Veneziano amplitude

Template:Short description In theoretical physics, the Veneziano amplitude refers to the discovery made in 1968 by Italian theoretical physicist Gabriele Veneziano that the Euler beta function, when interpreted as a scattering amplitude, has many of the features needed to explain the physical properties of strongly interacting mesons, such as symmetry and duality.^[1] Conformal symmetry was soon discovered. This discovery can be considered the birth of string theory,^[2] as the invention of string theory came about as a search for a physical model which would give rise to such a scattering amplitude. In particular, the amplitude appears as the four tachyon scattering amplitude in oriented open bosonic string theory. Using Mandelstam variables and the beta function ${\displaystyle B(x,y)}$, the amplitude is given by^[3]

${\displaystyle S(k_1,k_2,k_3,k_4)=\frac{2i{g}_o^2}{{\alpha }^{\prime }}(2\pi {)}^{26}{\delta }^{26}({\mathrm{\Sigma }}_i{k}_i)[B(\alpha (s),\alpha (t))+B(\alpha (s),\alpha (u))+B(\alpha (t),\alpha (u))]}$

where ${\displaystyle {\alpha }^{\prime }}$ is the string constant, ${\displaystyle k_i}$ are the tachyon four-vectors, ${\displaystyle g_o}$ is the open string theory coupling constant, and ${\displaystyle \alpha (x)=-1-{\alpha }^{\prime }x}$.

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• Beta function
• Crossing (physics)
• Dual resonance model
• History of string theory
• Regge theory
• Chan–Paton factor

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• String Theory and M-Theory, Lecture 6, Video lecture by Leonard Susskind on Veneziano amplitude. (Stanford University)

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