另一种变换叫做Rangaig变换

Norodin A. Rangaig, Norhamida D. Minor, G. F. Penonal, Jae Lord Dexter C. Filipinas, V. Convicto
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引用次数: 4

摘要

本文介绍了一种新的积分变换。推导并给出了该变换的基本性质,如卷积恒等式和阶跃Heaviside函数。对一些基本的线性微分方程进行了证明和验证,并成功地求解了Abel广义方程,并利用初值问题导出了第二类Volterra积分方程。在朗格格公式的基础上,通过对欧拉定积分的修正,建立并定义了自然对数(如logex=lnx)。因此,这个变换可以解决一些不同类型的积分和微分方程,它与其他已知的变换,如拉普拉斯变换,Sumudu变换和Elzaki变换竞争。关键词:让格变换,积分变换,线性常微分函数,积分-微分方程,卷积定理
本文章由计算机程序翻译,如有差异,请以英文原文为准。
On Another Type of Transform Called Rangaig Transform
A new Integral Transform was introduced in this paper. Fundamental properties of this transform were derived and presented such as the convolution identity, and step Heaviside function. It is proven and tested to solve some basic linear-differential equations and had succesfully solved the Abel's Generalized equation and derived the Volterra Integral Equation of the second kind by means of Initial Value Problem. The Natural Logarithm (e.g logex=lnx) has been established and defined by means of modifying the Euler Definite Integral based on the Rangaig's fomulation. Hence, this transform may solve some different kind of integral and differential equations and it competes with other known transforms like Laplace, Sumudu and Elzaki Transform. Keywords: Rangaig Transform, Integral Transform, linear ordinary differential function, Integro-differential equation, Convolution Theorem.
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