Ambitwistors-strings and amplitudes
APA
Mason, L. (2015). Ambitwistors-strings and amplitudes. Perimeter Institute. https://pirsa.org/15050064
MLA
Mason, Lionel. Ambitwistors-strings and amplitudes. Perimeter Institute, May. 29, 2015, https://pirsa.org/15050064
BibTex
@misc{ pirsa_PIRSA:15050064, doi = {10.48660/15050064}, url = {https://pirsa.org/15050064}, author = {Mason, Lionel}, keywords = {Mathematical physics}, language = {en}, title = {Ambitwistors-strings and amplitudes}, publisher = {Perimeter Institute}, year = {2015}, month = {may}, note = {PIRSA:15050064 see, \url{https://pirsa.org}} }
University of Oxford
Collection
Talk Type
Subject
Abstract
These lectures will focus on the geometry of ambitwistor string theories. These are infinite tension analogues of conventional strings and provide the theory that leads to the remarkable formulae for tree amplitudes that have been developed by Cachazo, He and Yuan based on the scattering equations. Although the bosonic ambitwistor string action is expressed in space-time, it will be seen that its target is classically `ambitwistor space', the space of complexified null geodesics in the complexification of a space-time. The lectures will review Ambitwistor constructions from the 70's and 80's that extend the Penrose-Ward twistor constructions for self-dual Yang-Mills and gravitational fields in four dimensions to arbiitrary fields in general dimension. LeBrun showed that the conformal geometry of a space-time is encoded into the complex structure of ambitwistor space. The linearized version encodes linear fields on space-time into sheaf cohomology classes on ambitwistor space. In the case of momentum eigenstates, these give the `scattering equations' that underly the CHY formulae and the ambitwistor string can be used to compute amplitudes via these formulae. If there is time, the lectures will discuss how different matter theories can be obtained, different geometric realizations of ambitwistor space lead to different formulae, the relationship between the asymptotic symmetries of space-time and Weinberg's soft theorems concerning the behaviour of amplitudes when momenta become small, and/or extensions of the ideas to loop amplitudes.