Some important properties of harmonic functions can be deduced from Laplace's equation.
Regularity theorem for harmonic functions Harmonic functions are infinitely differentiable in open sets. In fact, harmonic functions are
real analytic.
Maximum principle Harmonic functions satisfy the following
maximum principle: if is a nonempty
compact subset of , then restricted to attains its
maximum and minimum on the
boundary of . If is
connected, this means that cannot have local maxima or minima, other than the exceptional case where is
constant. Similar properties can be shown for
subharmonic functions.
The mean value property If is a
ball with center and radius which is completely contained in the open set , then the value of a harmonic function u: \Omega \to \R at the center of the ball is given by the average value of on the surface of the ball; this average value is also equal to the average value of in the interior of the ball. In other words, u(x) = \frac{1}{n\omega_n r^{n-1}}\int_{\partial B(x,r)} u\, d\sigma = \frac{1}{\omega_n r^n}\int_{B(x,r)} u\, dV where is the volume of the unit ball in dimensions and is the -dimensional surface measure. Conversely, all locally integrable functions satisfying the (volume) mean-value property are both infinitely differentiable and harmonic. In terms of
convolutions, if \chi_r := \frac{1}\chi_{B(0, r)} = \frac{n}{\omega_n r^n}\chi_{B(0, r)} denotes the
characteristic function of the ball with radius about the origin, normalized so that {{tmath|1=\textstyle \int_{\R^n}\chi_r\, dx = 1 }}, the function is harmonic on if and only if u(x) = u*\chi_r(x) for all and such that .
Sketch of the proof. The proof of the mean-value property of the harmonic functions and its converse follows immediately observing that the non-homogeneous equation, for any \Delta w = \chi_r - \chi_s admits an easy explicit solution {{tmath| w_{r,s} }} of class {{tmath| C_{1,1} }} with compact support in . Thus, if is harmonic in 0=\Delta u * w_{r,s} = u*\Delta w_{r,s}= u*\chi_r - u*\chi_s holds in the set of all points in with {{tmath| \operatorname{dist}(x,\partial\Omega) > r }} Since is continuous in , u * \chi_s converges to as showing the mean value property for in . Conversely, if is any L^1_{\mathrm{loc}} function satisfying the mean-value property in , that is, u*\chi_r = u*\chi_s holds in for all then, iterating times the convolution with one has: u = u*\chi_r = u*\chi_r*\cdots*\chi_r\,,\qquad x\in\Omega_{mr}, so that is C^{m-1}(\Omega_{mr}) because the -fold iterated convolution of is of class C^{m-1} with support . Since and are arbitrary, is C^{\infty}(\Omega) too. Moreover, \Delta u * w_{r,s} = u*\Delta w_{r,s} = u*\chi_r - u*\chi_s = 0 for all so that in by the fundamental theorem of the calculus of variations, proving the equivalence between harmonicity and mean-value property. This statement of the mean value property can be generalized as follows: If is any spherically symmetric function
supported in such that , then . In other words, we can take the weighted average of about a point and recover . In particular, by taking to be a function, we can recover the value of at any point even if we only know how acts as a
distribution. See ''
Weyl's lemma''.
Harnack's inequality Let V \subset \overline{V} \subset \Omega be a connected set in a bounded domain . Then for every non-negative harmonic function ,
Harnack's inequality \sup_V u \le C \inf_V u holds for some constant that depends only on and .
Removal of singularities The following principle of removal of singularities holds for harmonic functions. If is a harmonic function defined on a dotted open subset \Omega \smallsetminus \{x_0\} of , which is less singular at than the fundamental solution (for ), that is f(x)=o\left( \vert x-x_0 \vert^{2-n}\right),\qquad\text{as }x\to x_0, then extends to a harmonic function on (compare
Riemann's theorem for functions of a complex variable).
Liouville's theorem Theorem: If is a harmonic function defined on all of which is bounded above or bounded below, then is constant. (Compare
Liouville's theorem for functions of a complex variable).
Edward Nelson gave a particularly short proof of this theorem for the case of bounded functions, using the mean value property mentioned above: Given two points, choose two balls with the given points as centers and of equal radius. If the radius is large enough, the two balls will coincide except for an arbitrarily small proportion of their volume. Since is bounded, the averages of it over the two balls are arbitrarily close, and so assumes the same value at any two points. The proof can be adapted to the case where the harmonic function is merely bounded above or below. By adding a constant and possibly multiplying by , we may assume that is non-negative. Then for any two points and , and any positive number , we let . We then consider the balls and where by the triangle inequality, the first ball is contained in the second. By the averaging property and the monotonicity of the integral, we have f(x)=\frac{1}{\operatorname{vol}(B_R)}\int_{B_R(x)}f(z)\, dz\leq \frac{1}{\operatorname{vol}(B_R)} \int_{B_r(y)}f(z)\, dz. (Note that since {{tmath|\operatorname{vol} B_R(x)}} is independent of , we denote it merely as {{tmath|\operatorname{vol}(B_R)}}.) In the last expression, we may multiply and divide by {{tmath|\operatorname{vol}(B_r)}} and use the averaging property again, to obtain f(x)\leq \frac{\operatorname{vol}(B_r)}{\operatorname{vol}(B_R)}f(y). But as , the quantity \frac{\operatorname{vol}(B_r)}{\operatorname{vol}(B_R)} = \frac{\left(R+d(x,y)\right)^n}{R^n} tends to . Thus, . The same argument with the roles of and reversed shows that , so that . Another proof uses the fact that given a
Brownian motion in , such that , we have E[f(B_t)] = f(x_0) for all . In words, it says that a harmonic function defines a
martingale for the Brownian motion. Then a
probabilistic coupling argument finishes the proof. == Generalizations ==