For odd $n$ the first player chooses $n-2$ candies and eat them so he wins(except for $n=1$ where he obviously wins).for even $n$ first player should take odd number of candies so he will become second player and $n$ will be odd.So first player wins iff $n \equiv 1 \pmod 2$.

Easy::: There are two cases::: $\boxed{1}n$ is odd number. LEMMA:For odd $n$ ,$(n,n-2)=1$ Using that the first player eats $n-2$ candles there are $2$ candles remained.Second eats 1 and first eats the last one and wins. $\boxed{2}n$ is even. Notice First player should and will take an odd number of candles.Now second player continues to the game as first player and takes $n-k-2$ candles and wins... So::: $\mathcal{WINNER}=\begin{cases}First\to n=2k+1\\ Second\to n=2k\end{cases}$ $\boxed{\lambda}$