Abstract
Let n and m be positive integers, n >= 3 and 1 <= m < n/2. The generalized Petersen graph P(n, m) is a graph with vertex set {x(1), x(2), ..., x(n), y(1), y(2), ... , yn} and edge set consisting of all edges of the form x(i)x(i+1), x(i)y(i) and y(i)y(i+m), where 1 <= i <= n, the subscripts are reduced modulo n.
In this paper, I compute that the generalized Petersen graphs P(n, m) are 3-total edge product cordial.