For which $k in mathbbN$ and $p in[1,infty]$ is $u in W^k,p(B_1(0))$?
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Let $u: overline B_1(0)subsetmathbbR^2tomathbbR$ defined by
$$u(x_1,x_2)=x_1x_2(1-sqrtx_1^2+x_2^2)$$
For which $ k in mathbbN $ and $ p in[1,infty] $ is $ u in W^k,p(B_1(0)) $ ?
I don't have any clue. Thanks for helping !
pde sobolev-spaces
edited Sep 5 at 11:18
miracle173
7,16922247
asked Sep 5 at 10:51
Matillo
114
 |Â
show 3 more comments
up vote
0
down vote
favorite
Let $u: overline B_1(0)subsetmathbbR^2tomathbbR$ defined by
$$u(x_1,x_2)=x_1x_2(1-sqrtx_1^2+x_2^2)$$
For which $ k in mathbbN $ and $ p in[1,infty] $ is $ u in W^k,p(B_1(0)) $ ?
I don't have any clue. Thanks for helping !
pde sobolev-spaces
edited Sep 5 at 11:18
miracle173
7,16922247
asked Sep 5 at 10:51
Matillo
114
1
Welcome to MSE. It will be more likely that you will get an answer if you show us that you made an effort. This should be added to the question rather than in the comments.
– José Carlos Santos
Sep 5 at 10:57
Your question will be easier to read (and write) if you only encase the math in dollar signs, not your entire question.
– Arthur
Sep 5 at 11:00
2
"I don't have any clue" is a pretty strong statement. Do you know what $W^k,p(B_1(0))$ is?
– Umberto P.
Sep 5 at 11:21
Yes , the Sobolev space . I think I have to compute the partial derivatives and look if they are in L^p
– Matillo
Sep 5 at 12:48
Yes. In fact $x_1x_2$ is (obviously?) in every Sobolev space $W^k,p(B_1(0))$ so you can just consider $x_1x_2 sqrtx_1^2 + x_2^2$. Start calculating.
– Umberto P.
Sep 5 at 14:36
 |Â
show 3 more comments
up vote
0
down vote
favorite
up vote
0
down vote
favorite
Let $u: overline B_1(0)subsetmathbbR^2tomathbbR$ defined by
$$u(x_1,x_2)=x_1x_2(1-sqrtx_1^2+x_2^2)$$
For which $ k in mathbbN $ and $ p in[1,infty] $ is $ u in W^k,p(B_1(0)) $ ?
I don't have any clue. Thanks for helping !
pde sobolev-spaces
edited Sep 5 at 11:18
miracle173
7,16922247
asked Sep 5 at 10:51
Matillo
114
Let $u: overline B_1(0)subsetmathbbR^2tomathbbR$ defined by
$$u(x_1,x_2)=x_1x_2(1-sqrtx_1^2+x_2^2)$$
For which $ k in mathbbN $ and $ p in[1,infty] $ is $ u in W^k,p(B_1(0)) $ ?
I don't have any clue. Thanks for helping !
pde sobolev-spaces
pde sobolev-spaces
edited Sep 5 at 11:18
miracle173
7,16922247
asked Sep 5 at 10:51
Matillo
114
edited Sep 5 at 11:18
miracle173
7,16922247
asked Sep 5 at 10:51
Matillo
114
edited Sep 5 at 11:18
miracle173
7,16922247
edited Sep 5 at 11:18
miracle173
7,16922247
edited Sep 5 at 11:18
miracle173
7,16922247
7,16922247
asked Sep 5 at 10:51
Matillo
114
asked Sep 5 at 10:51
Matillo
114
asked Sep 5 at 10:51
Matillo
114
114
1
Welcome to MSE. It will be more likely that you will get an answer if you show us that you made an effort. This should be added to the question rather than in the comments.
– José Carlos Santos
Sep 5 at 10:57
Your question will be easier to read (and write) if you only encase the math in dollar signs, not your entire question.
– Arthur
Sep 5 at 11:00
2
"I don't have any clue" is a pretty strong statement. Do you know what $W^k,p(B_1(0))$ is?
– Umberto P.
Sep 5 at 11:21
Yes , the Sobolev space . I think I have to compute the partial derivatives and look if they are in L^p
– Matillo
Sep 5 at 12:48
Yes. In fact $x_1x_2$ is (obviously?) in every Sobolev space $W^k,p(B_1(0))$ so you can just consider $x_1x_2 sqrtx_1^2 + x_2^2$. Start calculating.
– Umberto P.
Sep 5 at 14:36
 |Â
show 3 more comments
1
Welcome to MSE. It will be more likely that you will get an answer if you show us that you made an effort. This should be added to the question rather than in the comments.
– José Carlos Santos
Sep 5 at 10:57
Your question will be easier to read (and write) if you only encase the math in dollar signs, not your entire question.
– Arthur
Sep 5 at 11:00
2
"I don't have any clue" is a pretty strong statement. Do you know what $W^k,p(B_1(0))$ is?
– Umberto P.
Sep 5 at 11:21
Yes , the Sobolev space . I think I have to compute the partial derivatives and look if they are in L^p
– Matillo
Sep 5 at 12:48
Yes. In fact $x_1x_2$ is (obviously?) in every Sobolev space $W^k,p(B_1(0))$ so you can just consider $x_1x_2 sqrtx_1^2 + x_2^2$. Start calculating.
– Umberto P.
Sep 5 at 14:36
1
1
Welcome to MSE. It will be more likely that you will get an answer if you show us that you made an effort. This should be added to the question rather than in the comments.
– José Carlos Santos
Sep 5 at 10:57
Welcome to MSE. It will be more likely that you will get an answer if you show us that you made an effort. This should be added to the question rather than in the comments.
– José Carlos Santos
Sep 5 at 10:57
Your question will be easier to read (and write) if you only encase the math in dollar signs, not your entire question.
– Arthur
Sep 5 at 11:00
Your question will be easier to read (and write) if you only encase the math in dollar signs, not your entire question.
– Arthur
Sep 5 at 11:00
2
2
"I don't have any clue" is a pretty strong statement. Do you know what $W^k,p(B_1(0))$ is?
– Umberto P.
Sep 5 at 11:21
"I don't have any clue" is a pretty strong statement. Do you know what $W^k,p(B_1(0))$ is?
– Umberto P.
Sep 5 at 11:21
Yes , the Sobolev space . I think I have to compute the partial derivatives and look if they are in L^p
– Matillo
Sep 5 at 12:48
Yes , the Sobolev space . I think I have to compute the partial derivatives and look if they are in L^p
– Matillo
Sep 5 at 12:48
Yes. In fact $x_1x_2$ is (obviously?) in every Sobolev space $W^k,p(B_1(0))$ so you can just consider $x_1x_2 sqrtx_1^2 + x_2^2$. Start calculating.
– Umberto P.
Sep 5 at 14:36
Yes. In fact $x_1x_2$ is (obviously?) in every Sobolev space $W^k,p(B_1(0))$ so you can just consider $x_1x_2 sqrtx_1^2 + x_2^2$. Start calculating.
– Umberto P.
Sep 5 at 14:36
 |Â
show 3 more comments
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1
Welcome to MSE. It will be more likely that you will get an answer if you show us that you made an effort. This should be added to the question rather than in the comments.
– José Carlos Santos
Sep 5 at 10:57
Your question will be easier to read (and write) if you only encase the math in dollar signs, not your entire question.
– Arthur
Sep 5 at 11:00
2
"I don't have any clue" is a pretty strong statement. Do you know what $W^k,p(B_1(0))$ is?
– Umberto P.
Sep 5 at 11:21
Yes , the Sobolev space . I think I have to compute the partial derivatives and look if they are in L^p
– Matillo
Sep 5 at 12:48
Yes. In fact $x_1x_2$ is (obviously?) in every Sobolev space $W^k,p(B_1(0))$ so you can just consider $x_1x_2 sqrtx_1^2 + x_2^2$. Start calculating.
– Umberto P.
Sep 5 at 14:36