I have been reading Algorithm design manual.

A diﬀerent idea might be to repeatedly connect the closest pair of endpoints whose connection will not create a problem, such as premature termination of the cycle. Each vertex begins as its own single vertex chain. After merging everything together, we will end up with a single chain containing all the points in it. Connecting the ﬁnal two endpoints gives us a cycle. At any step during the execution of this closest-pair heuristic, we will have a set of single vertices and vertex-disjoint chains available to merge. In pseudocode: ClosestPair(P) Let n be the number of points in set P. For i = 1 to n − 1 do d = ∞ For each pair of endpoints (s, t) from distinct vertex chains if dist(s, t) ≤ d then sm = s, tm = t, and d = dist(s, t) Connect (sm, tm) by an edge Connect the two endpoints by an edge Please note that sm and tm should be sm and tm.

why d = ∞ ? Coluld any one please explain the nearest-neighbour tour? Which book should I read before reading this book?