Cracked polytopes and Fano toric complete intersections

Abstract: We introduce the notion of cracked polytope, and -making use of joint work with Coates and Kasprzyk -construct the associated toric variety X as a subvariety of a smooth toric variety Y under certain conditions. Restricting to the case in which this subvariety is a complete intersection, we present a sufficient condition for a smoothing of X to exist inside Y . We exhibit a relative anti-canonical divisor for this smoothing of X, and show that the general member is simple normal crossings.Conventions. Througho… Show more

“…In [13] we show that embeddings of X P into toric varieties, compactifying the embedding of affine varieties described above, are described by scaffoldings. Moreover, in [34] we show that embeddings of X P into non-singular toric ambient spaces Y correspond to the combinatorial condition that the scaffolding is full, see Definition 2.7 and Theorem 2.8. Theorem 1.1.…”

“…For general choices of S, the variety Y S may be highly singular: for example Y S need not be Q-Gorenstein. In [34] we explore the (restrictive) conditions on S which ensure that Y S is non-singular, and introduce the following notion.…”

“…Taking σ is minimal among such cones, σ corresponds to a non-singular toric stratum Z(σ) of the toric variety TV(Σ). It is shown in [34,Proposition 2.8] that the facet F of P • is a Cayley sum P D 1 · · · P D k , where {D i : 1 ≤ i ≤ k} is a set of nef divisors on Z(σ), and k = dim(σ) + 1. We call a face of P • vertical if it is contained in a factor P D i of some facet F = P D 1 · · · P D k and some i ∈ {1, .…”

“…We explain how to construct an extensible database of Fano manifolds in each dimension. In particular, we develop a combinatorial framework, based on the notion of cracked polytopes introduced in [34]. We show that this framework is flexible enough to obtain every Fano threefold with −K X very ample and b 2 ≥ 2, famously classified by Mori-Mukai [24][25][26][27][28].…”

“…(i) Intersecting the fan Σ with a lattice polytope P , we describe how the embedding of (C ) n determined by Σ may be compactified to an embedding of the toric variety X P in a non-singular toric variety Y . This is based on [34] and joint work [13] with Coates and Kasprzyk. (ii) The embedding of affine spaces determined by Σ admits various possible deformations, and we explicitly construct embedded deformations in Y by homogenizing the coordinate rings of such families.…”

From cracked polytopes to Fano threefolds

“…In [13] we show that embeddings of X P into toric varieties, compactifying the embedding of affine varieties described above, are described by scaffoldings. Moreover, in [34] we show that embeddings of X P into non-singular toric ambient spaces Y correspond to the combinatorial condition that the scaffolding is full, see Definition 2.7 and Theorem 2.8. Theorem 1.1.…”

“…For general choices of S, the variety Y S may be highly singular: for example Y S need not be Q-Gorenstein. In [34] we explore the (restrictive) conditions on S which ensure that Y S is non-singular, and introduce the following notion.…”

“…Taking σ is minimal among such cones, σ corresponds to a non-singular toric stratum Z(σ) of the toric variety TV(Σ). It is shown in [34,Proposition 2.8] that the facet F of P • is a Cayley sum P D 1 · · · P D k , where {D i : 1 ≤ i ≤ k} is a set of nef divisors on Z(σ), and k = dim(σ) + 1. We call a face of P • vertical if it is contained in a factor P D i of some facet F = P D 1 · · · P D k and some i ∈ {1, .…”

“…We explain how to construct an extensible database of Fano manifolds in each dimension. In particular, we develop a combinatorial framework, based on the notion of cracked polytopes introduced in [34]. We show that this framework is flexible enough to obtain every Fano threefold with −K X very ample and b 2 ≥ 2, famously classified by Mori-Mukai [24][25][26][27][28].…”

“…(i) Intersecting the fan Σ with a lattice polytope P , we describe how the embedding of (C ) n determined by Σ may be compactified to an embedding of the toric variety X P in a non-singular toric variety Y . This is based on [34] and joint work [13] with Coates and Kasprzyk. (ii) The embedding of affine spaces determined by Σ admits various possible deformations, and we explicitly construct embedded deformations in Y by homogenizing the coordinate rings of such families.…”

From cracked polytopes to Fano threefolds

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