In mathematics, the three spheres inequality bounds the norm of a harmonic function on a given sphere in terms of the norm of this function on two spheres, one with bigger radius and one with smaller radius.
Statement of the three spheres inequality
Let be an harmonic function on . Then for all one has
where for is the sphere of radius centred at the origin and where
Here we use the following normalisation for the norm:
References
Korevaar, J.; Meyers, J. L. H. (1994), "Logarithmic convexity for supremum norms of harmonic functions", Bull. London Math. Soc., 26 (4): 353–362, doi:10.1112/blms/26.4.353, MR1302068