- #1
MT20
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Greating my friends,
I have just returned home today from heart surgery.
I still feeling the effects of the operation, because I'm affried the hospital send me home a bit to early. But I have to have these questions finished before tomorrow.
So therefore I would very much appreciate if somebody could help me answer these questions?
(a)
(I use the triangle inequality in (1) and (3)?)
Let I be a open interval and f: I \rightarrow \mathbb{R}^n be a continious function.
Let || \cdot || be a given norm on \mathbb{R}^n.
Show the following:
1) If there exists a C>0 then ||x|| \leq C ||C||_1; x \in \mathbb{R}^n, ||x|| _1 = \sum _{j=1} ^n |x_j|
2) The mapping I \ni t \rightarrow ||f(t)|| \in \mathbb{R} is continious on.
3) for all t1,t2 \in \ || \int_{t_1} ^{t_2} f(t) dt|| \leq | \int_{t_1} ^{t_2} ||f(t)||dt|
(b)
Looking at the system(*) of equations,
x1' = (a-bx2)* x1
x2' = (cx1 -d)*x2
open the open Quadrant K; here a,b,c and d er positive constants.
I need to show that the system can be integrated. Which means I need to show that there exist a C^1 -function, with the properties F:U \rightarrow \mathbb{R}, where U \subseteq K is open and close in K(close means that for every point in K, is a limit point for q sequence, whos elements belongs to K). Such that gradient F \notequal 0 for alle x \in U and such that F is constant for trajectories of system.
Finally I need to conclude that every max trajectory is contained in a compact subset of K, and that the system (*) field X: R \rightarrow \mathbb{R}^2.
Sincerley Yours
Maria Thomson 20
p.s. I'm so sorry for asking so much, but has been such a difficult couple of days for me.
I have just returned home today from heart surgery.
I still feeling the effects of the operation, because I'm affried the hospital send me home a bit to early. But I have to have these questions finished before tomorrow.
So therefore I would very much appreciate if somebody could help me answer these questions?
(a)
(I use the triangle inequality in (1) and (3)?)
Let I be a open interval and f: I \rightarrow \mathbb{R}^n be a continious function.
Let || \cdot || be a given norm on \mathbb{R}^n.
Show the following:
1) If there exists a C>0 then ||x|| \leq C ||C||_1; x \in \mathbb{R}^n, ||x|| _1 = \sum _{j=1} ^n |x_j|
2) The mapping I \ni t \rightarrow ||f(t)|| \in \mathbb{R} is continious on.
3) for all t1,t2 \in \ || \int_{t_1} ^{t_2} f(t) dt|| \leq | \int_{t_1} ^{t_2} ||f(t)||dt|
(b)
Looking at the system(*) of equations,
x1' = (a-bx2)* x1
x2' = (cx1 -d)*x2
open the open Quadrant K; here a,b,c and d er positive constants.
I need to show that the system can be integrated. Which means I need to show that there exist a C^1 -function, with the properties F:U \rightarrow \mathbb{R}, where U \subseteq K is open and close in K(close means that for every point in K, is a limit point for q sequence, whos elements belongs to K). Such that gradient F \notequal 0 for alle x \in U and such that F is constant for trajectories of system.
Finally I need to conclude that every max trajectory is contained in a compact subset of K, and that the system (*) field X: R \rightarrow \mathbb{R}^2.
Sincerley Yours
Maria Thomson 20
p.s. I'm so sorry for asking so much, but has been such a difficult couple of days for me.