2023 PreprintHelp me understand this report
Resolutions of toric subvarieties by line bundles and applications
Abstract: Given any toric subvariety Y of a smooth toric variety X of codimension k, we construct a length k resolution of O Y by line bundles on X. Furthermore, these line bundles can all be chosen to be direct summands of the pushforward of O X under the map of toric Frobenius. The resolutions are built from a stratification of a real torus that was introduced by Bondal and plays a role in homological mirror symmetry.As a corollary, we obtain a virtual analogue of Hilbert's syzygy theorem for smooth projective toric v…
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“…We now describe applications of Theorem 1.2 and their history. For a fuller discussion, see [HHL,ยง1]. We start with a special case, first proven by Hanlon-Hicks-Lazarev:…”
Section: Theorem 12 Let Y Be a Normal Toric Variety And ๐ โฉโ ๐ A Clos...mentioning
confidence: 99%
“…We now describe applications of Theorem 1.2 and their history. For a fuller discussion, see [HHL,ยง1]. We start with a special case, first proven by Hanlon-Hicks-Lazarev:…”
Section: Theorem 12 Let Y Be a Normal Toric Variety And ๐ โฉโ ๐ A Clos...mentioning
confidence: 99%
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