Summary
We present and investigate, within the general frame of deformation theory, new ℤ2-constructions for generalized moduli spaces of holomorphic and symplectic structures.
This work was supported by the M.I.U.R. Project “Geometric Properties of Real and Complex Manifolds” and by G.N.S.A.G.A. of I.N.d.A.M.
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References
S. Barannikov, M. Konsevich: Frobenius manifolds and formality of Lie algebras of polyvector fields, Int. Math. Res. Not. (1998), no. 4, 201–215.
J. L. Brylinski: A differential complex for Poisson manifolds, J. Diff. Geom. 28 (1988), 93–114.
P. de Bartolomeis: GBV algebras, formality theorems, and Frobenius manifolds, Seminari di Geometria Algebrica 1998–1999, Scuola Normale Superiore, Pisa, 161–178.
P. de Bartolomeis, A Tomassini: Formality of some symplectic manifolds, Int. Math. Res. Not. (2001), no. 24, 1287–1314.
P. Deligne, P. Griffiths, J. Morgan, D. Sullivan: Real homotopy theory of Kähler manifolds, Inventiones Math. 29 (1975), 245–274.
K. Fukaya: Deformation theory, homological algebra, and mirror symmetry, preprint (2002), http://www.kums.kyoto-u.ac.jp/fukaya/fukaya.html.
K. Fukaya, Y. G. Oh, H. Ohta, K. Ono: Lagrangian intersection, Floer theory, anomaly and obstruction, preprint (2000), http://www.kums.kyoto-u.ac.jp/fukaya/fukaya.html.
K. Kodaira, J. Morrow: Complex manifolds, Holt, Rinehart and Wiston, Inc., New York (1971).
O. Mathieu: Harmonic cohomology classes of symplectic manifolds, Comm. Math. Helvetici 70 (1995), 1–9.
S. A. Merkulov: Formality of canonical symplectic complexes and Frobenius manifolds, Int. Math. Res. Not. (1998), no. 14, 727–733.
S. A. Merkulov: Strong homotopy algebras of aKähler manifold, Int. Math. Res. Not. (1999), no. 3, 153–164.
V. Venturi: Deformazioni delle A ∞ -algebre di una varietà simplettica compatta, Thesis, Università degli Studi di Firenze (2003).
D. Yan: Hodge structure on symplectic manifolds, Adv. Math 120 (1996), 143–154.
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Dedicated to Professor Lieven Vanhecke
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de Bartolomeis, P. (2005). ℤ2 and ℤ-Deformation Theory for Holomorphic and Symplectic Manifolds. In: Kowalski, O., Musso, E., Perrone, D. (eds) Complex, Contact and Symmetric Manifolds. Progress in Mathematics, vol 234. Birkhäuser Boston. https://doi.org/10.1007/0-8176-4424-5_6
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DOI: https://doi.org/10.1007/0-8176-4424-5_6
Publisher Name: Birkhäuser Boston
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