Analysis of the Stability of Bessel, Legendre and Euler Differential Equations


  • Muchammad Abrori UIN Sunan Kalijaga Yogyakarta


Bessel, Legendre, Euler differential equations, equilibrium point, locally asymptotically stable


The 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).


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How to Cite

Abrori, M. (2021). Analysis of the Stability of Bessel, Legendre and Euler Differential Equations. Jurnal Fourier, 10(1), 39–44. Retrieved from