Decomposition of $C^{(k)}$ function












0












$begingroup$


I am stuck at the following exercise in Zorich.



Let $f,gin C^{(k)}(D;mathbb{R})$, and suppose that $f(x)=0Rightarrow g(x)=0$ in the domain $D$. Show that if grad $f neq 0$, them there is a decomposition $g=hcdot f$ in $D$, where $hin C^{(k-1)}(D;mathbb{R})$.



Could you give me a hint? Thanks in advance!










share|cite|improve this question











$endgroup$












  • $begingroup$
    Dear @Jiu, is $D$ a domain in $mathbb{R}^n$? I'm confused about $h$, because the image of $f$ lies in $mathbb{R}$, not in $D$. You should require $h(0)=0$ and perhaps some additional constraints on $h$.
    $endgroup$
    – user90189
    Dec 5 '18 at 4:36










  • $begingroup$
    @user90189 thanks for your comment! Now that you make me realize this problem, I just checked and see that in the English version, the $circ$ is replaced by $cdot$... So the $circ$ should be a typo in the German version!
    $endgroup$
    – Jiu
    Dec 5 '18 at 4:53










  • $begingroup$
    So, I think you can try to check that $g/f$ is well-defined :)
    $endgroup$
    – user90189
    Dec 5 '18 at 4:56










  • $begingroup$
    @user90189 yes now I know how to solve it :D
    $endgroup$
    – Jiu
    Dec 5 '18 at 7:55










  • $begingroup$
    @user90189 In fact when I try to write down the solution I realize that it is not correct :(
    $endgroup$
    – Jiu
    Dec 5 '18 at 8:57
















0












$begingroup$


I am stuck at the following exercise in Zorich.



Let $f,gin C^{(k)}(D;mathbb{R})$, and suppose that $f(x)=0Rightarrow g(x)=0$ in the domain $D$. Show that if grad $f neq 0$, them there is a decomposition $g=hcdot f$ in $D$, where $hin C^{(k-1)}(D;mathbb{R})$.



Could you give me a hint? Thanks in advance!










share|cite|improve this question











$endgroup$












  • $begingroup$
    Dear @Jiu, is $D$ a domain in $mathbb{R}^n$? I'm confused about $h$, because the image of $f$ lies in $mathbb{R}$, not in $D$. You should require $h(0)=0$ and perhaps some additional constraints on $h$.
    $endgroup$
    – user90189
    Dec 5 '18 at 4:36










  • $begingroup$
    @user90189 thanks for your comment! Now that you make me realize this problem, I just checked and see that in the English version, the $circ$ is replaced by $cdot$... So the $circ$ should be a typo in the German version!
    $endgroup$
    – Jiu
    Dec 5 '18 at 4:53










  • $begingroup$
    So, I think you can try to check that $g/f$ is well-defined :)
    $endgroup$
    – user90189
    Dec 5 '18 at 4:56










  • $begingroup$
    @user90189 yes now I know how to solve it :D
    $endgroup$
    – Jiu
    Dec 5 '18 at 7:55










  • $begingroup$
    @user90189 In fact when I try to write down the solution I realize that it is not correct :(
    $endgroup$
    – Jiu
    Dec 5 '18 at 8:57














0












0








0





$begingroup$


I am stuck at the following exercise in Zorich.



Let $f,gin C^{(k)}(D;mathbb{R})$, and suppose that $f(x)=0Rightarrow g(x)=0$ in the domain $D$. Show that if grad $f neq 0$, them there is a decomposition $g=hcdot f$ in $D$, where $hin C^{(k-1)}(D;mathbb{R})$.



Could you give me a hint? Thanks in advance!










share|cite|improve this question











$endgroup$




I am stuck at the following exercise in Zorich.



Let $f,gin C^{(k)}(D;mathbb{R})$, and suppose that $f(x)=0Rightarrow g(x)=0$ in the domain $D$. Show that if grad $f neq 0$, them there is a decomposition $g=hcdot f$ in $D$, where $hin C^{(k-1)}(D;mathbb{R})$.



Could you give me a hint? Thanks in advance!







analysis






share|cite|improve this question















share|cite|improve this question













share|cite|improve this question




share|cite|improve this question








edited Dec 5 '18 at 4:54







Jiu

















asked Dec 5 '18 at 3:07









JiuJiu

496113




496113












  • $begingroup$
    Dear @Jiu, is $D$ a domain in $mathbb{R}^n$? I'm confused about $h$, because the image of $f$ lies in $mathbb{R}$, not in $D$. You should require $h(0)=0$ and perhaps some additional constraints on $h$.
    $endgroup$
    – user90189
    Dec 5 '18 at 4:36










  • $begingroup$
    @user90189 thanks for your comment! Now that you make me realize this problem, I just checked and see that in the English version, the $circ$ is replaced by $cdot$... So the $circ$ should be a typo in the German version!
    $endgroup$
    – Jiu
    Dec 5 '18 at 4:53










  • $begingroup$
    So, I think you can try to check that $g/f$ is well-defined :)
    $endgroup$
    – user90189
    Dec 5 '18 at 4:56










  • $begingroup$
    @user90189 yes now I know how to solve it :D
    $endgroup$
    – Jiu
    Dec 5 '18 at 7:55










  • $begingroup$
    @user90189 In fact when I try to write down the solution I realize that it is not correct :(
    $endgroup$
    – Jiu
    Dec 5 '18 at 8:57


















  • $begingroup$
    Dear @Jiu, is $D$ a domain in $mathbb{R}^n$? I'm confused about $h$, because the image of $f$ lies in $mathbb{R}$, not in $D$. You should require $h(0)=0$ and perhaps some additional constraints on $h$.
    $endgroup$
    – user90189
    Dec 5 '18 at 4:36










  • $begingroup$
    @user90189 thanks for your comment! Now that you make me realize this problem, I just checked and see that in the English version, the $circ$ is replaced by $cdot$... So the $circ$ should be a typo in the German version!
    $endgroup$
    – Jiu
    Dec 5 '18 at 4:53










  • $begingroup$
    So, I think you can try to check that $g/f$ is well-defined :)
    $endgroup$
    – user90189
    Dec 5 '18 at 4:56










  • $begingroup$
    @user90189 yes now I know how to solve it :D
    $endgroup$
    – Jiu
    Dec 5 '18 at 7:55










  • $begingroup$
    @user90189 In fact when I try to write down the solution I realize that it is not correct :(
    $endgroup$
    – Jiu
    Dec 5 '18 at 8:57
















$begingroup$
Dear @Jiu, is $D$ a domain in $mathbb{R}^n$? I'm confused about $h$, because the image of $f$ lies in $mathbb{R}$, not in $D$. You should require $h(0)=0$ and perhaps some additional constraints on $h$.
$endgroup$
– user90189
Dec 5 '18 at 4:36




$begingroup$
Dear @Jiu, is $D$ a domain in $mathbb{R}^n$? I'm confused about $h$, because the image of $f$ lies in $mathbb{R}$, not in $D$. You should require $h(0)=0$ and perhaps some additional constraints on $h$.
$endgroup$
– user90189
Dec 5 '18 at 4:36












$begingroup$
@user90189 thanks for your comment! Now that you make me realize this problem, I just checked and see that in the English version, the $circ$ is replaced by $cdot$... So the $circ$ should be a typo in the German version!
$endgroup$
– Jiu
Dec 5 '18 at 4:53




$begingroup$
@user90189 thanks for your comment! Now that you make me realize this problem, I just checked and see that in the English version, the $circ$ is replaced by $cdot$... So the $circ$ should be a typo in the German version!
$endgroup$
– Jiu
Dec 5 '18 at 4:53












$begingroup$
So, I think you can try to check that $g/f$ is well-defined :)
$endgroup$
– user90189
Dec 5 '18 at 4:56




$begingroup$
So, I think you can try to check that $g/f$ is well-defined :)
$endgroup$
– user90189
Dec 5 '18 at 4:56












$begingroup$
@user90189 yes now I know how to solve it :D
$endgroup$
– Jiu
Dec 5 '18 at 7:55




$begingroup$
@user90189 yes now I know how to solve it :D
$endgroup$
– Jiu
Dec 5 '18 at 7:55












$begingroup$
@user90189 In fact when I try to write down the solution I realize that it is not correct :(
$endgroup$
– Jiu
Dec 5 '18 at 8:57




$begingroup$
@user90189 In fact when I try to write down the solution I realize that it is not correct :(
$endgroup$
– Jiu
Dec 5 '18 at 8:57










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