A new definition of Kuranishi space

Abstract

'Kuranishi spaces' were introduced in the work of Fukaya, Oh, Ohta and Ono in symplectic geometry (see e.g. arXiv:1106.4882), as the geometric structure on moduli spaces of J-holomorphic curves. An alternative to Kuranishi spaces is the 'polyfolds' of Hofer, Wysocki and Zehnder (see e.g. arXiv:1407.3185). Finding a satisfactory definition of Kuranishi space has been the subject of recent debate (see e.g. arXiv:1208.1340, arXiv:1209.4410, arXiv:1510.06849). We propose three new definitions of Kuranishi space: a simple 'manifold' version, 'μ-Kuranishi spaces', which form an ordinary category μ Kur; a more complicated 'manifold' version, 'm-Kuranishi spaces', which form a weak 2-category mKur; and an 'orbifold' version, 'Kuranishi spaces', which form a weak 2-category Kur. These are related by an equivalence of categories μ Kur Ho( mKur), where Ho( mKur) is the homotopy category of mKur, and by a full and faithful embedding mKur Kur. We also define (μ-, m-)Kuranishi spaces with boundary, and with corners. We hope our definitions will become accepted as final, replacing previous definitions. Any Fukaya-Oh-Ohta-Ono Kuranishi space X can be made into a compact Kuranishi space X' uniquely up to equivalence in Kur (that is, up to isomorphism in Ho( Kur)). The same holds for topological spaces with Fukaya-Oh-Ohta-Ono 'good coordinate systems', and for McDuff and Wehrheim's 'Kuranishi atlases' in arXiv:1508.01556. A compact topological space X with a 'polyfold Fredholm structure' in the sense of Hofer, Wysocki and Zehnder can be made into a Kuranishi space X uniquely up to equivalence in Kur. This book is surveyed in arXiv:1510.07444.