Scattering Amplitudes and the Navier-Stokes Equation
- Creators
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Cheung, Clifford
- Mangan, James
Abstract
We explore the scattering amplitudes of fluid quanta described by the Navier-Stokes equation and its non-Abelian generalization. These amplitudes exhibit universal infrared structures analogous to the Weinberg soft theorem and the Adler zero. Furthermore, they satisfy on-shell recursion relations which together with the three-point scattering amplitude furnish a pure S-matrix formulation of incompressible fluid mechanics. Remarkably, the amplitudes of the non-Abelian Navier-Stokes equation also exhibit color-kinematics duality as an off-shell symmetry, for which the associated kinematic algebra is literally the algebra of spatial diffeomorphisms. Applying the double copy prescription, we then arrive at a new theory of a tensor bi-fluid. Finally, we present monopole solutions of the non-Abelian and tensor Navier-Stokes equations and observe a classical double copy structure.
Additional Information
C.C. and J.M. are supported by the DOE under grant no. DE- SC0011632 and by the Walter Burke Institute for Theoretical Physics. We would like to thank Maria Derda, Andreas Helset, Cynthia Keeler, Julio Parra-Martinez, Ira Rothstein, and Mikhail Solon for discussions and comments on the draftAttached Files
Submitted - 2010.15970.pdf
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Additional details
- Eprint ID
- 106621
- Resolver ID
- CaltechAUTHORS:20201111-131014384
- Department of Energy (DOE)
- DE-SC0011632
- Created
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2020-11-11Created from EPrint's datestamp field
- Updated
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2023-06-02Created from EPrint's last_modified field
- Caltech groups
- Walter Burke Institute for Theoretical Physics
- Other Numbering System Name
- CALT-TH
- Other Numbering System Identifier
- 2020-044