- MONOTONICITY OF THE ISOPERIMETRIC CONSTANT i59
For E > 0 small enough, '"Ye is a smooth embedded loop. Since g is Euclidean
up to first order at x, we see from (5.47) that as E "\i 0,
DWe now sketch a proof of the following existence result; further details
may be found in §3 of [62].
LEMMA 5.85. ff ( M^2 , g) is a Riemannian surface diffeomorphic to S^2
such that CH (M^2 , g) < 41T, then th ere exists a smooth embedded loop (3
such thatOur proof of Lemma 5.85 will use the following algebraic fact.LEMMA 5.86. If Li, L2 and Ai, A2, A3 are any positive numbers, then2 ( 1 1 )
(Li+L^2 ) Ai+A2 + A3
mm ·{2(1 Li Ai + A2 1) + A3 '
PROOF. To obtain a contradiction, suppose the result is false. Then
there exist positive numbers Li, L2 and Ai, A2, A3 such thatand(Li+ £^2 )
2
(Ai! A2 + ~3) '.SL~ (~2 +Ai! A 3).
We rewrite these inequalities as~~~~-Ai (A2 + A 3) < Lr 2
A 3 (Ai + A2) - (Li + L2)(5.48)
and(5.49)A2 (Ai+ A 3) L~
A3 (Ai + A2) '.S (Li + £ 2 )^2.Summing (5.48) and (5.49) yieldswhich is impossible. D