Horndeski's theory

Template:Short description Horndeski's theory is the most general theory of gravity in four dimensions whose Lagrangian is constructed out of the metric tensor and a scalar field and leads to second order equations of motion.Template:Clarify The theory was first proposed by Gregory Horndeski in 1974^[1] and has found numerous applications, particularly in the construction of cosmological models of Inflation and dark energy.^[2] Horndeski's theory contains many theories of gravity, including General relativity, Brans-Dicke theory, Quintessence, Dilaton, Chameleon and covariant Galileon^[3] as special cases.

Horndeski's theory can be written in terms of an action as^[4]

${\displaystyle S[g_{\mu \nu },\varphi ]=\int {\mathrm{d}}^{4}x\sqrt{-g}[{\displaystyle \sum _{i=2}^5}\frac{1}{8\pi G_{\text{N}}}{ℒ}_i[g_{\mu \nu },\varphi ]+{ℒ}_{\text{m}}[g_{\mu \nu },{\psi }_M]]}$

with the Lagrangian densities

${\displaystyle {ℒ}_2=G_2(\varphi ,X)}$

${\displaystyle {ℒ}_3=G_3(\varphi ,X)◻\varphi }$

${\displaystyle {ℒ}_4=G_4(\varphi ,X)R+G_{4,X}(\varphi ,X)[{\left(◻\varphi \right)}^2-{\varphi }_{;\mu \nu }{\varphi }^{;\mu \nu }]}$

${\displaystyle {ℒ}_5=G_5(\varphi ,X)G_{\mu \nu }{\varphi }^{;\mu \nu }-\frac{1}{6}{G}_{5,X}(\varphi ,X)[{\left(◻\varphi \right)}^3+2{{\varphi }_{;\mu }}^{\nu }{{\varphi }_{;\nu }}^{\alpha }{{\varphi }_{;\alpha }}^{\mu }-3{\varphi }_{;\mu \nu }{\varphi }^{;\mu \nu }◻\varphi ]}$

Here ${\displaystyle G_N}$ is Newton's constant, ${\displaystyle {ℒ}_m}$ represents the matter Lagrangian, ${\displaystyle G_2}$ to ${\displaystyle G_5}$ are generic functions of ${\displaystyle \varphi }$ and ${\displaystyle X}$ , ${\displaystyle R,G_{\mu \nu }}$ are the Ricci scalar and Einstein tensor, ${\displaystyle g_{\mu \nu }}$ is the Jordan frame metric, semicolon indicates covariant derivatives, commas indicate partial derivatives, ${\displaystyle ◻\varphi \equiv g^{\mu \nu }{\varphi }_{;\mu \nu }}$ ,${\displaystyle X\equiv -1/2g^{\mu \nu }{\varphi }_{;\mu }{\varphi }_{;\nu }}$ and repeated indices are summed over following Einstein's convention.

Many of the free parameters of the theory have been constrained, ${\displaystyle {ℒ}_1}$ from the coupling of the scalar field to the top field and ${\displaystyle {ℒ}_2}$ via coupling to jets down to low coupling values with proton collisions at the ATLAS experiment.^[5] ${\displaystyle {ℒ}_4}$ and ${\displaystyle {ℒ}_5}$, are strongly constrained by the direct measurement of the speed of gravitational waves following GW170817.^{[6][7][8][9][10][11]}

• Classical theories of gravitation
• General relativity
• Brans–Dicke theory
• Dual graviton
• Massive gravity
• Lovelock theory of gravity
• Alternatives to general relativity

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