Expectation value of T T ¯ $$ \mathrm{T}\overline{\mathrm{T}} $$ operator in curved spacetimes
Abstract We study the expectation value of the T T ¯ $$ \mathrm{T}\overline{\mathrm{T}} $$ operator in maximally symmetric spacetimes. We define an diffeomorphism invariant biscalar whose coinciding limit gives the expectation value of the T T ¯ $$ \mathrm{T}\overline{\mathrm{T}} $$ operator. We sho...
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2020-02-01
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| Series: | Journal of High Energy Physics |
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| Online Access: | http://link.springer.com/article/10.1007/JHEP02(2020)094 |
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doaj-6ca7d4a76af34ffe8f635822af682e082020-11-25T03:48:43ZengSpringerOpenJournal of High Energy Physics1029-84792020-02-012020212610.1007/JHEP02(2020)094Expectation value of T T ¯ $$ \mathrm{T}\overline{\mathrm{T}} $$ operator in curved spacetimesYunfeng Jiang0Theoretical Physics Department, CERNAbstract We study the expectation value of the T T ¯ $$ \mathrm{T}\overline{\mathrm{T}} $$ operator in maximally symmetric spacetimes. We define an diffeomorphism invariant biscalar whose coinciding limit gives the expectation value of the T T ¯ $$ \mathrm{T}\overline{\mathrm{T}} $$ operator. We show that this biscalar is a constant in flat spacetime, which reproduces Zamolodchikov’s result in 2004. For spacetimes with non-zero curvature, we show that this is no longer true and the expectation value of the T T ¯ $$ \mathrm{T}\overline{\mathrm{T}} $$ operator depends on both the one- and two-point functions of the stress-energy tensor.http://link.springer.com/article/10.1007/JHEP02(2020)094Effective Field TheoriesField Theories in Lower DimensionsRenormalization Group |
| collection |
DOAJ |
| language |
English |
| format |
Article |
| sources |
DOAJ |
| author |
Yunfeng Jiang |
| spellingShingle |
Yunfeng Jiang Expectation value of T T ¯ $$ \mathrm{T}\overline{\mathrm{T}} $$ operator in curved spacetimes Journal of High Energy Physics Effective Field Theories Field Theories in Lower Dimensions Renormalization Group |
| author_facet |
Yunfeng Jiang |
| author_sort |
Yunfeng Jiang |
| title |
Expectation value of T T ¯ $$ \mathrm{T}\overline{\mathrm{T}} $$ operator in curved spacetimes |
| title_short |
Expectation value of T T ¯ $$ \mathrm{T}\overline{\mathrm{T}} $$ operator in curved spacetimes |
| title_full |
Expectation value of T T ¯ $$ \mathrm{T}\overline{\mathrm{T}} $$ operator in curved spacetimes |
| title_fullStr |
Expectation value of T T ¯ $$ \mathrm{T}\overline{\mathrm{T}} $$ operator in curved spacetimes |
| title_full_unstemmed |
Expectation value of T T ¯ $$ \mathrm{T}\overline{\mathrm{T}} $$ operator in curved spacetimes |
| title_sort |
expectation value of t t ¯ $$ \mathrm{t}\overline{\mathrm{t}} $$ operator in curved spacetimes |
| publisher |
SpringerOpen |
| series |
Journal of High Energy Physics |
| issn |
1029-8479 |
| publishDate |
2020-02-01 |
| description |
Abstract We study the expectation value of the T T ¯ $$ \mathrm{T}\overline{\mathrm{T}} $$ operator in maximally symmetric spacetimes. We define an diffeomorphism invariant biscalar whose coinciding limit gives the expectation value of the T T ¯ $$ \mathrm{T}\overline{\mathrm{T}} $$ operator. We show that this biscalar is a constant in flat spacetime, which reproduces Zamolodchikov’s result in 2004. For spacetimes with non-zero curvature, we show that this is no longer true and the expectation value of the T T ¯ $$ \mathrm{T}\overline{\mathrm{T}} $$ operator depends on both the one- and two-point functions of the stress-energy tensor. |
| topic |
Effective Field Theories Field Theories in Lower Dimensions Renormalization Group |
| url |
http://link.springer.com/article/10.1007/JHEP02(2020)094 |
| work_keys_str_mv |
AT yunfengjiang expectationvalueofttmathrmtoverlinemathrmtoperatorincurvedspacetimes |
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1724497459272482816 |