Dual Spaces
-
Upload
superheavy-rockshow-got -
Category
Documents
-
view
218 -
download
0
Transcript of Dual Spaces
-
7/26/2019 Dual Spaces
1/30
MAN
-
7/26/2019 Dual Spaces
2/30
MAN10/16/2015
The elements of are called (continuous)
linear
functionals on.
Since = , , it is a Banach space.
If , then
= sup () : 1 .
-
7/26/2019 Dual Spaces
3/30
MAN
-
7/26/2019 Dual Spaces
4/30
MAN10/16/2015
-
7/26/2019 Dual Spaces
5/30
MAN10/16/2015
-
7/26/2019 Dual Spaces
6/30
MAN10/16/2015
-
7/26/2019 Dual Spaces
7/30
MAN10/16/2015
-
7/26/2019 Dual Spaces
8/30
MAN10/16/2015
-
7/26/2019 Dual Spaces
9/30
MAN10/16/2015
-
7/26/2019 Dual Spaces
10/30
MAN10/16/2015
-
7/26/2019 Dual Spaces
11/30
MAN10/16/2015
-
7/26/2019 Dual Spaces
12/30
MAN10/16/2015
-
7/26/2019 Dual Spaces
13/30
MAN10/16/2015
-
7/26/2019 Dual Spaces
14/30
MAN10/16/2015
Proof of the Hahn-Banach Theo
-
7/26/2019 Dual Spaces
15/30
MAN10/16/2015
-
7/26/2019 Dual Spaces
16/30
MAN10/16/2015
-
7/26/2019 Dual Spaces
17/30
MAN10/16/2015
-
7/26/2019 Dual Spaces
18/30
MAN10/16/2015
-
7/26/2019 Dual Spaces
19/30
MAN10/16/2015
-
7/26/2019 Dual Spaces
20/30
MAN10/16/2015
-
7/26/2019 Dual Spaces
21/30
MAN10/16/2015
-
7/26/2019 Dual Spaces
22/30
MAN10/16/2015
-
7/26/2019 Dual Spaces
23/30
MAN10/16/2015
-
7/26/2019 Dual Spaces
24/30
MAN10/16/2015
reflexivity completenes
reflexivity completenes
-
7/26/2019 Dual Spaces
25/30
MAN10/16/2015
-
7/26/2019 Dual Spaces
26/30
MAN10/16/2015
-
7/26/2019 Dual Spaces
27/30
MAN10/16/2015
-
7/26/2019 Dual Spaces
28/30
MAN10/16/2015
-
7/26/2019 Dual Spaces
29/30
MAN10/16/2015
-
7/26/2019 Dual Spaces
30/30
MAN10/16/2015