https://earthlinepublishers.com/index.php/ejms/issue/feedEarthline Journal of Mathematical Sciences2022-09-26T02:24:01+00:00Fabiola Malowneyejms@earthlinepublishers.comOpen Journal Systems<p style="text-align: justify;">The Earthline Journal of Mathematical Sciences (E-ISSN: 2581-8147) is a peer-reviewed international journal devoted to publishing original research papers containing substantial contributions in any direction of Pure and Applied Mathematics, Theoretical and Applied Statistics, Theoretical Computer Science, Mathematical Physics, Mathematical Chemistry, Mathematical Modelling, Mathematical Biology & Biostatistics. Applications of Mathematics in Finance and Economics are also welcome. .</p>https://earthlinepublishers.com/index.php/ejms/article/view/584The Kumaraswamy Unit-Gompertz Distribution and its Application to Lifetime Datasets2022-09-08T01:38:04+00:00Innocent U. Akataejms.earthline@gmail.comFestus C. Oponefestus.opone@physci.uniben.eduFrancis E. U. Osagiedeejms.earthline@gmail.com<p>This paper presents a new generalized bounded distribution called the Kumaraswamy unit-Gompertz (KUG) distribution. Some of the Mathematical properties which include; the density function, cumulative distribution function, survival and hazard rate functions, quantile, mode, median, moment, moment generating function, Renyi entropy and distribution of order statistics are derived. We employ the maximum likelihood estimation method to estimate the unknown parameters of the proposed KUG distribution. A Monte Carlo simulation study is carried out to investigate the performance of the maximum likelihood estimates of the unknown parameters of the proposed distribution. Two real datasets are used to illustrate the applicability of the proposed KUG distribution in lifetime data analysis.</p>2022-09-08T01:36:58+00:00Copyright (c) https://earthlinepublishers.com/index.php/ejms/article/view/586On Generalized Fibonacci Polynomials: Horadam Polynomials2022-09-09T17:18:21+00:00Yüksel Soykanyuksel_soykan@hotmail.com<p>In this paper, we investigate the generalized Fibonacci (Horadam) polynomials and we deal with, in detail, two special cases which we call them $(r,s)$-Fibonacci and $(r,s)$-Lucas polynomials. We present Binet's formulas, generating functions, Simson's formulas, and the summation formulas for these polynomial sequences. Moreover, we give some identities and matrices associated with these sequences. Finally, we present several expressions and combinatorial results of the generalized Fibonacci polynomials.</p>2022-09-09T00:00:00+00:00Copyright (c) https://earthlinepublishers.com/index.php/ejms/article/view/593Effects of Temperature Fluctuations on Darcy-Forchheimer Flow of Oil-Based Nanofluid with Activation Energy and Velocity Slip2022-09-14T16:06:00+00:00Christian John Etwirejecpapa@yahoo.comIbrahim Yakubu Seinidr.yseini@uds.edu.ghRabiu Musahmrabiu@uds.edu.ghOluwole Daniel Makindemakinded@gmail.com<p>The effects of fluctuating temperature on Darcy-Forchheimer flow of oil-based nanofluid with activation energy and velocity slip has been analyzed. Similarity transformation was used to transform the governing partial differential equations into coupled nonlinear ordinary differential equations and solved numerically with the aid of the fourth order Runge-Kutta algorithm with a shooting technique. Results for the embedded parameters controlling the flow dynamics have been tabulated and illustrated graphically. The slip velocity parameter was found to enhance the Nusselt number but depleted both the skin friction coefficient and Sherwood number while the local inertial was noted to increase both the skin friction coefficient and Sherwood number but diminishes the Nusselt number. These results indicate that the velocity slip parameter and local inertial coefficient can be used to control flow characteristics in industrial and engineering systems.</p>2022-09-14T00:00:00+00:00Copyright (c) https://earthlinepublishers.com/index.php/ejms/article/view/601Some Spectrum Estimates of the αq-Cesàro Matrices with 0 < α, q < 1 on c2022-09-26T02:24:01+00:00Merve Esra Türkaymesra@cumhuriyet.ed.tr<p>$q$-Calculus Theory is rapidly growing in various directions. The goal of this paper is to collect and underline recent results on $\alpha q$-analogs of the Cesàro matrix andemphasize various generalizations. One $\alpha q$-analogs of the Cesàro matrix of order one is the triangular matrix with nonzero entries $c_{nk}^{\alpha }\left( q\right) =\tfrac{\left( \alpha q\right) ^{n-k}}{1+q+\cdots +q^{n}},\ 0\leq k\leq n$, where $\alpha ,q\in \left( 0,1\right) $. The purpose of this article examines various spectral decompositions of $C_{q}^{\alpha }=\left( c_{nk}^{\alpha }\left( q\right) \right) $ such as the spectrum, the fine spectrum, the approximate point spectrum, the defect spectrum, and the compression spectrum on the sequence space $c$.</p>2022-09-26T00:00:00+00:00Copyright (c)