Author:
Parker Charles,Süli Endre
Abstract
AbstractOn the reference tetrahedron $$K$$
K
, we construct, for each $$k \in {\mathbb {N}}_0$$
k
∈
N
0
, a right inverse for the trace operator $$u \mapsto (u, \partial _{\textbf{n}} u, \ldots , \partial _{\textbf{n}}^k u)|_{\partial K}$$
u
↦
(
u
,
∂
n
u
,
…
,
∂
n
k
u
)
|
∂
K
. The operator is stable as a mapping from the trace space of $$W^{s, p}(K)$$
W
s
,
p
(
K
)
to $$W^{s, p}(K)$$
W
s
,
p
(
K
)
for all $$p \in (1, \infty )$$
p
∈
(
1
,
∞
)
and $$s \in (k+1/p, \infty )$$
s
∈
(
k
+
1
/
p
,
∞
)
. Moreover, if the data is the trace of a polynomial of degree $$N \in {\mathbb {N}}_0$$
N
∈
N
0
, then the resulting lifting is a polynomial of degree N. One consequence of the analysis is a novel characterization for the range of the trace operator.
Publisher
Springer Science and Business Media LLC