after trying to find the answer for this problem for the last few days and crawling through loads of papers and notes, I decided to ask in case someone else has a good example for me.
I am trying to give a specific example of a extensive form game in which there is a pure Nash Equilibrium but no Subgame-perfect Nash equilibrium. Following from Kuhn (1953) I know that it has to be a game of imperfect information.
Does anyone have a good example for me on what such a game would look like?
I went through the threads here and checked if there was such a question, but couldn't find one. Another thread suggested Matching pennies in extensive form but that only has a Nash equilibrium in mixed strategies. But I am looking for an example with pure strategies.
Many thanks in advance!