Abstract
This article addresses the issue of possible gravitational phase transitions in the early universe. We suggest that a second-order phase transition observed in the Causal Dynamical Triangulations approach to quantum gravity may have a cosmological relevance. The phase transition interpolates between a nongeometric crumpled phase of gravity and an extended phase with classical properties. Transition of this kind has been postulated earlier in the context of geometrogenesis in the Quantum Graphity approach to quantum gravity. We show that critical behavior may also be associated with a signature change in Loop Quantum Cosmology, which occurs as a result of quantum deformation of the hypersurface deformation algebra. In the considered cases, classical space-time originates at the critical point associated with a second-order phase transition. Relation between the gravitational phase transitions and the corresponding change of symmetry is underlined.
Highlights
Quantum Graphity utilizes the idea of geometrogenesis - a transition between geometric and non-geometric phases of gravity (Konopka, Markopoulu, Smolin, 2006)
The transition is associated with a change of the connectivity structure between the elementary chunks of space
Recent developments in LQC indicate that the hypersurface deformation algebra (HDA) is deformed due to the quantum gravitational effects (See e.g. Bojowald, Paily, 2012)
Summary
Based on this Hamiltonian it is not so easy to predict that the water can be found in the three different phases: liquid, solid and gaseous. Each phase is described by a different effective theory: Water → Hydrodynamics (Navier-Stokes equations). Water → Hydrodynamics (Navier-Stokes equations) Water vapor → Equation of state (e.g. Clapeyron equation). Water → Hydrodynamics (Navier-Stokes equations) Water vapor → Equation of state (e.g. Clapeyron equation) Ice → Dynamics of rigid body
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