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ÆÓÐÍÀËÛ // Symmetry, Integrability and Geometry: Methods and Applications
SIGMA, 2016, òîì 12, 053, 20 ñòð. (Mi sigma1135)
Universal Lie Formulas for Higher Antibrackets
Marco Manetti, Giulia Ricciardi

Ñïèñîê ëèòåðàòóðû
1. Akman F., “On some generalizations of Batalin–Vilkovisky algebras”, J. Pure Appl. Algebra, 120 (1997), 105–141, arXiv: q-alg/9506027  crossref  mathscinet  zmath  isi
2. Alfaro J., Damgaard P.H., “Non-abelian antibrackets”, Phys. Lett. B, 369 (1996), 289–294, arXiv: hep-th/9511066  crossref  mathscinet  isi
3. Aschenbrenner M., “Logarithms of iteration matrices, and proof of a conjecture by Shadrin and Zvonkine”, J. Combin. Theory Ser. A, 119 (2012), 627–654, arXiv: 1009.5518  crossref  mathscinet  zmath  isi  elib
4. Bandiera R., “Nonabelian higher derived brackets”, J. Pure Appl. Algebra, 219 (2015), 3292–3313, arXiv: 1304.4097  crossref  mathscinet  zmath  isi
5. Bandiera R., “Formality of Kapranov's brackets in Kähler geometry via pre-Lie deformation theory”, Int. Math. Res. Not. (to appear), arXiv: 1307.8066  crossref
6. Batalin I., Marnelius R., “Quantum antibrackets”, Phys. Lett. B, 434 (1998), 312–320, arXiv: hep-th/9805084  crossref  mathscinet  isi
7. Batalin I.A., Vilkovisky G.A., “Gauge algebra and quantization”, Phys. Lett. B, 102 (1981), 27–31  crossref  mathscinet  isi
8. Batalin I.A., Vilkovisky G.A., “Closure of the gauge algebra, generalized Lie equations and Feynman rules”, Nuclear Phys. B, 234 (1984), 106–124  crossref  mathscinet  isi
9. Batalin I.A., Vilkovisky G.A., “Existence theorem for gauge algebra”, J. Math. Phys., 26 (1985), 172–184  crossref  mathscinet  isi
10. Becchi C., Rouet A., Stora R., “The abelian Higgs–Kibble model, unitarity of the $S$-operator”, Phys. Lett. B, 52 (1974), 344–346  crossref
11. Becchi C., Rouet A., Stora R., “Renormalization of the abelian Higgs–Kibble model”, Comm. Math. Phys., 42 (1975), 127–162  crossref  mathscinet
12. Becchi C., Rouet A., Stora R., “Renormalization of gauge theories”, Ann. Physics, 98 (1976), 287–321  crossref  mathscinet
13. Bering K., “Non-commutative Batalin–Vilkovisky algebras, homotopy Lie algebras and the Courant bracket”, Comm. Math. Phys., 274 (2007), 297–341, arXiv: hep-th/0603116  crossref  mathscinet  zmath  isi  elib
14. Bering K., Damgaard P.H., Alfaro J., “Algebra of higher antibrackets”, Nuclear Phys. B, 478 (1996), 459–503, arXiv: hep-th/9604027  crossref  mathscinet  zmath  isi
15. Dotsenko V., Shadrin S., Vallette B., “Pre-Lie deformation theory”, Mosc. Math. J. (to appear), arXiv: 1502.03280
16. Ecalle J., Théorie des invariants holomorphes, Publication Mathématiques d'Orsay, http://sites.mathdoc.fr/PMO/PDF/E_ECALLE_67_74_09.pdf, 1974
17. Fiorenza D., Manetti M., “Formality of Koszul brackets and deformations of holomorphic Poisson manifolds”, Homology Homotopy Appl., 14 (2012), 63–75, arXiv: 1109.4309  crossref  mathscinet  zmath  isi
18. Getzler E., “Batalin–Vilkovisky algebras and two-dimensional topological field theories”, Comm. Math. Phys., 159 (1994), 265–285, arXiv: hep-th/9212043  crossref  mathscinet  zmath  isi
19. Hanna P.D., Sequence, http://oeis.org/A180609, The On-line Encyclopedia of Integer Sequences, 2010
20. Koszul J.L., “Crochet de Schouten–Nijenhuis et cohomologie”, Astérisque, 1985, 257–271  mathscinet  zmath
21. Kravchenko O., “Deformations of Batalin–Vilkovisky algebras”, Poisson Geometry (Warsaw, 1998), Banach Center Publ., 51, Polish Acad. Sci., Warsaw, 2000, 131–139, arXiv: math.QA/9903191  mathscinet  zmath
22. Lada T., Markl M., “Strongly homotopy Lie algebras”, Comm. Algebra, 23 (1995), 2147–2161, arXiv: hep-th/9406095  crossref  mathscinet  zmath  isi
23. Lada T., Stasheff J., “Introduction to SH Lie algebras for physicists”, Internat. J. Theoret. Phys., 32 (1993), 1087–1103, arXiv: hep-th/9209099  crossref  mathscinet  zmath  isi
24. Manetti M., “Uniqueness and intrinsic properties of non-commutative Koszul brackets”, J. Homotopy Relat. Struct. (to appear), arXiv: 1512.05480  crossref
25. Markl M., “Higher braces via formal (non)commutative geometry”, Geometric Methods in Physics, Trends in Mathematics, Springer International Publishing, 2015, 67–81, arXiv: 1411.6964  crossref  mathscinet  zmath
26. Markl M., “On the origin of higher braces and higher-order derivations”, J. Homotopy Relat. Struct., 10 (2015), 637–667, arXiv: 1309.7744  crossref  mathscinet  zmath  isi
27. Nijenhuis A., Richardson Jr. R.W., “Deformations of Lie algebra structures”, J. Math. Mech., 17 (1967), 89–105  mathscinet  zmath
28. Shadrin S., Zvonkine D., “Changes of variables in ELSV-type formulas”, Michigan Math. J., 55 (2007), 209–228, arXiv: math.AG/0602457  crossref  mathscinet  zmath  isi
29. Sloane N.A.J., Sequences, A134242; A134243, The On-line Encyclopedia of Integer Sequences, 2010
30. Tyutin I.V., Gauge invariance in field theory and statistical physics in operator formalism, arXiv: 0812.0580

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