Artículo
Blanco, D.; Casini, H.; Leston, M.; Rosso, F. "Modular energy inequalities from relative entropy" (2018) Journal of High Energy Physics. 2018(1)
Estamos trabajando para incorporar este artículo al repositorio
Consulte la política de Acceso Abierto del editor
Abstract:
We obtain new constraints for the modular energy of general states by using the monotonicity property of relative entropy. In some cases, modular energy can be related to the energy density of states and these constraints lead to interesting relations between energy and entropy. In particular, we derive new quantum energy inequalities that improve some previous bounds for the energy density of states in a conformal field theory. Additionally, the inequalities derived in this manner also lead us to conclude that the entropy of the state further restricts the possible amount of negative energy allowed by the theory. © 2018, The Author(s).
Registro:
| Documento: | Artículo |
| Título: | Modular energy inequalities from relative entropy |
| Autor: | Blanco, D.; Casini, H.; Leston, M.; Rosso, F. |
| Filiación: | Instituto de Astronomía y Física del Espacio, Universidad Nacional de Buenos Aires, Ciudad Autónoma de Buenos Aires, 1428, Argentina Centro Atómico Bariloche, S.C. de Bariloche, Río Negro 8400, Argentina Department of Physics and Astronomy, University of Southern California, Los Angeles, CA 90089-0484, United States |
| Palabras clave: | Conformal Field Theory; Field Theories in Higher Dimensions; Field Theories in Lower Dimensions |
| Año: | 2018 |
| Volumen: | 2018 |
| Número: | 1 |
| DOI: | http://dx.doi.org/10.1007/JHEP01(2018)154 |
| Título revista: | Journal of High Energy Physics |
| Título revista abreviado: | J. High Energy Phys. |
| ISSN: | 11266708 |
| Registro: | https://bibliotecadigital.exactas.uba.ar/collection/paper/document/paper_11266708_v2018_n1_p_Blanco |
Referencias:
- The role of relative entropy in quantum information theory (2002) Rev. Mod. Phys., , V. Vedral197 []
- Casini, H., Relative entropy and the Bekenstein bound (2008) Class. Quant. Grav., 25, p. 205021. , [] [INSPIRE]
- Bousso, R., Casini, H., Fisher, Z., Maldacena, J., Entropy on a null surface for interacting quantum field theories and the Bousso bound (2015) Phys. Rev. D, 91. , [] INSPIRE], and
- Bousso, R., Casini, H., Fisher, Z., Maldacena, J., Proof of a quantum Bousso bound (2014) Phys. Rev. D, 90. , [] INSPIRE], and
- Blanco, D.D., Casini, H., Hung, L.-Y., Myers, R.C., Relative entropy and holography (2013) JHEP, 8, p. 060. , [] [INSPIRE]
- Blanco, D.D., Casini, H., Localization of negative energy and the Bekenstein bound (2013) Phys. Rev. Lett., 111, p. 221601. , [] [INSPIRE]
- Epstein, H., Glaser, V., Jaffe, A., Nonpositivity of energy density in quantized field theories (1965) Nuovo Cim., 36, p. 1016. , [INSPIRE]
- Lectures on quantum energy inequalities, , C.J. Fewster[]
- Faulkner, T., Leigh, R.G., Parrikar, O., Wang, H., Modular hamiltonians for deformed half-spaces and the averaged null energy condition (2016) JHEP, 9, p. 038. , [] [INSPIRE]
- Hartman, T., Kundu, S., Tajdini, A., Averaged null energy condition from causality (2017) JHEP, 7, p. 066. , [] [INSPIRE]
- A general proof of the quantum null energy condition, , S. Balakrishnan, T. Faulkner, Z.U. Khandker and H. Wang[]
- Bekenstein, J.D., A universal upper bound on the entropy to energy ratio for bounded systems (1981) Phys. Rev. D, 23, p. 287. , [INSPIRE]
- Quantum energy inequalities in two-dimensional conformal field theory (2005) Rev. Math. Phys., , C.J. Fewster and S. Hollands577 [] []
- Pippenger, N., The inequalities of quantum information theory (2003) IEEE Trans. Inf. Theory, 49, p. 773
- Bisognano, J.J., Wichmann, E.H., On the duality condition for quantum fields (1976) J. Math. Phys., 17, p. 303. , [INSPIRE]
- Casini, H., Teste, E., Torroba, G., Modular Hamiltonians on the null plane and the Markov property of the vacuum state (2017) J. Phys. A, 50, p. 364001. , [] INSPIRE], and
- Casini, H., Huerta, M., Myers, R.C., Towards a derivation of holographic entanglement entropy (2011) JHEP, 5, p. 036. , [] [INSPIRE]
- Lectures on gravity and entanglement, , M. Van Raamsdonk[]
- Cardy, J., Tonni, E., Entanglement hamiltonians in two-dimensional conformal field theory (2016) J. Stat. Mech., 1612, p. 123103. , [] [INSPIRE]
- Arias, R., Blanco, D., Casini, H., Huerta, M., Local temperatures and local terms in modular Hamiltonians (2017) Phys. Rev. D, 95. , [] INSPIRE], and
- Modular groups of quantum fields in thermal states (1999) J. Math. Phys., , H.J. Borchers and J. Yngvason601 [] []
- Inviolable energy conditions from entanglement inequalities (2015) JHEP, , N. Lashkari et al.067 [] []
- Sutter, D., Tomamichel, M., Harrow, A.W., Strengthened monotonicity of relative entropy via pinched Petz recovery map (2016) IEEE Tran. Inf. Theor., 62, p. 2907
- Di Francesco, P., Mathieu, P., Senechal, D., (1997) Conformal field theory, , Springer, Germany
- Calabrese, P., Cardy, J.L., Entanglement entropy and quantum field theory (2004) J. Stat. Mech., 406. , [hep-th/0405152] INSPIRE], and
- Ford, L.H., Quantum coherence effects and the second law of thermodynamics (1978) Proc. Roy. Soc. Lond. A, 364, p. 227
Citas:
---------- APA ----------
Blanco, D., Casini, H., Leston, M. & Rosso, F. (2018) . Modular energy inequalities from relative entropy. Journal of High Energy Physics, 2018(1).http://dx.doi.org/10.1007/JHEP01(2018)154
---------- CHICAGO ----------
Blanco, D., Casini, H., Leston, M., Rosso, F. "Modular energy inequalities from relative entropy" . Journal of High Energy Physics 2018, no. 1 (2018).http://dx.doi.org/10.1007/JHEP01(2018)154
---------- MLA ----------
Blanco, D., Casini, H., Leston, M., Rosso, F. "Modular energy inequalities from relative entropy" . Journal of High Energy Physics, vol. 2018, no. 1, 2018.http://dx.doi.org/10.1007/JHEP01(2018)154
---------- VANCOUVER ----------
Blanco, D., Casini, H., Leston, M., Rosso, F. Modular energy inequalities from relative entropy. J. High Energy Phys. 2018;2018(1).http://dx.doi.org/10.1007/JHEP01(2018)154
