Birational geometry of rational quartic surfaces
Abstract
Two birational subvarieties of Pn are called Cremona equivalent if there is a Cremona modification of Pn mapping one to the other. If the codimension of the varieties is at least 2 then they are always Cremona Equivalent. For divisors the question is much more subtle and a general answer is unknown. In this paper I study the case of rational quartic surfaces and prove that they are all Cremona equivalent to a plane.
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