Determining Particular Solutions for Exponential-Polynomial Forcing Terms in Linear Nonhomogeneous Recurrence Relations
Abstract
This paper develops a systematic method for determining particular solutions of the kth-order linear nonhomogeneous recurrence relation an + c1 an-1 + ·s + ck an-k = Σj=1J pj(n)rjn with n ≥ k, ck ≠ 0, rj ≠ 0. Here each pj(n) is a polynomial. The main result is the following: for the characteristic polynomial c(t)=tk+c1tk-1+·s+ck, if sj denotes the multiplicity of rj as a root of c(t) (sj=0 when rj is not a root), then there exists a particular solution of the form qn=Σj=1J bj(n)nsjrjn, where each bj(n) is a polynomial of the same degree as pj(n). This result parallels the method of undetermined coefficients for linear ODEs with constant coefficients and yields a systematic procedure for determining the form of particular solutions.
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