@article {2018,
title = {Observables in the equivariant A-model},
number = {arXiv:1807.08659},
year = {2018},
url = {https://arxiv.org/abs/1807.08659},
author = {Bonechi, F. and Cattaneo, A.S. and Riccardo Iraso and Maxim Zabzine}
}
@article {2009,
title = {Topological branes, p-algebras and generalized Nahm equations},
journal = {Phys. Lett. B 672 (2009) 390-395},
number = {SISSA;47/2008/FM},
year = {2009},
abstract = {Inspired by the recent advances in multiple M2-brane theory, we consider the generalizations of Nahm equations for arbitrary p-algebras. We construct the topological p-algebra quantum mechanics associated to them and we show that this can be obtained as a truncation of the topological p-brane theory previously studied by the authors. The resulting topological p-algebra quantum mechanics is discussed in detail and the relation with the M2-M5 system is pointed out in the p=3 case, providing a geometrical argument for the emergence of the 3-algebra structure in the Bagger-Lambert-Gustavsson theory},
doi = {10.1016/j.physletb.2009.01.051},
url = {http://hdl.handle.net/1963/2702},
author = {Giulio Bonelli and Alessandro Tanzini and Maxim Zabzine}
}
@article {2007,
title = {Computing Amplitudes in topological M-theory},
number = {SISSA;74/2006/FM},
year = {2007},
abstract = {We define a topological quantum membrane theory on a seven dimensional manifold of $G_2$ holonomy. We describe in detail the path integral evaluation for membrane geometries given by circle bundles over Riemann surfaces. We show that when the target space is $CY_3\\\\times S^1$ quantum amplitudes of non-local observables of membranes wrapping the circle reduce to the A-model amplitudes. \\nIn particular for genus zero we show that our model computes the Gopakumar-Vafa invariants. Moreover, for membranes wrapping calibrated homology spheres in the $CY_3$, we find that the amplitudes of our model are related to Joyce invariants.},
doi = {10.1088/1126-6708/2007/03/023},
url = {http://hdl.handle.net/1963/1901},
author = {Giulio Bonelli and Alessandro Tanzini and Maxim Zabzine}
}
@article {2006,
title = {On topological M-theory},
number = {SISSA;64/2005/FM},
year = {2006},
abstract = {We construct a gauge fixed action for topological membranes on G2-manifolds such that its bosonic part is the standard membrane theory in a particular gauge. We prove that quantum mechanically the path-integral in this gauge localizes on associative submanifolds.},
url = {http://hdl.handle.net/1963/1765},
author = {Giulio Bonelli and Alessandro Tanzini and Maxim Zabzine}
}