Geometry of bounded domains

Kobayashi, Shôshichi

doi:10.1090/s0002-9947-1959-0112162-5

Cited by 201 publications

(124 citation statements)

References 19 publications

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“…For our purposes, a Bergman metric [18,14] on a compact Riemann surface of genus g ≥ 1 is a Riemannian structure of the form (2.8)…”

Section: Definition 22mentioning

confidence: 99%

Singularities of Abel-Jacobi maps and geometry of dissolving vortices

Romão¹

2012

jsing

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Abstract. Gauged vortices are configurations of fields for certain gauge theories in fibre bundles over a surface Σ. Their moduli spaces support natural L 2 -metrics, which are Kähler, and whose geodesic flow approximates vortex scattering at low speed. This paper focuses on vortices in line bundles, for which the moduli spaces are modeled on the spaces Σ (k) of effective divisors on Σ with a fixed degree k; we describe the behaviour of the underlying L 2 -metrics in a "dissolving limit" where the L 2 -geometry simplifies. In such limit, the metrics degenerate precisely at the singular locus of the Abel-Jacobi map AJ of Σ at degree k, and their geometry can be understood in terms of the variety W k = AJ(Σ (k) ) inside the Jacobian of Σ. Some intuition about the behaviour of the geodesic flow close to a singularity is provided through the study of the simplest example (resolution of a double point on a surface), corresponding to two dissolving vortices moving on a hyperelliptic curve of genus three.

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“…For our purposes, a Bergman metric [18,14] on a compact Riemann surface of genus g ≥ 1 is a Riemannian structure of the form (2.8)…”

Section: Definition 22mentioning

confidence: 99%

Singularities of Abel-Jacobi maps and geometry of dissolving vortices

Romão¹

2012

jsing

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“…[16], on how to holomorphically embed a noncompact C within CP(H). This procedure is applied in section 7.3 in order to quantise C.…”

Section: Cp(h) As a Classical Phase Spacementioning

confidence: 99%

From Geometry to Quantum Mechanics

Maeda¹,

Ochiai²,

Michor³

et al. 2007

Progress in Mathematics

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This Festschrift in honour of J. A. de Azcárraga 1 gives an introduction to the concept of duality, i.e., to the relativity of the notion of a quantum, in the context of the quantum mechanics of a finite number of degrees of freedom. Although the concept of duality arises in string and M-theory, Vafa has argued that it should also have a counterpart in quantum mechanics, before moving on to second quantisation, fields, strings and branes. We illustrate our analysis with the case when classical phase space is complex projective space, but our conclusions can be generalised to other complex, symplectic phase spaces, both compact and noncompact.

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“…-Rappelons d'abord un résultat classique, dû à Siegel : si un domaine borné dans C^ est balayable, il est holomorphiquement convexe (cf. [7], théor. 6.1-et 6.2; le balayage suffit à entraîner que la métrique de Bergman est complète).…”

Section: Donnons Maintenant Des Exemples De S-domainesunclassified

Sur la division des domaines de Siegel

Vey¹

1970

Ann. Sci. École Norm. Sup.

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Geometry of bounded domains

Cited by 201 publications

References 19 publications

Singularities of Abel-Jacobi maps and geometry of dissolving vortices

Singularities of Abel-Jacobi maps and geometry of dissolving vortices

From Geometry to Quantum Mechanics

Sur la division des domaines de Siegel

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