332 K. IMPLICIT FUNCTION THEOREMLet B be the Banach space of Ck,a vector fields on M which when restricted to8M are tangent to 8M. Define the open subset C =i= {VE B: IV (x) I < inj(g) for
each x EM}. Given f E Ck,a (M; 8M), consider the map 1.fJJ : C---+ Ck,a (M; 8M)
defined by
1.fJJ(V) = {fv: x r--7 exp}(x)(V(f(x)))}.
Similarly to (K.6), we define(K.8) Oa =i= {VET M : !VI < inj 9 (7r (V)), exp9 (V) EM } c TM.
Given f E c= (M; 8M), consider the subset U1 of a-E Ck,a (f*(Oa)) satisfying
a-(x) ET (8M) for x E 8M. Similarly to the previous subsection, define a Banach
space chart (UJ,<fJJ) for Ck,a (M;aM) by
l.fJJ: U1---+ Ck,a (M; 8M),'PJ (a-) (x) =i= exp}(x) (a-(x)).Note that if x E 8M, then 'PJ (a-) (x) E 8M since a-(x) E Tf(x) (8M) and since
8M is totally geodesic in (M, g).
2. Holder spaces and Sobolev spaces on manifolds
In this section we discuss Holder spaces and, briefly, Sobolev spaces on mani-
folds. We also include a discussion of jet bundles.2.1. Ck,a Holder spaces for tensors.
Let (Mn,g) be a Riemannian manifold, which may be noncompact and may
have boundary. Let 7r : ET ---+ M be a c= real vector bundle with metrics on
its fibers and a compatible connection (such as a tensor bundle). For the tensor
bundle Ee =i= E @@e T* M we have the covariant derivative \7 : Ee ---+ Ee+i · Given an
extended integer k E [O, oo], let C 1 ~c (M, E) be the set of sections¢ of Elint(M) such
that for each 0 :::; C < min { k + 1, oo }, the C-th covariant derivative \le¢ extends
continuously to M as a section of Ee (we shall use the same notation \le¢ for this
extension). We define the seminorms [¢]e =i= supxEM l\le¢(x)I for C ~ 0.DEFINITION K.6. Given an integer k E [0, oo), the space Ck (M,[) is the
Banach space of all sections¢ E C 1 ~c (M,[) for which the norm
k
ll<Pllk =i= 2::[¢]1
j=Ois finite.
Let ( {U,e};=l, 7/;13 = {x~}~ 1 : U13 ---+ !Rn) be a covering of M by coordinate
charts. Further assume that there are trivializations Erlu 13 ---+ U 13 x ffi.r correspond-
ing to bases of local sections {sb, ... , s~}. Given ¢ E C 1 ~c (M, E), its covariant
derivative may be expressed as