Let be an open subset of -dimensional Euclidean space , and let denote the usual Laplace operator. Weyl's lemma[1] states that if a locally integrable function is a weak solution of Laplace's equation, in the sense that
To prove Weyl's lemma, one convolves the function with an appropriate mollifier and shows that the mollification satisfies Laplace's equation, which implies that has the mean value property. Taking the limit as and using the properties of mollifiers, one finds that also has the mean value property,[2] which implies that it is a smooth solution of Laplace's equation.[3][4] Alternative proofs use the smoothness of the fundamental solution of the Laplacian or suitable a priori elliptic estimates.
Now by considering difference quotients we see that
.
Indeed, for we have
in with respect to , provided and (since we may differentiate both sides with respect to . But then , and so for all , where . Now let . Then, by the usual trick when convolving distributions with test functions,
and so for we have
.
Hence, as in as , we get
.
Consequently , and since was arbitrary, we are done.
More generally, the same result holds for every distributional solution of Laplace's equation: If satisfies for every , then is a regular distribution associated with a smooth solution of Laplace's equation.[5]
Weyl's lemma follows from more general results concerning the regularity properties of elliptic or hypoelliptic operators.[6] A linear partial differential operator with smooth coefficients is hypoelliptic if the singular support of is equal to the singular support of for every distribution . The Laplace operator is hypoelliptic, so if , then the singular support of is empty since the singular support of is empty, meaning that . In fact, since the Laplacian is elliptic, a stronger result is true, and solutions of are real-analytic.
^Hermann Weyl, The method of orthogonal projections in potential theory, Duke Math. J., 7, 411–444 (1940). See Lemma 2, p. 415
^The mean value property is known to characterize harmonic functions in the following sense. Let . Then is harmonic in the usual sense (so and if and only if for all balls we have
where is the (n − 1)-dimensional area of the hypersphere .
Using polar coordinates about we see that when is harmonic, then for ,
^Bernard Dacorogna, Introduction to the Calculus of Variations, 2nd ed., Imperial College Press (2009), p. 148.