| Reference : On quantizable odd Lie bialgebras |
| Scientific journals : Article | |||
| Physical, chemical, mathematical & earth Sciences : Mathematics | |||
| http://hdl.handle.net/10993/23021 | |||
| On quantizable odd Lie bialgebras | |
| English | |
| Khoroshkin, Anton [The Faculty of Mathematics > Th High School of Economics in Moscow] | |
Merkulov, Sergei  [University of Luxembourg > Faculty of Science, Technology and Communication (FSTC) > Mathematics Research Unit >] | |
| Thomas, Willwacher [Department of Mathematics > University of Zurich] | |
| 2016 | |
| Letters in Mathematical Physics | |
| Springer Science & Business Media B.V. | |
| 106 | |
| 9 | |
| 1199-1215 | |
| Yes (verified by ORBilu) | |
| International | |
| 0377-9017 | |
| 1573-0530 | |
| Dordrecht | |
| The Netherlands | |
| [en] algebra ; quantization ; homotopy theory | |
| [en] The notion of a quantizable odd Lie bialgebra is introduced. A
minimal resolution of the properad governing such Lie bialgebras is constructed. | |
| Researchers ; Professionals ; Students | |
| http://hdl.handle.net/10993/23021 |
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