Abstract
In this paper, we consider the Wheeler–DeWitt equation modified by a deformation of the second quantized canonical commutation relations. Such modified commutation relations are induced by a Generalized Uncertainty Principle. Since the Wheeler–DeWitt equation can be related to a Sturm–Liouville problem where the associated eigenvalue can be interpreted as the cosmological constant, it is possible to explicitly relate such an eigenvalue to the deformation parameter of the corresponding Wheeler–DeWitt equation. The analysis is performed in a Mini-Superspace approach where the scale factor appears as the only degree of freedom. The deformation of the Wheeler–DeWitt equation gives rise to a Cosmological Constant even in absence of matter fields. As a Cosmological Constant cannot exist in absence of the matter fields in the undeformed Mini-Superspace approach, so the existence of a non-vanishing Cosmological Constant is a direct consequence of the deformation by the Generalized Uncertainty Principle. In fact, we are able to demonstrate that a non-vanishing Cosmological Constant exists even in the deformed flat space. We also discuss the consequences of this deformation on the big bang singularity.
Highlights
It is expected that the geometry of space–time cannot be measured below a minimum length scale, which is usually taken to be the Planck scale [1,2]
We have studied the cosmological constant problem using the deformed WDW equation
This deformed WDW equation was obtained by deforming the second quantized canonical commutation relations between the field variable and its conjugate momentum
Summary
It is expected that the geometry of space–time cannot be measured below a minimum length scale, which is usually taken to be the Planck scale [1,2]. The appearance of a minimum measurable length scale has been studied in the context of loop quantum gravity [9,10,11,12], in noncommutative field theories [13,14] and in black hole physics [15,16]. It may be noted that in the deformation of the first quantized theories, the GUP parameter can be related to the existence of an intrinsic measurable length scale in space. In ordinary GR, no cosmological constant without matter fields can be produced with the help of a VEV calculation in a Mini-superspace approach.2 It is for this reason, that the same procedure has been extended to theories outside GR.
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