04138nam 22006735 450 991090379560332120250808090325.09783031679223303167922910.1007/978-3-031-67922-3(MiAaPQ)EBC31755849(Au-PeEL)EBL31755849(CKB)36514425700041(OCoLC)1468688097(DE-He213)978-3-031-67922-3(EXLCZ)993651442570004120241106d2024 u| 0engurcnu||||||||txtrdacontentcrdamediacrrdacarrierThe Quantization of Gravity /by Claus Gerhardt2nd ed. 2024.Cham :Springer Nature Switzerland :Imprint: Springer,2024.1 online resource (269 pages)Fundamental Theories of Physics,2365-6425 ;1949783031679216 3031679210 The quantization of a globally hyperbolic spacetime -- Interaction of gravity with Yang-Mills and Higgs fields -- The quantum development of an asymptotically Euclidean Cauchy hypersurface -- The quantization of a Schwarzschild-AdS black hole -- The quantization of a Kerr-AdS black hole -- A partition function for quantized globally hyperbolic spacetimes with a negative cosmological constant -- Appendix.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 hyperbolic equation in a fiber bundle, where the base space represents a Cauchy hypersurface of the quantized spacetime and the fibers the Riemannian metrics in the base space. The hyperbolic operator, a second order partial differential operator, acts both in the fibers as well as in the base space. In this second edition new results are presented which allow the solutions of the hyperbolic equation to be expressed as products of spatial and temporal eigenfunctions of self-adjoint operators. These eigenfunctions form complete bases in appropriate Hilbert spaces. The eigenfunctions depending on the fiber elements are a subset of the Fourier kernel of the symmetric space SL(n,R)/SO(n), where n is the dimension of the base space; they represent the elementary gravitons corresponding to the degrees of freedom in choosing the entries of Riemannian metrics with determinants equal to one. These are all the degrees of freedom available because of the coordinate system invariance: For any smooth Riemannian metric there exists an atlas such that in each chart the determinant of the metric is equal to one. In the important case n=3 the Standard Model could also be incorporated such that one can speak of a unified quantization of all four fundamental forces of nature.Fundamental Theories of Physics,2365-6425 ;194GravitationCosmologyMathematical physicsParticles (Nuclear physics)Quantum field theoryClassical and Quantum GravityCosmologyMathematical PhysicsElementary Particles, Quantum Field TheoryGravitation.Cosmology.Mathematical physics.Particles (Nuclear physics)Quantum field theory.Classical and Quantum Gravity.Cosmology.Mathematical Physics.Elementary Particles, Quantum Field Theory.530.1Gerhardt Claus835565MiAaPQMiAaPQMiAaPQBOOK9910903795603321Quantization of Gravity1867663UNINA