From a higher level point of view, the Poincare inequality is about comparing seminorms of functions. For example, it is reasonable to expect something like:

$$\int_\Omega ( u - \overline u )^p \dL x \leq C \int_\Omega | D u |^p \dL x$$

Your suggested inequality looks like trying to compare two scalar products, except it has been modified on the right-hand side to be positive.

From a higher level point of view, the Poincare inequality is about comparing seminorms of functions. For example, it is reasonable to expect something like:

$$\DeclareMathOperator{\dL}{d\!}\int_\Omega ( u - \overline u )^p \dL x \leq C \int_\Omega | D u |^p \dL x$$

Your suggested inequality looks like trying to compare two scalar products, except it has been modified on the right-hand side to be positive.

From a higher level point of view, the Poincare inequality is about comparing seminorms of functions. For example, it is reasonable to expect something like:

$$\int_\Omega ( u - \overline u )^p dx \leq C \int_\Omega | D u |^p dx$$

Your suggested inequality looks like trying to compare two scalar products, except it has been modified on the right-hand side to be positive.

From a higher level point of view, the Poincare inequality is about comparing seminorms of functions. For example, it is reasonable to expect something like:

$$\int_\Omega ( u - \overline u )^p \dL x \leq C \int_\Omega | D u |^p \dL x$$

Your suggested inequality looks like trying to compare two scalar products, except it has been modified on the right-hand side to be positive.