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Suppose that $X$ is an algebraic K3 surface (say polarized). If the singular divisor of $X$ is normal crossing... Do we have a moduli space parametrizing such $K3$ surfaces? If yes do we have a Toroidal compactification of it?

Any reference?

Thanks.

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    $\begingroup$ yes! For a modern account, have a look at Martin Olsson: "Semistable degenerations and period spaces for polarized K3 surfaces", Duke Math. J. 125, 121-203 (2004). There, the problem is analyzed from the point of view of logarithmic geometry and you find a discussion of the toroidal point of view (plus references). $\endgroup$ Commented Oct 14, 2012 at 3:43
  • $\begingroup$ great! thanks a lot! I will take a look! $\endgroup$ Commented Oct 14, 2012 at 4:36

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