Traveling wave solutions for a non-monotone Logistic equation in a cylinder

The traveling wave solutions connecting two equilibria for a delayed Logistic equation in a cylinder are obtained for any delay $\tau >0$. We attain our goal by using the approach based on the combination of Schauder fixed point theory and the weak coupled upper–lower solutions method. Moreover, we prove that there is a constant $c^1$ that serves as the minimal wave speed of such traveling wave solutions.