmonically relative preinvex functions and their different types such as s-harmonic preinvex f ... Read More
In this research paper, we apply OHAM and HAM to establish and solve the problem concerning two-dimensional exponential stretching sheets. The governing nonlinear differential equations are modeled ... Read More
In this work, we have proposed a new quartic Bspline (QBS) approximation technique for numerical treatment of fourth order singular boundary value problems. The typical QBS functions in association ... Read More
In this article, we introduce the concept of Pythagorean m-polar fuzzy soft sets (PmFSSs). This set reduces to Pythagorean fuzzy soft set for m = 1. We define algebraic operations and some characte ... Read More
In this work, four well known time Fractional Partial Differential Equations (FPDEs) namely, time Fractional Fornberg-Whitham Equation (FFWE), time Fractional KdV Equation (FKdVE), time Fractional Co ... Read More
This paper comes out with a fascinating fusion of soft sets, multisets and rough sets. We introduce novel concepts of soft multi rough sets (SMR-Sets) and soft multi approximation spaces. We presen ... Read More
. In this article some new fixed point and hybrid coincidence point theorems for multivalued mappings satisfying generalized contractive conditions have been proved in generalized metric spaces. Some ... Read More
The special non-autonomous Birkhoffian equations with consistent algebraic structure are studied and it has been shown that the special form of integrable Birkhoffian vector fields are equivalent to t ... Read More
:This article concerns existence of oscillatory solutions of the conformable fractional equations with damping of the form ³ ` ³ y (α) ´γ´(β) (s) + g ¡ s, xγ µ (s) ¢ = 0, for all s ∈ J0, ... Read More
This paper presents modified Potra and Ptak method to solve ´ nonlinear equations having single variable using McDougall and Wotherspoon scheme. Also two iterative methods are obtained as variants of ... Read More
. In this study, the geometry of a first order tangent group and of configuration chain complexes is proposed. First, the morphisms are introduced to define the geometry for weight n = 4, and then t ... Read More
In the article, we present several new Hermite-Hadamard type inequalities for the exponentially GA and GG-convex functions by use of an integral identity. Our results are the refinements and improve ... Read More
The reason of this paper is to earn fixed point theorem on six metric spaces using contractive type mapping. This theorem generalizes the results given in ... Read More
This paper is based on the investigation and characterization of the properties of quasi G-s-topological loops. Moreover, we have also introduced the notion of quasi G-s-topological loop having inver ... Read More
In this paper, we study the small oscillations of a system formed by an elastic container with negligible density and a heavy heterogeneous inviscid liquid filling partially the container, in the par ... Read More
The paper suggests conditions for preserving the shape properties of the original data using the ternary 4-point non-stationary interpolating subdivision scheme. Sufficient conditions with a suitable ... Read More
The main objective of this article is to establish integral identity relating the left side of Hermite- Hadamard type inequality. By using this identity, we establish some new Hermite-Hadamard type i ... Read More
A groupoid with the left invertive law is an LA-semigroup or an Abel-Grassmann’s groupoid (AG-groupoid). This in general is a nonassociative structure that lies between a groupoid and a commutative s ... Read More
In this paper, we define two different kinds of neutrosophic submodules over a classical quotient R-module using single valued neutrosophic set. We also define neutrosophic submodule homomorphism an ... Read More
this paper devoted to study the existence of a unique solution of the fractional Hammerstein integro-differential equations in the Banach space via the fixed point theorems. The main purpose is base ... Read More
Stock price forecasting, which is an important topic in finance and economics, has prodded the enthusiasm of specialists throughout the years to develop models for better forecasts. Stock market is ... Read More