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Displaying 61 – 80 of 135

Mathematical foundations of geometric quantization.

Arturo Echeverría-Enriquez, Miguel C. Muñoz-Lecanda, Narciso Román-Roy, Carles Victoria-Monge (1998)

Extracta Mathematicae

Multiplicative integrable models from Poisson-Nijenhuis structures

Francesco Bonechi (2015)

Banach Center Publications

We discuss the role of Poisson-Nijenhuis (PN) geometry in the definition of multiplicative integrable models on symplectic groupoids. These are integrable models that are compatible with the groupoid structure in such a way that the set of contour levels of the hamiltonians in involution inherits a topological groupoid structure. We show that every maximal rank PN structure defines such a model. We consider the examples defined on compact hermitian symmetric spaces studied by F. Bonechi, J. Qiu...

Multiplicity-free complex manifolds.

A.T. Huckleberry, T. Wurzbacher (1990)

Mathematische Annalen

Natural and projectively invariant quantizations on supermanifolds.

Leuther, Thomas, Radoux, Fabian (2011)

SIGMA. Symmetry, Integrability and Geometry: Methods and Applications [electronic only]

Note sur la méthode des isopérimètres

Désiré André (1874)

Nouvelles annales de mathématiques : journal des candidats aux écoles polytechnique et normale

Notes on prequantization of moduli of $G$ -bundles with connection on Riemann surfaces

Andres Rodriguez (2004)

Annales mathématiques Blaise Pascal

Let $𝒳 \to S$ be a smooth proper family of complex curves (i.e. family of Riemann surfaces), and $ℱ$ a $G$ -bundle over $𝒳$ with connection along the fibres $𝒳 \to S$ . We construct a line bundle with connection $(ℒ_{ℱ}, \nabla_{ℱ})$ on $S$ (also in cases when the connection on $ℱ$ has regular singularities). We discuss the resulting $(ℒ_{ℱ}, \nabla_{ℱ})$ mainly in the case $G = ℂ^{*}$ . For instance when $S$ is the moduli space of line bundles with connection over a Riemann surface $X$ , $𝒳 = X \times S$ , and $ℱ$ is the Poincaré bundle over $𝒳$ , we show that $(ℒ_{ℱ}, \nabla_{ℱ})$ provides a prequantization of $S$ .

O funkcích goniometrických

Otakar Ježek (1884)

Časopis pro pěstování mathematiky a fysiky

O ploském obsahu kruhového výkrojku

Cornelius Plch (1884)

Časopis pro pěstování mathematiky a fysiky

O vypočítání obsahu komolého jehlance

Antonín Kostěnec (1884)

Časopis pro pěstování mathematiky a fysiky

On quantum de Rham cohomology theory.

Cao, Huai-Dong, Zhou, Jian (1999)

Electronic Research Announcements of the American Mathematical Society [electronic only]

On quantum vector fields in general relativistic quantum mechanics.

Janys̆ka, Joseph, Modugno, Marco (1997)

General Mathematics

On some spaces of linear functionals on the algebras $A_{p} (G)$ for locally compact groups

E. E. Granirer (1987)

Colloquium Mathematicae

On the classical and quantum evolution of lagrangian half-forms in phase space

Maurice De Gosson (1999)

Annales de l'I.H.P. Physique théorique

On the geometric prequantization of brackets.

Manuel de León, Juan Carlos Marrero, Edith Padrón (2001)

RACSAM

En este artículo se considera un marco general para la precuantización geométrica de una variedad provista de un corchete que no es necesariamente de Jacobi. La existencia de una foliación generalizada permite definir una noción de fibrado de precuantización. Se estudia una aproximación alternativa suponiendo la existencia de un algebroide de Lie sobre la variedad. Se relacionan ambos enfoques y se recuperan los resultados conocidos para variedades de Poisson y Jacobi.

Currently displaying 61 – 80 of 135

Previous Page 4 Next

Displaying 61 – 80 of 135

Mathematical foundations of geometric quantization.

Multiplicative integrable models from Poisson-Nijenhuis structures

Multiplicity-free complex manifolds.

Natural and projectively invariant quantizations on supermanifolds.

Note sur la méthode des isopérimètres

Notes on prequantization of moduli of $G$ -bundles with connection on Riemann surfaces

O funkcích goniometrických

O ploském obsahu kruhového výkrojku

O vypočítání obsahu komolého jehlance

On quantum de Rham cohomology theory.

On quantum vector fields in general relativistic quantum mechanics.

On some spaces of linear functionals on the algebras $A_{p} (G)$ for locally compact groups

On the classical and quantum evolution of lagrangian half-forms in phase space

On the geometric prequantization of brackets.

Poisson cohomology and quantization.

Poznámka k vypočítání obsahu trojbokého hranolu šikmého

Poznámka o sférické trigonometrii

Quantification de certains espaces hermitiens symétriques

Quantification d'une variété symplectique

Quantification et approximations semi-classiques

Currently displaying 61 – 80 of 135