In the $1$st edition, this was question $5.9$. The question is:
Integrate by parts to prove: $$\int_{U} |Du|^p \ dx \leq C \left(\int_{U} |u|^p \ dx\right)^{1/2} \left(\int_{U} |D^2 u|^p \ dx\right)^{1/2}$$ for $ 2 \leq p < \infty$ and all $u \in W^{2,p}(U) \cap W^{1,p}_{0}(U)$.
Hint: $$\int_{U} |Du|^p dx = \sum_{i=1}^{n}\int_{U} u_{x_i}u_{x_i}|Du|^{p -2}\ dx$$
I am trying to prove this holds for $u \in C^{\infty}_{c} (U)$, and then by density conclude the theorem. However, this integration does not appear to be working.
The question says to use the integration by parts formula. Is it possible to use integration by parts in the following integral? $$\int_{U} u_{x_i}u_{x_i}|Du|^{p -2}\ dx$$
My friend used it here, but he doesn't know if it is valid...
Can someone please give a hint for how I could start?