Construct function with given conditions in topological space












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I have to give an example (just construct not very formally really) of a function $f in H^1(Omega)$ that:

1. $Omega = (0,1)times(0,1), Gamma_1={(x,0);0leq xleq 1}cup{(y,0);0leq yleq 1}, Gamma_2=partialOmegabackslash Gamma_1$

2. $fin C^0(overline{Omega}), fnotin C^1(overline{Omega})$, $f in H^1(Omega)$ contains the continous function but does not contain the continously differentiable one.

3. $f neq 0$, the function does not totally equal to zero

4. $tr(f) neq 0$ on $Gamma_1$ and $tr(f)=0$ on $Gamma_2$ - while trace is not totally equal to zero on $Gamma_1$, it is trivial on the remaining part of the boundary.



I also have to compute the weak (distributional) derivative of f.

The problem is, I have no idea how to give an example of such a function and therefore construct one. I do know how to compute distributional derivatives, if I had such a function I could probably prove it fulfills these requirements, but constructing one is beyond my ability.

I get that $H^1(Omega)$ is a Hilbert space that is differentiable (in sense of having weak derivative) on subset $Omega in mathbb R^n$ and derivative of function is not continous on $Omega$, and that trace can be shown to be different than 0 from right computation. If I understand correctly, $Gamma_1$ and $Gamma_2$ are parts of $partial Omega$, which is the boundary of $Omega$. Neverthess as I stated before I don't know how to construct the function and show those things. Can you help me?










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    I have to give an example (just construct not very formally really) of a function $f in H^1(Omega)$ that:

    1. $Omega = (0,1)times(0,1), Gamma_1={(x,0);0leq xleq 1}cup{(y,0);0leq yleq 1}, Gamma_2=partialOmegabackslash Gamma_1$

    2. $fin C^0(overline{Omega}), fnotin C^1(overline{Omega})$, $f in H^1(Omega)$ contains the continous function but does not contain the continously differentiable one.

    3. $f neq 0$, the function does not totally equal to zero

    4. $tr(f) neq 0$ on $Gamma_1$ and $tr(f)=0$ on $Gamma_2$ - while trace is not totally equal to zero on $Gamma_1$, it is trivial on the remaining part of the boundary.



    I also have to compute the weak (distributional) derivative of f.

    The problem is, I have no idea how to give an example of such a function and therefore construct one. I do know how to compute distributional derivatives, if I had such a function I could probably prove it fulfills these requirements, but constructing one is beyond my ability.

    I get that $H^1(Omega)$ is a Hilbert space that is differentiable (in sense of having weak derivative) on subset $Omega in mathbb R^n$ and derivative of function is not continous on $Omega$, and that trace can be shown to be different than 0 from right computation. If I understand correctly, $Gamma_1$ and $Gamma_2$ are parts of $partial Omega$, which is the boundary of $Omega$. Neverthess as I stated before I don't know how to construct the function and show those things. Can you help me?










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      I have to give an example (just construct not very formally really) of a function $f in H^1(Omega)$ that:

      1. $Omega = (0,1)times(0,1), Gamma_1={(x,0);0leq xleq 1}cup{(y,0);0leq yleq 1}, Gamma_2=partialOmegabackslash Gamma_1$

      2. $fin C^0(overline{Omega}), fnotin C^1(overline{Omega})$, $f in H^1(Omega)$ contains the continous function but does not contain the continously differentiable one.

      3. $f neq 0$, the function does not totally equal to zero

      4. $tr(f) neq 0$ on $Gamma_1$ and $tr(f)=0$ on $Gamma_2$ - while trace is not totally equal to zero on $Gamma_1$, it is trivial on the remaining part of the boundary.



      I also have to compute the weak (distributional) derivative of f.

      The problem is, I have no idea how to give an example of such a function and therefore construct one. I do know how to compute distributional derivatives, if I had such a function I could probably prove it fulfills these requirements, but constructing one is beyond my ability.

      I get that $H^1(Omega)$ is a Hilbert space that is differentiable (in sense of having weak derivative) on subset $Omega in mathbb R^n$ and derivative of function is not continous on $Omega$, and that trace can be shown to be different than 0 from right computation. If I understand correctly, $Gamma_1$ and $Gamma_2$ are parts of $partial Omega$, which is the boundary of $Omega$. Neverthess as I stated before I don't know how to construct the function and show those things. Can you help me?










      share|cite|improve this question















      I have to give an example (just construct not very formally really) of a function $f in H^1(Omega)$ that:

      1. $Omega = (0,1)times(0,1), Gamma_1={(x,0);0leq xleq 1}cup{(y,0);0leq yleq 1}, Gamma_2=partialOmegabackslash Gamma_1$

      2. $fin C^0(overline{Omega}), fnotin C^1(overline{Omega})$, $f in H^1(Omega)$ contains the continous function but does not contain the continously differentiable one.

      3. $f neq 0$, the function does not totally equal to zero

      4. $tr(f) neq 0$ on $Gamma_1$ and $tr(f)=0$ on $Gamma_2$ - while trace is not totally equal to zero on $Gamma_1$, it is trivial on the remaining part of the boundary.



      I also have to compute the weak (distributional) derivative of f.

      The problem is, I have no idea how to give an example of such a function and therefore construct one. I do know how to compute distributional derivatives, if I had such a function I could probably prove it fulfills these requirements, but constructing one is beyond my ability.

      I get that $H^1(Omega)$ is a Hilbert space that is differentiable (in sense of having weak derivative) on subset $Omega in mathbb R^n$ and derivative of function is not continous on $Omega$, and that trace can be shown to be different than 0 from right computation. If I understand correctly, $Gamma_1$ and $Gamma_2$ are parts of $partial Omega$, which is the boundary of $Omega$. Neverthess as I stated before I don't know how to construct the function and show those things. Can you help me?







      differential-equations differential-topology






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      edited Nov 26 at 22:05

























      asked Nov 26 at 21:37









      qalis

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      134



























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