Kato's inequality

In functional analysis, a subfield of mathematics, Kato's inequality is a distributional inequality for the Laplace operator or certain elliptic operators. It was proven in 1972 by the Japanese mathematician Tosio Kato.
The original inequality is for some degenerate elliptic operators. This article treats the special case for the Laplace operator.

Inequality for the Laplace operator

Let be a bounded and open set, and such that. Then the following holds
where
is the space of locally integrable functions – i.e., functions that are integrable on every compact subset of their domains of definition.

Remarks

Sometimes the inequality is stated in the form
If is continuous in then

Literature

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