Corrigendum Corrigendum to my paper entitled ‘‘A note on the travelling wave solution to perturbed BurgersÕ equation’’ [Appl. Math. Modelling 26 (2002) 37–40] q H. Demiray * Department of Mathematics, Faculty of Arts and Sciences, Isik University, Buyukdere Caddesi Maslak, Istanbul 80670, Turkey Finding an analytical solution to various evolution equations like BurgersÕ equation, Korteweg de Vries (KdV) equation and the nonlinear Schr€ odinger (NLS) equation with perturbed terms is a difficult task. Nevertheless, motivated with the solution presented by Engelbrecht [1] for the perturbed KdV equation, in which he utilized the inverse scattering technique, I attempted to present an analytical solution to the perturbed BurgersÕ equation, but I noticed a principal error in it. With my apology, but without changing the result qualitatively, here, I shall present the cor- rected part of it. The statement, following Eq. (12) of the original article, should read: ‘‘Now, let us return to the investigation of equation (7), which reads g 0 ðsÞ gðsÞ  þ c 3  V þ a 0 ðsÞ aðsÞ fV 0 ¼ 0: ð1 0 Þ It is impossible to satisfy this equation point by point for all values of s and f. Therefore, we shall try to satisfy it in the averaged sense. Motivated with the solution presented by Engelbrecht [1] for the perturbed KdV equation, we shall first differentiate equation (7) with respect to f to obtain g 0 ðsÞ gðsÞ  þ a 0 ðsÞ aðsÞ þ c 3  V 0 þ a 0 ðsÞ aðsÞ fV 00 ¼ 0: ð2 0 Þ Here we note that V 0 is square integrable over ð1; þ1Þ but not V itself. Multiply- ing equation (2 0 ) with V 0 and integrating the result with respect to f from 1 to þ1, we obtain q PII of original article S0307-904X(01)00037-3. * Tel.: +90-212-286-29-60; fax: +90-212-286-57-96. E-mail address: demiray@isikun.edu.tr (H. Demiray). 0307-904X/03/$ - see front matter Ó 2003 Elsevier Science Inc. All rights reserved. doi:10.1016/S0307-904X(03)00052-0 Applied Mathematical Modelling 27 (2003) 489–490 www.elsevier.com/locate/apm