For $mn$ even, Prick wins. For $(m, n)=(3, 1)$ or $(1, 1)$ or $(1, 3)$ it is a tie, and for all other pairs Spike wins. If $mn$ is even, there is a pairing of adjacent squares that contains all squares, so every move Spike makes Prick can respond with the other square in the pair until he wins. It's easy to check the cases that are a tie. If $m, n$ are odd, and $m\geq5$ or $n\geq5$, I claim Spike wins. WLOG $m\geq5$. The strategy is to pick a square in the center column every time it is possible, and when it isn't the board has been split into at least 2 unconnected pieces, at least one of which has an odd number of squares. Take that piece, and keep picking pawns on it, until you have 1 left, and win. For $(m, n)=(3, 3)$ we can do a case bash: Pick the middle square. Assume WLOG Prick picks the bottom square. Pick the bottom right square, he must pick the right middle square. Now pick the upper left square. WLOG he picked the top middle square, now pick the top right square and win.