Mar 15, 2019
We describe three perspectives on higher quantization, using the example of magnetic Poisson structures which embody recent discussions of n
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We describe three perspectives on higher quantization, using the example of magnetic Poisson structures which embody recent discussions of n
We give a pedagogical introduction to the nonassociative structures arising from recent developments in quantum mechanics with magnetic mono
These notes were inspired by the course ''Quantum Field Theory from a Functional Integral Point of View'' given at the University of Zurich
"The spectral action in noncommutative geometry naturally implements an ultraviolet cut-off, by counting the eigenvalues of a (generalized) Dirac operator lower than an energy of unification. Inverting the well known question "how to hear the shape of a drum ?", we ask what drum can be designed by hearing the truncated music of the spectral action ? This makes sense because the same Dirac operator also determines the metric, via Connes distance. The latter thus offers an original way to implement the high-momentum cut-off of the spectral action as a short distance cut-off on space. This is a non-technical presentation of the results of this http URL."
Crystals, instantons and quantum toric geometry. (arXiv:1102.3861 [hep-th])
We describe the statistical mechanics of a melting crystal in three dimensions and its relation to a diverse range of models arising in combinatorics, algebraic geometry, integrable systems, low-dimensional gauge theories, topological string theory and quantum gravity. Its partition function can be computed by enumerating the contributions from noncommutative instantons to a six-dimensional cohomological gauge theory, which yields a dynamical realization of the crystal as a discretization of spacetime at the Planck scale. We describe analogous relations between a melting crystal model in two dimensions and N=4 supersymmetric Yang-Mills theory in four dimensions. We elaborate on some mathematical details of the construction of the quantum geometry which combines methods from toric geometry, isospectral deformation theory and noncommutative geometry in braided monoidal categories. In particular, we relate the construction of noncommutative instantons to deformed ADHM data, torsion-free modules and a noncommutative twistor correspondence. arXiv:1102.3861 [hep-th]
A motivic approach to phase transitions in Potts models. (arXiv:1102.3462 [math-ph])
We describe an approach to the study of phase transitions in Potts models based on an estimate of the complexity of the locus of real zeros of the partition function, computed in terms of the classes in the Grothendieck ring of the affine algebraic varieties defined by the vanishing of the multivariate Tutte polynomial. We give completely explicit calculations for the examples of the chains of linked polygons and of the graphs obtained by replacing the polygons with their dual graphs. These are based on a deletion-contraction formula for the Grothendieck classes and on generating functions for splitting and doubling edges. arXiv:1102.3462 [math-ph]
Hamilton-Jacobi Diffieties. (arXiv:1104.0162 [math.DG])
Diffieties formalize geometrically the concept of differential equation. We introduce and study Hamilton-Jacobi diffieties. They are finite dimensional subdiffieties of a given diffiety and appear to play a special role in the field theoretic version of the geometric Hamilton-Jacobi theory. arXiv:1104.0162 [math.DG]
Classical and Quantum Fields on Lorentzian Manifolds. (arXiv:1104.1158 [math-ph])
We construct bosonic and fermionic locally covariant quantum field theories on curved backgrounds for large classes of fields. We investigate the quantum field and n-point functions induced by suitable states.
arXiv:1104.1158 [math-ph]