Resumen
Krylov complexity, or K-complexity for short, has recently emerged as a new probe of chaos in quantum systems. It is a measure of operator growth in Krylov space, which conjecturally bounds the operator growth measured by the out of time ordered correlator (OTOC). We study Krylov complexity in conformal field theories by considering arbitrary 2d CFTs, free field, and holographic models. We find that the bound on OTOC provided by Krylov complexity reduces to bound on chaos of Maldacena, Shenker, and Stanford. In all considered examples including free and rational CFTs Krylov complexity grows exponentially, in stark violation of the expectation that exponential growth signifies chaos.
| Idioma original | English |
|---|---|
| Número de artículo | L081702 |
| Publicación | Physical Review D |
| Volumen | 104 |
| N.º | 8 |
| DOI | |
| Estado | Published - oct 15 2021 |
Nota bibliográfica
Publisher Copyright:© 2021 Published by the American Physical Society
Financiación
United States-Israel Binational Science Foundation We thank Alex Avdoshkin, Paweł Caputa, Mark Mezei and Alexander Zhiboedov for discussions. This work is supported by the United States-Israel BSF Grant No. 2016186.
| Financiadores | Número del financiador |
|---|---|
| United States-Israel BSF | 2016186 |
| United States-Israel Binational Science Foundation |
ASJC Scopus subject areas
- Nuclear and High Energy Physics
Huella
Profundice en los temas de investigación de 'Krylov complexity in conformal field theory'. En conjunto forman una huella única.Citar esto
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