1549055384-Symplectic_Geometry_and_Topology__Eliashberg_

(jair2018) #1
180 D. SALAMON, FLOER HOMOLOGY

Proposition 3.9. Suppose that HE Hreg, x,y,z E P(H), u E M(y,x;H,J), and

v E M(z, y; H, J) .-Then there exist constants c > 0 and Ro > 0 such that, for


every R > Ro and every rJ E W^2 ·P (JR x S^1 , ( v# RU) *TM),

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Proof. Let us denote

VR ( S, t) _ { - v#Ru(s, y(t), t) ,

s ::::; 0,
s::::: 0,

UR(s, t) = { y(t), S s:; 0,


v#Ru(s, t), s :'.'.'. 0.

Note that VR(s, t) = v(s + R, t) for s ::::; -R/2 - 1 and uR(s, t) = u(s - R, t) for

s :'.'.'. R/2+ 1. By Proposition 1.21, the difference between VR(s, t) and v(s+R, t) (in
the Ce-norm for any .e) is exponentially small as R ---+ oo, and so is the difference
between uR(s, t) and u(s - R, t). Hence there exist constants Ro > 0, co > 0, and

c 1 > 0 such that, for every R :'.'.'.Ro and every T/u E W^1 ·P(JR x S^1 ,uR*TM),


Similar inequalities hold with Dun replaced by Dvn.

Now, for R > 2, we have


# ( t)


= { VR(S, t),


V RU S, UR ( s, t) ,

if s ::::; 0,
ifs::::: 0.

Note that v#Ru(s, t) = y(t) for -R/2::::; s::::; R/2. In order to establish the required


estimate for DR= Dv#nu we fix a vector field rJ E W^1 ·P(JR x S^1 , (v#Ru)*TM) and
define

rJu(s, t) = fJR(s)rJ(s, t) E Tun(s,t)M,


rJv(s, t) = (1 - fJR(s))rJ(s, t) E Tvn(s,t)M,

where fJR(s) = (J(s/ R + 1/2) is a smooth cutoff function such that

fJR(s) = { ~:


if s s:; -R/2,


ifs;:::: R/2,

-R-^1 < - (J R "(s) < - R-^1 '


for R :'.'.'.Ro. Note that DRT/u =Dun T/u and DRT/v = Dvn T/v· Hence we obtain


the following inequality:

llrJllwi.P < llrJullw1,p + llrJvllw1,p

< Co (llDun T/ullLP + llDvn rJvllLP)

Co (IJDR(fJRrJ)llLP + llDR((l - fJR)rJ)lb)

< 2co llDR*rJllLP +

4
~

0
llrJllLP.

The last inequality follows from the fact that DR(fJRTJ) = fJRDRT/ - fJR^1 rJ and


lfJR'(s)I s:; 2/R for alls. With 4co/R::::; 1/2 we obtain an inequality


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for all rJ E W^1 ·P(JR x 8^1 , (v#Ru)*TM). Now observe that

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