Explicit rationality of some cubic fourfolds

Abstract

Recent results of Hassett, Kuznetsov and others pointed out countably many divisors Cd in the open subset of P55=P(H0(OP5(3))) parametrizing all cubic 4-folds and lead to the conjecture that the cubics corresponding to these divisors should be precisely the rational ones. Rationality has been proved by Fano for the first divisor C14 and in [arXiv:1707.00999] for the divisors C26 and C38. In this note we describe explicit birational maps from a general cubic fourfold in C14, in C26 and in C38 to P4, providing concrete geometric realizations of the more abstract constructions in [arXiv:1707.00999].