Rank-2 attractors and Fermat type CY n-folds

Abstract

The Fermat type Calabi-Yau n-fold, denoted by Fn, is the hypersurface of Pn+1 defined by Σi=0n+1xin+2=0, which is the smooth fiber over the Fermat point =0 of the Fermat pencil Σi=0n+1 xn+2i -(n+2)\, \, Πi=0n+1 xi =0. The nowhere vanishing holomorphic n-form on Fn defines an n+1 dimensional sub-Hodge structure of (Hn(Fn,Q),Fp). In this paper, we will formulate a conjecture which says that this n+1 dimensional sub-Hodge structure splits completely into the direct sum of pure Hodge structures with dimensions ≤ 2, among which is a direct summand Hna,1 whose Hodge decomposition is Hna,1=Hn,0(Fn) H0,n(Fn). Using numerical methods, we are able to explicitly construct such a split for the cases where n=3,4,6, while we also construct a partial split for the cases where n=8,10. For n=3,4,6,8,10, we have numerically found that the value of the mirror map t for the Fermat pencil at the Fermat point =0 is of the form t|=0=12+ \,i, where is a real algebraic number that intuitively depends on the integer n+2. Furthermore, we have also numerically found that the quotient c+(Hna,1)/c-(Hna,1) of the Deligne's periods of Hna,1 is an algebraic number for the cases where n=3,4,6,8,10, and in fact we will formulate a stronger conjecture generalizing this observation. We will also show that H4a,1 satisfies the prediction of Deligne's conjecture.