標題: An algebraic approach to BCJ numerators
作者: Fu, Chih-Hao
Du, Yi-Jian
Feng, Bo
電子物理學系
Department of Electrophysics
關鍵字: Scattering Amplitudes;Gauge Symmetry
公開日期: 1-三月-2013
摘要: One important discovery in recent years is that the total amplitude of gauge theory can be written as BCJ form where kinematic numerators satisfy Jacobi identity. Although the existence of such kinematic numerators is no doubt, the simple and explicit construction is still an important problem. As a small step, in this note we provide an algebraic approach to construct these kinematic numerators. Under our Feynman-diagram-like construction, the Jacobi identity is manifestly satisfied. The corresponding color ordered amplitudes satisfy off-shell BCJ relation and off-shell BCJ relation similar to the color ordered scalar theory. Using our construction, the dual DDM form is also established.
URI: http://dx.doi.org/10.1007/JHEP03(2013)050
http://hdl.handle.net/11536/21740
ISSN: 1029-8479
DOI: 10.1007/JHEP03(2013)050
期刊: JOURNAL OF HIGH ENERGY PHYSICS
Volume: 
Issue: 3
結束頁: 
顯示於類別:期刊論文


文件中的檔案:

  1. 000317521200050.pdf

若為 zip 檔案,請下載檔案解壓縮後,用瀏覽器開啟資料夾中的 index.html 瀏覽全文。