Perverse Schobers and Orlov Equivalences

Naoki Koseki, Genki Ouchi · 2022 · arXiv 2201.05902

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From Finite-Node Conifold Geometry to BPS Structures III: Mediated Triangle Transport and Graded Interaction Data

math.AG · 2026-05-04 · unverdicted · novelty 5.0

Mediated triangle transport yields graded interaction polynomials I_Σ^gr from conifold state data, extending binary support structures for BPS and stability theory.

Cycle Relations and Global Gluing in Multi-Node Conifold Degenerations

math.AG · 2026-04-17 · unverdicted · novelty 5.0

Cycle relations in multi-node conifold degenerations constrain perverse and mixed-Hodge extensions to an incidence-controlled subspace, yielding R_res = R_sm = R_ext = R_blk in block-separated families.

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From Finite-Node Conifold Geometry to BPS Structures III: Mediated Triangle Transport and Graded Interaction Data math.AG · 2026-05-04 · unverdicted · none · ref 34
Mediated triangle transport yields graded interaction polynomials I_Σ^gr from conifold state data, extending binary support structures for BPS and stability theory.
Cycle Relations and Global Gluing in Multi-Node Conifold Degenerations math.AG · 2026-04-17 · unverdicted · none · ref 24
Cycle relations in multi-node conifold degenerations constrain perverse and mixed-Hodge extensions to an incidence-controlled subspace, yielding R_res = R_sm = R_ext = R_blk in block-separated families.

Perverse Schobers and Orlov Equivalences

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