Digital Repository

Geometric and deformation quantization through examples

Show simple item record

dc.contributor.advisor Dey, Rukmini
dc.contributor.author PATEL, SATYEN
dc.date.accessioned 2026-05-18T05:37:02Z
dc.date.available 2026-05-18T05:37:02Z
dc.date.issued 2026-05
dc.identifier.citation 73 en_US
dc.identifier.uri http://dr.iiserpune.ac.in:8080/xmlui/handle/123456789/11006
dc.description.abstract We study the problem of quantization of classical mechanical systems from both geometric and algebraic perspectives, with the aim of understanding how the passage from commutative to non-commutative observable algebras is controlled by the geometric structures of the underlying phase space. We begin with the 𝐶∗-algebraic formulation of classical and quantum mechanics, showing how non-commutativity of the observable algebra leads to intrinsic uncertainty and the failure of simultaneous determinate values for incompatible observables. We then present geometric quantization via prequantization and polarization, followed by Berezin quantization on complex projective spaces using coherent states and reproducing kernel Hilbert spaces, including the induced quantization scheme of Dey-Ghosh for compact manifolds embedded in ℂℙ𝑛. Turning to the algebraic approach, we develop deformation quantization as the problem of constructing associative star products on Poisson manifolds. We present Fedosov’s construction for symplectic manifolds using flat connections on the Weyl bundle, and Kontsevich’s formality theorem for general Poisson manifolds via 𝐿∞ morphisms between Polyvector fields and polydifferential operators. We unify both perspectives through the Maurer-Cartan equation, identifying the flatness of connections, the Jacobi identity for Poisson structures, and the associativity of star products as instances of the same algebraic condition. In the main original contribution, we construct 𝐺-invariant star products with quantum moment maps on Poisson manifolds by embedding them into a formal symplectic groupoid and performing Fedosov quantization in the ambient symplectic manifold. The star product on the Poisson manifold is obtained by descending through an algebra isomorphism between the Weyl bundle on the ambient space and a Weyl bundle on the original manifold. When the manifold carries a Hamiltonian 𝐺-action with a 𝐺-invariant connection, we show that the descended star product is 𝐺-invariant and admits quantum moment maps. We conclude with a discussion of how the algebraic structures appearing in deformation quantization : Maurer-Cartan equations and differential graded Lie algebras, have a higher categorical interpretation. en_US
dc.language.iso en en_US
dc.subject geometric quantization en_US
dc.subject deformation theory en_US
dc.subject homological algebra en_US
dc.title Geometric and deformation quantization through examples en_US
dc.type Thesis en_US
dc.description.embargo One Year en_US
dc.type.degree BS-MS en_US
dc.contributor.department Dept. of Mathematics en_US
dc.contributor.registration 20211040 en_US


Files in this item

This item appears in the following Collection(s)

  • MS THESES [2219]
    Thesis submitted to IISER Pune in partial fulfilment of the requirements for the BS-MS Dual Degree Programme/MSc. Programme/MS-Exit Programme

Show simple item record

Search Repository


Advanced Search

Browse

My Account