Add to ORKGWe present a toy model of fuzzy Schwarzschild space slice (as a noncommutative manifold) which quantum mean values and quantum quasi-coherent states (states minimizing the quantum uncertainties) have properties close to the classical slice of the $(r,\theta)$ Schwarzschild coordinates (the so-called Flamm's paraboloid). This fuzzy Schwarzschild slice is built as a deformation of the noncommutative plane. Quantum time observables are introduced to add a time quantization in the model. We study the structure of the quasi-coherent state of the fuzzy Schwarzschild slice with respect to the quasi-coherent state and the deformation states of the noncommutative plane . The quantum dynamics of a fermion interacting with a fuzzy black hole described...
Projecting a quantum theory onto the Hilbert subspace of states with energies below a cutoff E¯¯¯¯ m...
We present some new fuzzy spheres of dimensions d≥1 covariant under the full orthogonal group O(D), ...
We investigate various aspects of noncommutative geometry and fuzzy field theory and their relations...
We present a toy model of fuzzy Schwarzschild space slice (as a noncommutative manifold) which quant...
International audienceWe present a toy model of a fuzzy Schwarzschild space slice (as a noncommutati...
Quantum Space-Time and Phase Space with fuzzy geometric structure are studied as possible formalism ...
Abstract. We review certain emergent notions on the nature of space-time from noncommutative geometr...
A novel approach to study the properties of models with quantum-deformed relativistic symmetries rel...
Fuzzy topology and geometry considered as the possible mathematical framework for novel quantum-mech...
Modeling the event horizon of a black hole by a fuzzy sphere it is shown that in the classical limit...
Dodson-Zeeman fuzzy topology considered as the possible mathematical framework of geometric quantum ...
Quantum space-time with DodsonÄZeeman topological structure is studied. In its framework the states ...
We study the non-commutative geometry associated with matrices of N quantum particles in matrix mode...
Guided by ordinary quantum mechanics we introduce new fuzzy spheres of dimensions d=1,2: we consider...
Projecting a quantum theory onto the Hilbert subspace of states with energies below a cutoff E¯¯¯¯ m...
We present some new fuzzy spheres of dimensions d≥1 covariant under the full orthogonal group O(D), ...
We investigate various aspects of noncommutative geometry and fuzzy field theory and their relations...
We present a toy model of fuzzy Schwarzschild space slice (as a noncommutative manifold) which quant...
International audienceWe present a toy model of a fuzzy Schwarzschild space slice (as a noncommutati...
Quantum Space-Time and Phase Space with fuzzy geometric structure are studied as possible formalism ...
Abstract. We review certain emergent notions on the nature of space-time from noncommutative geometr...
A novel approach to study the properties of models with quantum-deformed relativistic symmetries rel...
Fuzzy topology and geometry considered as the possible mathematical framework for novel quantum-mech...
Modeling the event horizon of a black hole by a fuzzy sphere it is shown that in the classical limit...
Dodson-Zeeman fuzzy topology considered as the possible mathematical framework of geometric quantum ...
Quantum space-time with DodsonÄZeeman topological structure is studied. In its framework the states ...
We study the non-commutative geometry associated with matrices of N quantum particles in matrix mode...
Guided by ordinary quantum mechanics we introduce new fuzzy spheres of dimensions d=1,2: we consider...
Projecting a quantum theory onto the Hilbert subspace of states with energies below a cutoff E¯¯¯¯ m...
We present some new fuzzy spheres of dimensions d≥1 covariant under the full orthogonal group O(D), ...
We investigate various aspects of noncommutative geometry and fuzzy field theory and their relations...