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Revista de teoría y aplicaciones de la mentira generalizada

Volumen 17, Asunto 1 (2023)

Mini reseña

Understanding Control Theory: Basics, Applications and Types of Controllers

Julian Stirling

Control theory is an interdisciplinary branch of engineering and mathematics that deals with the study of the behavior of dynamic systems and the design of feedback control systems that can regulate and stabilize these systems. Control theory has a wide range of applications, including aircraft and spacecraft control, process control, robotics and many others. In this essay, we will provide an overview of control theory, its key concepts and principles and its applications.

Mini reseña

Linear Differential Equations: Definition, Solution Methods and Properties

Gustav Sjobeck

This article provides an introduction to linear differential equations, which are equations involving derivatives of an unknown function that can be expressed as a linear combination of the function and its derivatives. After discussing the basic definitions and terminology, the article outlines various methods for solving linear differential equations, including separation of variables, integrating factors and the method of undetermined coefficients. It also covers some important properties of linear differential equations, such as linearity, superposition and the existence and uniqueness theorem. The article concludes by exploring some applications of linear differential equations in physics, engineering and other fields.

Reporte breve

Exploring Elliptic Equations and Systems: Properties and Applications

Ali Shokri

Elliptic equations and systems are a class of partial differential equations that arise in many areas of mathematics and science. These equations are characterized by their elliptic operators, which are differential operators that have properties similar to those of the Laplace operator. The study of elliptic equations and systems has important applications in fields such as physics, engineering, finance and computer science.

Investigación

Study on Models of the Lie Algebra Gu,v via Euler Integral Transformation

Sarasvati Yadav* and Shaifali Thakur

In this paper, we construct two variable and three variable models of the irreducible representation of Lie Algebra Gu,v. The two variable models are then transformed in terms of difference-differential operators using the Euler integral transformation while the three variable models are transformed in terms of difference-differential operators using the two-fold Euler integral transformation. These models are then used to obtain some generating functions and recurrence relations.

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