The stability of a quadratic type functional equation with the fixed point alternative
Abstract
In this paper, we achieve the general solution and the generalized Hyers-Ulam-Rassias stability for the quadratic type functional equation &f(x+y+2cz)+f(x+y-2cz)+c2f(2x)+c2f(2y) &=2[f(x+y)+c2f(x+z)+c2f(x-z)+c2f(y+z)+c2f(y-z)] 2.6 cm for fixed integers c with c≠0,1, by using the fixed point alternative.
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