# The Quantization of Gravity

Part of the Fundamental Theories of Physics book series (FTPH, volume 194)

Book

Part of the Fundamental Theories of Physics book series (FTPH, volume 194)

A unified quantum theory incorporating the four fundamental forces of nature is one of the major open problems in physics. The Standard Model combines electro-magnetism, the strong force and the weak force, but ignores gravity. The quantization of gravity is therefore a necessary first step to achieve a unified quantum theory. In this monograph a canonical quantization of gravity has been achieved by quantizing a geometric evolution equation resulting in a gravitational wave equation in a globally hyperbolic spacetime. Applying the technique of separation of variables we obtain eigenvalue problems for temporal and spatial self-adjoint operators where the temporal operator has a pure point spectrum with eigenvalues $\lambda_i$ and related eigenfunctions, while, for the spatial operator, it is possible to find corresponding eigendistributions for each of the eigenvalues $\lambda_i$, if the Cauchy hypersurface is asymptotically Euclidean or if the quantized spacetime is a black hole with a negative cosmological constant. The hyperbolic equation then has a sequence of smooth solutions which are products of temporal eigenfunctions and spatial eigendistributions. Due to this "spectral resolution" of the wave equation quantum statistics can also be applied to the quantized systems. These quantum statistical results could help to explain the nature of dark matter and dark energy.

Quantum theory of gravity Quantization of gravity Unified quantum theory Unified field theory Yang-Mills field Mass gap Spinor field Unified field theory Quantum statistics Dark energy density Explaining dark matter and dark energy

- DOI https://doi.org/10.1007/978-3-319-77371-1
- Copyright Information Springer International Publishing AG, part of Springer Nature 2018
- Publisher Name Springer, Cham
- eBook Packages Physics and Astronomy
- Print ISBN 978-3-319-77370-4
- Online ISBN 978-3-319-77371-1
- Series Print ISSN 0168-1222
- Series Online ISSN 2365-6425
- About this book