The confusion comes in because backtracking is something that happens during search, but it also refers to a specific problem-solving technique where a lot of backtracking is done. Such programs are called backtrackers.
Picture someone driving into a neighborhood, always taking the first turn he sees (let's assume there aren't any loops) until he hits a dead end. After the dead end, he then drives back to the intersection of the last unseen street. This the "first" kind of backtracking, and it's roughly equivalent to colloquial usage of the word.
Again, the more specific kind refers to a problem-solving strategy that is similar to depth-first search but adds logic to see if a particular branch is not worth going down.
DFS is uninformed; it blindly visits each node until it reaches the goal. It "backtracks" on leaf nodes (for a graph: terminal vertices). But a backtracker earns the name by also backtracking on useless branches, effectively pruning them. One example is searching a Boggle board for words. Each tile is surrounded by 8 others, so the tree gets very large, and dumb DFS might take too long. Why not ignore combinations like "ZZQ," since adding more letters won't ever make them into a word? Adding that logic makes it a backtracker.
I love these lectures by Julie Zelenski. She solves 8 queens, a sudoku puzzle, and a number substitution puzzle using backtracking, and everything is nicely animated.
Programming Abstractions, Lecture 10
Programming Abstractions, Lecture 11
A tree is a graph where any two vertices only have one path between them. This eliminates the possibility of cycles. When you're searching a graph that isn't a tree, you will probably have some logic to eliminate cycles anyway, so the behavior is the same. Also, if you have a directed graph, you obviously can't follow edges that don't go in the "wrong" direction.
(From what I can tell, in the Stallman paper they developed a logic system that doesn't just give you a yes or a no on a query but actually corrects "wrong" assumptions in bad queries by making the least amount of changes. You can kind of see where the first definition of backtracking might come into play.)