Add to ORKGThe Bessel, Legendre and Euler differential equations discussed in this paper are second-level differential equations. These three equations become a system with two equations. The equilibrium point of all three of these equations is at the point (0,0). These three equations are locally asymptotically stable at the equilibrium point (0,0)
This essay is concerned with stability theorems for systems described by non-linear and linear time-...
In this chapter we introduce definitions, theorems, and provide historical background pertinent to a...
This paper studies the stability of solutions of some third order nonautonomous differential equatio...
The Bessel, Legendre and Euler differential equations discussed in this paper are second-level diffe...
We solve the inhomogeneous Bessel differential equation and apply this result to obtain a partial s...
We solve the inhomogeneous Bessel differential equation and apply this result to obtain a partial so...
Using power series method, Kim and Jung (2007) investigated the Hyers-Ulam stability of the Bessel d...
Applied Differential Equations discusses the Legendre and Bessel Differential equations and its solu...
It is recognized that there are basically three categories of stability: Laplace, Liapunov, and Poin...
This paper deals with the stability analysis of the reaction-diffusion equation interconnected with ...
SIGLEAvailable from British Library Document Supply Centre- DSC:9106.1605(CU-DAMTP-NA--1/1992) / BLD...
We solve the nonhomogeneous Legendre’s differential equation and apply this result to obtaining a pa...
Não disponívelThe main purpose of this work is to study sufficient conditions under which we can gua...
Suitable for advanced undergraduates and graduate students, this was the first English-language text...
AbstractIn this paper we investigate the stability and instability of boundary layers of incompressi...
This essay is concerned with stability theorems for systems described by non-linear and linear time-...
In this chapter we introduce definitions, theorems, and provide historical background pertinent to a...
This paper studies the stability of solutions of some third order nonautonomous differential equatio...
The Bessel, Legendre and Euler differential equations discussed in this paper are second-level diffe...
We solve the inhomogeneous Bessel differential equation and apply this result to obtain a partial s...
We solve the inhomogeneous Bessel differential equation and apply this result to obtain a partial so...
Using power series method, Kim and Jung (2007) investigated the Hyers-Ulam stability of the Bessel d...
Applied Differential Equations discusses the Legendre and Bessel Differential equations and its solu...
It is recognized that there are basically three categories of stability: Laplace, Liapunov, and Poin...
This paper deals with the stability analysis of the reaction-diffusion equation interconnected with ...
SIGLEAvailable from British Library Document Supply Centre- DSC:9106.1605(CU-DAMTP-NA--1/1992) / BLD...
We solve the nonhomogeneous Legendre’s differential equation and apply this result to obtaining a pa...
Não disponívelThe main purpose of this work is to study sufficient conditions under which we can gua...
Suitable for advanced undergraduates and graduate students, this was the first English-language text...
AbstractIn this paper we investigate the stability and instability of boundary layers of incompressi...
This essay is concerned with stability theorems for systems described by non-linear and linear time-...
In this chapter we introduce definitions, theorems, and provide historical background pertinent to a...
This paper studies the stability of solutions of some third order nonautonomous differential equatio...