Tunneling, the Quillen Metric and Analytic Torsion for High Powers of a Holomorphic Line Bundle

We prove that if B is a k-positive holomorphic line bundle on a compact hyper-kähler manifold M, then HpM,Ωq⊗B=0 for P>n+[k/2] with q a nonnegative integer. In a special case, k=0 and q=0, we recover a vanishing theorem of Verbitsky’s with a little stronger assumption.

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RANK ONE CONNECTIONS ON ABELIAN VARIETIES, II

International Journal of Mathematics ◽

10.1142/s0129167x1250125x ◽

2012 ◽

Vol 23 (12) ◽

pp. 1250125

Author(s):

INDRANIL BISWAS ◽

JACQUES HURTUBISE ◽

A. K. RAINA

Keyword(s):

Line Bundle ◽

Exact Sequence ◽

Abelian Varieties ◽

Explicit Construction ◽

The Other ◽

Holomorphic Line Bundle ◽

Canonical Isomorphism ◽

Complex Torus ◽

Rank One

Given a holomorphic line bundle L on a compact complex torus A, there are two naturally associated holomorphic ΩA-torsors over A: one is constructed from the Atiyah exact sequence for L, and the other is constructed using the line bundle [Formula: see text], where α is the addition map on A × A, and p1 is the projection of A × A to the first factor. In [I. Biswas, J. Hurtvbise and A. K. Raina, Rank one connections on abelian varieties, Internat. J. Math.22 (2011) 1529–1543], it was shown that these two torsors are isomorphic. The aim here is to produce a canonical isomorphism between them through an explicit construction.

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The asymptotics of the analytic torsion on CR manifolds with S1 action

Communications in Contemporary Mathematics ◽

10.1142/s0219199717500948 ◽

2019 ◽

Vol 21 (04) ◽

pp. 1750094 ◽

Cited By ~ 1

Author(s):

Chin-Yu Hsiao ◽

Rung-Tzung Huang

Keyword(s):

Line Bundle ◽

Asymptotic Formula ◽

Analytic Torsion ◽

Cr Manifold ◽

Cr Manifolds ◽

Dimension Formula ◽

Positive Line Bundle ◽

Positive Line

Let [Formula: see text] be a compact connected strongly pseudoconvex CR manifold of dimension [Formula: see text], [Formula: see text] with a transversal CR [Formula: see text]-action on [Formula: see text]. We introduce the Fourier components of the Ray–Singer analytic torsion on [Formula: see text] with respect to the [Formula: see text]-action. We establish an asymptotic formula for the Fourier components of the analytic torsion with respect to the [Formula: see text]-action. This generalizes the asymptotic formula of Bismut and Vasserot on the holomorphic Ray–Singer torsion associated with high powers of a positive line bundle to strongly pseudoconvex CR manifolds with a transversal CR [Formula: see text]-action.

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CHEN–RUAN COHOMOLOGY OF SOME MODULI SPACES, II

International Journal of Mathematics ◽

10.1142/s0129167x10006094 ◽

2010 ◽

Vol 21 (04) ◽

pp. 497-522 ◽

Cited By ~ 1

Author(s):

INDRANIL BISWAS ◽

MAINAK PODDAR

Keyword(s):

Riemann Surface ◽

Line Bundle ◽

Prime Number ◽

Moduli Space ◽

Moduli Spaces ◽

Vector Bundles ◽

Line Bundles ◽

Holomorphic Line Bundle ◽

Stable Vector Bundles

Let X be a compact connected Riemann surface of genus at least two. Let r be a prime number and ξ → X a holomorphic line bundle such that r is not a divisor of degree ξ. Let [Formula: see text] denote the moduli space of stable vector bundles over X of rank r and determinant ξ. By Γ we will denote the group of line bundles L over X such that L⊗r is trivial. This group Γ acts on [Formula: see text] by the rule (E, L) ↦ E ⊗ L. We compute the Chen–Ruan cohomology of the corresponding orbifold.

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Quaternionic Dolbeault complex and vanishing theorems on hyperkähler manifolds

Compositio Mathematica ◽

10.1112/s0010437x07002746 ◽

2007 ◽

Vol 143 (6) ◽

pp. 1576-1592 ◽

Cited By ~ 12

Author(s):

Misha Verbitsky

Keyword(s):

Line Bundle ◽

Holomorphic Line Bundle ◽

Vanishing Theorems ◽

Vanishing Theorem ◽

Hyperkähler Manifolds ◽

Hyperkähler Manifold ◽

Dolbeault Complex

AbstractLet (M,I,J,K) be a compact hyperkähler manifold, $\dim _{\mathbb {H}}M=n$, and L a non-trivial holomorphic line bundle on (M,I). Using the quaternionic Dolbeault complex, we prove the following vanishing theorem for holomorphic cohomology of L. If c1(L) lies in the closure $\hat K$ of the dual Kähler cone, then Hi(L)=0 for i>n. If c1(L) lies in the opposite cone $-\hat K$, then Hi(L)=0 for i<n. Finally, if c1(L) is neither in $\hat K$ nor in $-\hat K$, then Hi(L)=0 for $i\neq n$.

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Stable Higgs bundles over positive principal elliptic fibrations

Complex Manifolds ◽

10.1515/coma-2018-0012 ◽

2018 ◽

Vol 5 (1) ◽

pp. 195-201

Author(s):

Indranil Biswas ◽

Mahan Mj ◽

Misha Verbitsky

Keyword(s):

Vector Bundle ◽

Line Bundle ◽

Complex Manifold ◽

Higgs Bundle ◽

Compact Complex Manifold ◽

Holomorphic Line Bundle ◽

Higgs Bundles ◽

Stable Vector Bundle ◽

Hermitian Metric ◽

The Third

AbstractLet M be a compact complex manifold of dimension at least three and Π : M → X a positive principal elliptic fibration, where X is a compact Kähler orbifold. Fix a preferred Hermitian metric on M. In [14], the third author proved that every stable vector bundle on M is of the form L⊕ Π ⃰ B0, where B0 is a stable vector bundle on X, and L is a holomorphic line bundle on M. Here we prove that every stable Higgs bundle on M is of the form (L ⊕ Π ⃰B0, Π ⃰ ɸX), where (B0, ɸX) is a stable Higgs bundle on X and L is a holomorphic line bundle on M.

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EXAMPLES OF A NON-VANISHING CONJECTURE OF KAWAMATA

International Journal of Mathematics ◽

10.1142/s0129167x07004229 ◽

2007 ◽

Vol 18 (05) ◽

pp. 527-533

Author(s):

YU-LIN CHANG

Keyword(s):

Line Bundle ◽

Complex Manifold ◽

Symmetric Spaces ◽

Sufficient Conditions ◽

Compact Complex Manifold ◽

Holomorphic Line Bundle ◽

Compact Type ◽

Hermitian Symmetric Spaces ◽

Canonical Line Bundle ◽

Positive Holomorphic Line Bundle

Let M be a compact complex manifold with a positive holomorphic line bundle L, and K be its canonical line bundle. We give some sufficient conditions for the non-vanishing of H0(M, K + L). We also show that the criterion can be applied to interesting classes of examples including all compact locally hermitian symmetric spaces of non-compact type, Mostow–Siu [10] surfaces, Kähler threefolds given by Deraux [3] and examples of Zheng [17].

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