English

The Homotopy Obstructions in Complete Intersections

Commutative Algebra 2018-06-21 v4

Abstract

Let AA be a regular ring over a field kk, with 1/2k1/2\in k and dimension dd. We discuss the Homotopy Conjecture of Madhav V. Nori, in the complete intersection case (meaning when the projective module in question if free, of rank at least 2). Recently, an obstruction set (sheaf) π0(Q2n)(A)\pi_0(Q_{2n})(A) was introduced [F] to detect when a surjective map AnI/I2A^n\to I/I^2 lifts to a surjective map AnIA^n\to I. We establish that π0(Q2n)(A)\pi_0(Q_{2n})(A) coincides with the obstruction set of equivalence classes, originally suggested by Nori. We also establish that π0(Q2n)(A)\pi_0(Q_{2n})(A) has a natural groups structure, when 2nd+22n\geq d+2. Further, we establish that, when 2nd+22n\geq d+2, there is a surjective homomorphism En(A)π0(Q2n)(A)E^n(A) \to \pi_0(Q_{2n})(A) , where En(A)E^n(A) denotes the Euler class group defined by Bhatwadekar and Sridharan [BS2]. This homomorphism is an isomorphism, whenever triviality, in π0(Q2n)(A)\pi_0(Q_{2n})(A), of an orientation (I,ωI),guaranteesthat(I, \omega_I), guarantees that omega_Iliftstoasurjectivemap lifts to a surjective map A^n\to I$. We also give a Quadratic version of Lindel's Theorem, on extendibility of projective modules.

Keywords

Cite

@article{arxiv.1610.07495,
  title  = {The Homotopy Obstructions in Complete Intersections},
  author = {Satya Mandal and Bibekananda Mishra},
  journal= {arXiv preprint arXiv:1610.07495},
  year   = {2018}
}

Comments

J. of Rmamnujan Math Society (In press)

R2 v1 2026-06-22T16:29:43.602Z