Sábháilte in:
| Príomhchruthaitheoir: | |
|---|---|
| Formáid: | Preprint |
| Foilsithe / Cruthaithe: |
2026
|
| Ábhair: | |
| Rochtain ar líne: | https://arxiv.org/abs/2605.00355 |
| Clibeanna: |
Cuir clib leis
Níl clibeanna ann, Bí ar an gcéad duine le clib a chur leis an taifead seo!
|
| _version_ | 1866913079986487296 |
|---|---|
| author | Rahman, Abdul |
| author_facet | Rahman, Abdul |
| contents | For a normal surface singularity, the discrepancy between the ordinary and dual middle-perversity intersection complexes over \(\mathbb Z\) is measured by a finite group \(E\). In previous work, \(E\) was identified with link torsion, the exceptional-lattice discriminant group \(Λ^\vee/Λ\), a resolution-neighborhood boundary quotient, and, in the hypersurface case, \(\operatorname{coker}(T-\mathrm{id})_{\mathrm{tors}}\). This paper tracks the trajectory of this torsion from local singularity data to global obstruction theory. We follow the discriminant package \((E,q)\) through support cohomology, excision, global torsion, Brauer comparison, Bloch--Ogus residues, and rationalization. The method is example-driven: trajectory tables are computed for \(A_1\), \(A_k\), \(D_4\), \(E_8\), a non-ADE Brieskorn singularity, the threefold ordinary double point, nodal threefolds, nodal quintics, and the Benoist--Ottem benchmark. The computations reveal a sharp distinction: a surface \(A_1\) singularity has local \(\mathbb Z/2\)-torsion, whereas a threefold ordinary double point has torsion-free link \(S^2\times S^3\) and contributes free vanishing-cycle data instead. Thus finite discriminant torsion is naturally a codimension-two phenomenon, not a generic feature of nodes. The resulting pattern motivates a specialization problem: whether the Enriques \(2\)-torsion in Benoist--Ottem integral Hodge counterexamples is genuinely global, or can arise after degeneration from transverse \(A_1\)-type discriminant data along codimension-two strata. |
| format | Preprint |
| id |
arxiv_https___arxiv_org_abs_2605_00355 |
| institution | arXiv |
| publishDate | 2026 |
| record_format | arxiv |
| spellingShingle | Torsion Trajectories from Local Discriminants to Global Obstructions Rahman, Abdul Algebraic Geometry Algebraic Topology Category Theory For a normal surface singularity, the discrepancy between the ordinary and dual middle-perversity intersection complexes over \(\mathbb Z\) is measured by a finite group \(E\). In previous work, \(E\) was identified with link torsion, the exceptional-lattice discriminant group \(Λ^\vee/Λ\), a resolution-neighborhood boundary quotient, and, in the hypersurface case, \(\operatorname{coker}(T-\mathrm{id})_{\mathrm{tors}}\). This paper tracks the trajectory of this torsion from local singularity data to global obstruction theory. We follow the discriminant package \((E,q)\) through support cohomology, excision, global torsion, Brauer comparison, Bloch--Ogus residues, and rationalization. The method is example-driven: trajectory tables are computed for \(A_1\), \(A_k\), \(D_4\), \(E_8\), a non-ADE Brieskorn singularity, the threefold ordinary double point, nodal threefolds, nodal quintics, and the Benoist--Ottem benchmark. The computations reveal a sharp distinction: a surface \(A_1\) singularity has local \(\mathbb Z/2\)-torsion, whereas a threefold ordinary double point has torsion-free link \(S^2\times S^3\) and contributes free vanishing-cycle data instead. Thus finite discriminant torsion is naturally a codimension-two phenomenon, not a generic feature of nodes. The resulting pattern motivates a specialization problem: whether the Enriques \(2\)-torsion in Benoist--Ottem integral Hodge counterexamples is genuinely global, or can arise after degeneration from transverse \(A_1\)-type discriminant data along codimension-two strata. |
| title | Torsion Trajectories from Local Discriminants to Global Obstructions |
| topic | Algebraic Geometry Algebraic Topology Category Theory |
| url | https://arxiv.org/abs/2605.00355 |