Thomas Baier scite author profile

Abstract. We consider the metric space of all toric Kähler metrics on a compact toric manifold; when "looking at it from infinity" (following Gromov), we obtain the tangent cone at infinity, which is parametrized by equivalence classes of complete geodesics. In the present paper, we study the associated limit for the family of metrics on the toric variety, its quantization, and degeneration of generic divisors.The limits of the corresponding Kähler polarizations become degenerate along the Lagrangian fibration defined by the moment map. This allows us to interpolate continuously between geometric quantizations in the holomorphic and real polarizations and show that the monomial holomorphic sections of the prequantum bundle converge to Dirac delta distributions supported on Bohr-Sommerfeld fibers.In the second part, we use these families of toric metric degenerations to study the limit of compact hypersurface amoebas and show that in Legendre transformed variables they are described by tropical amoebas. We believe that our approach gives a different, complementary, perspective on the relation between complex algebraic geometry and tropical geometry.

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Quantization of abelian varieties: Distributional sections and the transition from Kähler to real polarizations

Baier¹,

Mourão²,

Nunes³

2010

Journal of Functional Analysis

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We study the dependence of geometric quantization of the standard symplectic torus on the choice of invariant polarization. Real and mixed polarizations are interpreted as degenerate complex structures. Using a weak version of the equations of covariant constancy, and the Weil-Brezin expansion to describe distributional sections, we give a unified analytical description of the quantization spaces for all non-negative polarizations. The Blattner-Kostant-Sternberg (BKS) pairing maps between half-form corrected quantization spaces for different polarizations are shown to be transitive and related to an action of Sp(2g, R). Moreover, these maps are shown to be unitary.

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Reducing fuel consumption through modular vehicle architectures

et al. 2012

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The Hitchin Connection in Arbitrary Characteristic

Baier¹,

Bolognesi²,

Martens³

et al. 2022

J. Inst. Math. Jussieu

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We give an algebro-geometric construction of the Hitchin connection, valid also in positive characteristic (with a few exceptions). A key ingredient is a substitute for the Narasimhan–Atiyah–Bott Kähler form that realizes the Chern class of the determinant-of-cohomology line bundle on the moduli space of bundles on a curve. As replacement we use an explicit realisation of the Atiyah class of this line bundle, based on the theory of the trace complex due to Beilinson–Schechtman and Bloch–Esnault.

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Thomas Baier

Toric Kähler metrics seen from infinity, quantization and compact tropical amoebas

Quantization of abelian varieties: Distributional sections and the transition from Kähler to real polarizations

Reducing fuel consumption through modular vehicle architectures

The Hitchin Connection in Arbitrary Characteristic

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