Author_Institution :
Dept. of Electr. Eng., Indian Inst. of Technol., Kharagpur, India
Abstract :
The author shows that the (α, β)-plane stability boundaries of the Hill equation, x¨+[α+βf(t)]x=0, f(t)=f(t+T), (which governs the behavior of many physical and engineering systems) can be obtained in a simple fashion by first evaluating a series of constants that depend only on f(t). Definite integral expressions of order k, k=1,2,..., are given that allow one to evaluate the kth constants explicitly for a given f(t). For square, triangular and cisoidal f(t)´s, these constants have been evaluated upto k=6, and the corresponding stability boundaries drawn
Keywords :
differential equations; integral equations; numerical stability; series (mathematics); Hill equation; Hill systems; constants evaluation; integral expressions; power series; stability boundaries; Circuits; Differential equations; Eigenvalues and eigenfunctions; Integral equations; Power engineering and energy; Stability analysis; Systems engineering and theory;
