One of the classical Travelling Salesman Problem (TSP) definitions is:

Given a weighted complete undirected graph where triangle inequality holds return an Hamiltonian path of minimal total weight.

In my case I do not want an Hamiltonian path, I need a path between two well known vertexes. So the formulation would be:

Given a weighted complete undirected graph where triangle inequality holds and two special vertexes called source and destination return a minimal weighted path that visits all nodes exactly once and starts from the source and ends to the destination.

I recall that an Hamiltonian path is a path in an undirected graph that visits each vertex exactly once.

For the original problem a good approximation (at worse 3/2 of the best solution) is the Christodes' algorithm, it is possible to modify for my case? Or you know another way?