1549055384-Symplectic_Geometry_and_Topology__Eliashberg_

160 D. SALAMON, FLOER HOMOLOGY

and, since df(x) is onto, the dimension of M agrees with the index off.

2.2. The linearized operator

We wish to prove that the moduli spaces M(x-, x+; H, J) are smooth finite di-

mensional manifolds. Hence we must express these spaces as zero sets of functions

between suitable Banach spaces. It is useful to abbreviate the left hand side of (7)

as

OU OU

OH J(u) =-;;:;--+ J(u)""'il - '\i'Ht(u).

' us ut

This is a vector field along u. Let us fix an element u E M(x-,x+) and consider a

vector space

Xu c C^00 (IR x IR/Z, u*T M)

of all vector fields ~ along u which satisfy a suitable exponential decay condition as

s ., ±oo. Explicitly, think of ~ as a smooth function IR x IR/Z ., TM such that

~(s, t) E Tu(s,t)M· A function near u which also satisfies the limit condition (8) can

be expressed uniquely in the form u' = expu ( ~) for some ~ E Xu. Hence the set of

solutions of (7) and (8) can be expressed as the zero set of a function

Explicitly, :Fu is defined by :Fu(~)= <I>u(0-^1 BH,J(expu(0) for ~ E Xu, where <I>u(~) : TuM ___., Texp,,(E,)M denotes parallel transport along the geodesic T 1-+ expu (TO. The differential of :Fu at 0 is the linear first order

differential operator Du = d:Fu(O) given by

(13)

It turns out that Du is a Fredholm operator between suitable Sobolev completions
of Xu. We introduce the Sobolev norms

(1

00 fl ) l/p

ll~llLP = -oo lo l~lp '

for 1 < p < oo. The corresponding completions of Xu will be denoted by

£P = £P(IR x 31, u*TM), W^1 ·P = W^1 ·P(IR x 51, u*TM).

We shall prove that Du : W^1 ·P ___., LP is a Fredholm operator and express its index
in terms of a suitable Maslov index.

It is useful to simplify the formula for Du by choosing a unitary trivialization

of the vector bundle u*T M ., IR x 31. Such a trivialization takes the form of
a smooth family of vector space isomorphisms (s, t) : IR^2 n ., Tu(s,t)M which
identify the standard symplectic and complex structures w 0 and J 0 on IR^2 n with

the corresponding structures w and Jon TM. In such a frame the operator Du

has the form

(14)

for~: IR x 31 ___., IR^2 n. Here the matrices 3(s, t) E IR^2 nx^2 n are defined by

1549055384-Symplectic_Geometry_and_Topology__Eliashberg_

and, since df(x) is onto, the dimension of M agrees with the index off.

2.2. The linearized operator

We wish to prove that the moduli spaces M(x-, x+; H, J) are smooth finite di-

between suitable Banach spaces. It is useful to abbreviate the left hand side of (7)

OH J(u) =-;;:;--+ J(u)""'il - '\i'Ht(u).

This is a vector field along u. Let us fix an element u E M(x-,x+) and consider a

Xu c C^00 (IR x IR/Z, u*T M)

s ., ±oo. Explicitly, think of ~ as a smooth function IR x IR/Z ., TM such that

be expressed uniquely in the form u' = expu ( ~) for some ~ E Xu. Hence the set of

differential operator Du = d:Fu(O) given by

(13)

00 fl ) l/p

ll~llLP = -oo lo l~lp '

for 1 < p < oo. The corresponding completions of Xu will be denoted by

It is useful to simplify the formula for Du by choosing a unitary trivialization

the corresponding structures w and Jon TM. In such a frame the operator Du

3 = -^1 Du = -^1 (\l 5 + J(u)\li; + \lq,J(u)OtU - \lq, \l Ht(u)).

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