Kuranishi structure explained

In mathematics, especially in topology, a Kuranishi structure is a smooth analogue of scheme structure. If a topological space is endowed with a Kuranishi structure, then locally it can be identified with the zero set of a smooth map

(f_1,\ldots,f_k)\colon\R^n+k\to\R^k

, or the quotient of such a zero set by a finite group. Kuranishi structures were introduced by Japanese mathematicians Kenji Fukaya and Kaoru Ono in the study of Gromov–Witten invariants and Floer homology in symplectic geometry, and were named after Masatake Kuranishi.^[1]

Definition

Let

be a compact metrizable topological space. Let

p\inX

be a point. A Kuranishi neighborhood of

(of dimension

) is a 5-tuple

K_p=(U_p,E_p,S_p,F_p,\psi_p)

where

U_p

is a smooth orbifold;

E_p\toU_p

is a smooth orbifold vector bundle;

S_p\colonU_p\toE_p

is a smooth section;

F_p

is an open neighborhood of

;

\psi_p\colon

	-1
S
	p

(0)\toF_p

is a homeomorphism.

They should satisfy that

\dimU_p-\operatorname{rank}E_p=k

p,q\inX

and

K_p=(U_p,E_p,S_p,F_p,\psi_p)

K_q=(U_q,E_q,S_q,F_q,\psi_q)

are their Kuranishi neighborhoods respectively, then a coordinate change from

K_q

K_p

is a triple

T_pq=(U_pq,\phi_pq,\hat\phi_pq),

where

U_pq\subsetU_q

is an open sub-orbifold;

\phi_pq\colonU_pq\toU_p

is an orbifold embedding;

\hat\phi_pq\colonE_q|


	U_pq

\toE_p

is an orbifold vector bundle embedding which covers

\phi_pq

In addition, these data must satisfy the following compatibility conditions:

S_p\circ\phi_pq=\hat\phi_pq\circS_q|


	U_pq

;

\psi_p\circ\phi_pq

	-1
S		(0)\capU_pq
	q

=\psi_q|

	-1
S		(0)\capU_pq
	q

A Kuranishi structure on

of dimension

is a collection

(\{K_p=(U_p,E_p,S_p,F_p,\psi_p) | p\inX\}, \{T_pq=(U_pq,\phi_pq,\hat\phi_pq) | p\inX, q\inF_p\}),

where

K_p

is a Kuranishi neighborhood of

of dimension

;

T_pq

is a coordinate change from

K_q

K_p

In addition, the coordinate changes must satisfy the cocycle condition, namely, whenever

q\inF_p, r\inF_q

, we require that

\phi_pq\circ\phi_qr=\phi_pr, \hat\phi_pq\circ\hat\phi_qr=\hat\phi_pr

over the regions where both sides are defined.

History

In Gromov–Witten theory, one needs to define integration over the moduli space of pseudoholomorphic curves

\overline{lM}_g,(X,A)

.^[2] This moduli space is roughly the collection of maps

from a nodal Riemann surface with genus

and

marked points into a symplectic manifold

, such that each component satisfies the Cauchy–Riemann equation

\overline\partial_Ju=0

If the moduli space is a smooth, compact, oriented manifold or orbifold, then the integration (or a fundamental class) can be defined. When the symplectic manifold

is semi-positive, this is indeed the case (except for codimension 2 boundaries of the moduli space) if the almost complex structure

is perturbed generically. However, when

is not semi-positive (for example, a smooth projective variety with negative first Chern class), the moduli space may contain configurations for which one component is a multiple cover of a holomorphic sphere

u\colonS²\toX

whose intersection with the first Chern class of

is negative. Such configurations make the moduli space very singular so a fundamental class cannot be defined in the usual way.

The notion of Kuranishi structure was a way of defining a virtual fundamental cycle, which plays the same role as a fundamental cycle when the moduli space is cut out transversely. It was first used by Fukaya and Ono in defining the Gromov–Witten invariants and Floer homology, and was further developed when Fukaya, Yong-Geun Oh, Hiroshi Ohta, and Ono studied Lagrangian intersection Floer theory.^[3]

References

Book: 1701.07821. Gromov-Witten theory via Kuranishi structures. Fukaya . Kenji . Kenji Fukaya. Tehrani. Mohammad F. . Virtual fundamental cycles in symplectic topology. 111–252. John W.. Morgan. John Morgan (mathematician). Mathematical Surveys and Monographs. 237. American Mathematical Society. Providence, RI. 2019. 978-1-4704-5014-4 . 2045629.

Notes and References

Fukaya . Kenji . Kenji Fukaya. Ono . Kaoru . Arnold Conjecture and Gromov–Witten Invariant . . 38 . 1999 . 5 . 933–1048 . 10.1016/S0040-9383(98)00042-1 . 1688434 .
Book: McDuff. Dusa . Dusa McDuff. Salamon. Dietmar . J-holomorphic curves and symplectic topology. American Mathematical Society Colloquium Publications. 52. American Mathematical Society. Providence, RI. 2004. 0-8218-3485-1. 2045629. 10.1090/coll/052.
Book: Fukaya . Kenji . Kenji Fukaya. Oh. Yong-Geun. Yong-Geun Oh. Ohta. Hiroshi. Ono. Kaoru. Lagrangian intersection floer theory: anomaly and obstruction, Part I and Part II . American Mathematical Society and International Press . Providence, RI and Somerville, MA . AMS/IP Studies in Advanced Mathematics. 46. 2009 . 978-0-8218-4836-4 . 426147150 . 2553465.