Games, hereditarily Baire hyperspaces and Mengerness at infinity

In my talk I will focus on the following problem: Let X be a separable metric space. When the hyperspace K(X) of all nonempty compact subsets of X endowed with the Hausdorff metric is hereditarily Baire?

A satisfactory answer to the above question was recently given by Gartside, Medini and Zdomskyy who observed its connection with a property of the remainder of some (any) compactification of X (the Menger property).

Using topological games, I will give an alternative, simple proof of their theorem. In fact, I will show that it easily reduces to a certain (simple) result of Telgarsky.