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1. Verfasser: Volovich, Igor
Format: Preprint
Veröffentlicht: 2023
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Online-Zugang:https://arxiv.org/abs/2308.11377
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author Volovich, Igor
author_facet Volovich, Igor
contents There are at least two cosmological constants calling for explanation. The first one describes the quasi-de Sitter inflation in the early universe, and the second describes the current acceleration of the universe associated with dark energy. An approach to the computation of the inflationary cosmological constant in the early universe is proposed. The tunneling and no-boundary proposals suggest that the ground state of the early universe is the de Sitter space. In this paper it is argued that the radius of the de Sitter space, i.e. the cosmological constant, can be computed using the principle of maximum entropy. The universe emerges from ``nothing" that corresponds to a minimum of entropy. The entropy reaches its maximal value for the 4-dimensional de Sitter space with the inflationary cosmological constant $Λ=3π\,\exp\{-ψ(3/2)\}$, where $ψ$ is the digamma function, $Λ\approx 9.087$ in Planck units.
format Preprint
id arxiv_https___arxiv_org_abs_2308_11377
institution arXiv
publishDate 2023
record_format arxiv
spellingShingle Cosmological Constant and Maximum of Entropy for de Sitter Space
Volovich, Igor
High Energy Physics - Theory
There are at least two cosmological constants calling for explanation. The first one describes the quasi-de Sitter inflation in the early universe, and the second describes the current acceleration of the universe associated with dark energy. An approach to the computation of the inflationary cosmological constant in the early universe is proposed. The tunneling and no-boundary proposals suggest that the ground state of the early universe is the de Sitter space. In this paper it is argued that the radius of the de Sitter space, i.e. the cosmological constant, can be computed using the principle of maximum entropy. The universe emerges from ``nothing" that corresponds to a minimum of entropy. The entropy reaches its maximal value for the 4-dimensional de Sitter space with the inflationary cosmological constant $Λ=3π\,\exp\{-ψ(3/2)\}$, where $ψ$ is the digamma function, $Λ\approx 9.087$ in Planck units.
title Cosmological Constant and Maximum of Entropy for de Sitter Space
topic High Energy Physics - Theory
url https://arxiv.org/abs/2308.11377