Cohomological Monodromy and Component-Group Corrections for Elliptic Curves with Bad Reduction: A Uniform $\ell$-Independent Lefschetz--Conductor Framework via Néron Models and Moduli Stacks

Rahul Thakurdas Kundnani,Shri  Kant,Khursheed  Alam

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Cohomological Monodromy and Component-Group Corrections for Elliptic Curves with Bad Reduction: A Uniform $\ell$-Independent Lefschetz--Conductor Framework via Néron Models and Moduli Stacks

R. T. Kundnani,

Sh. Kant,

K. Alam

2025-11-07

https://doi.org/10.24108/preprints-3113857

This paper develops a cohomological framework that unifies the study of local monodromy, component groups, and conductor formulas for elliptic curves with bad reduction. The approach isolates the contribution of the Néron component group from the inertia–invariant part of the $\ell$–adic cohomology, establishing a uniform trace identity compatible with geometric special fibers and arithmetic Frobenius actions. A categorical reformulation via moduli stacks of elliptic curves and their level structures provides a natural interpretation of local correction terms and connects them to global conductor and root–number phenomena. The resulting formulation is $\ell$–independent, stack–theoretic, and equally suited to tame and potentially good additive cases, offering a coherent bridge between the geometry of degenerations and the arithmetic of $L$–functions.

Ссылка для цитирования:

Kundnani R. T., Kant Sh., Alam K. 2025. Cohomological Monodromy and Component-Group Corrections for Elliptic Curves with Bad Reduction: A Uniform $\ell$-Independent Lefschetz--Conductor Framework via Néron Models and Moduli Stacks. PREPRINTS.RU. https://doi.org/10.24108/preprints-3113857

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