# Growth of Solutions of Nonhomogeneous Linear Differential Equations

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In this paper, we mainly consider the growth and the oscillation of solutions of the second order nonhomogeneous linear differential equations ... where P (z), Q(z) are nonconstant polynomials such that deg (P) â‰ deg(Q) and hj (z) ... 0 (j = 0, 1), F (z) are meromorphic functions of finite...

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In this paper, we investigate the complex oscillation of the nonhomogeneous linear differential polynomial gf = d1fâ€² + d0f + b. Here d0 (z), d1 (z), b (z) are meromorphic functions such that at least one of d0 (z) and d1 (z) does not vanish identically with Ïp (dj) <âˆž (j = 0;1),...

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In this paper, we investigate the growth of solutions of the linear differential equation ... where k = 2 is an integer, Pj(z) (j = 0, 1, Â· Â· Â·, k - 1) are nonconstant polynomials and Aj(z) (â‰¢= 0), Bj (z) (â‰¢= 0) (j = 0, 1, Â· Â· Â·, k - 1) are meromorphic functions....