Harnack's principle

(Redirected from Harnack's theorem)

In the mathematical field of partial differential equations, Harnack's principle or Harnack's theorem is a corollary of Harnack's inequality which deals with the convergence of sequences of harmonic functions.

Given a sequence of harmonic functions u1, u2, ... on an open connected subset G of the Euclidean space Rn, which are pointwise monotonically nondecreasing in the sense that

for every point x of G, then the limit

automatically exists in the extended real number line for every x. Harnack's theorem says that the limit either is infinite at every point of G or it is finite at every point of G. In the latter case, the convergence is uniform on compact sets and the limit is a harmonic function on G.[1]

The theorem is a corollary of Harnack's inequality. If un(y) is a Cauchy sequence for any particular value of y, then the Harnack inequality applied to the harmonic function umun implies, for an arbitrary compact set D containing y, that supD |umun| is arbitrarily small for sufficiently large m and n. This is exactly the definition of uniform convergence on compact sets. In words, the Harnack inequality is a tool which directly propagates the Cauchy property of a sequence of harmonic functions at a single point to the Cauchy property at all points.

Having established uniform convergence on compact sets, the harmonicity of the limit is an immediate corollary of the fact that the mean value property (automatically preserved by uniform convergence) fully characterizes harmonic functions among continuous functions.[2]

The proof of uniform convergence on compact sets holds equally well for any linear second-order elliptic partial differential equation, provided that it is linear so that umun solves the same equation. The only difference is that the more general Harnack inequality holding for solutions of second-order elliptic PDE must be used, rather than that only for harmonic functions. Having established uniform convergence on compact sets, the mean value property is not available in this more general setting, and so the proof of convergence to a new solution must instead make use of other tools, such as the Schauder estimates.

References

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  1. ^ Courant & Hilbert 1962, pp. 273–274; Gilbarg & Trudinger 2001, Theorem 2.9; Protter & Weinberger 1984, Section 2.10.
  2. ^ Gilbarg & Trudinger 2001, Theorems 2.7 and 2.8.

Sources

  • Courant, R.; Hilbert, D. (1962). Methods of mathematical physics. Volume II: Partial differential equations. New York–London: Interscience Publishers. doi:10.1002/9783527617234. ISBN 9780471504399. MR 0140802. Zbl 0099.29504.
  • Gilbarg, David; Trudinger, Neil S. (2001). Elliptic partial differential equations of second order. Classics in Mathematics (Reprint of the 1998 ed.). Berlin: Springer-Verlag. doi:10.1007/978-3-642-61798-0. ISBN 3-540-41160-7. MR 1814364. Zbl 1042.35002.
  • Protter, Murray H.; Weinberger, Hans F. (1984). Maximum principles in differential equations (Corrected reprint of the 1967 original ed.). New York: Springer-Verlag. doi:10.1007/978-1-4612-5282-5. ISBN 0-387-96068-6. MR 0762825. Zbl 0549.35002.
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