Lp regularity of homogeneous elliptic differential operators with constant coefficients on RN

Abstract

Let A be a homogeneous elliptic differential operator of order m on % RN with constant complex coefficients. A partial version of the main result is as follows: Suppose that u∈ Lloc1 and that Au∈ Lp for some 1<p<∞ . Then, all the partial derivatives of order m of u are in Lp if and only if |u| grows slower than |x|m at infinity, provided that growth is measured in an L1-averaged sense over balls with increasing radii. The necessity provides an alternative answer to the pointwise growth question investigated with mixed success in the literature. Only a few special cases of the sufficiency are already known, mostly when A= . The full result gives a similar necessary and sufficient growth condition for the derivatives of u of any order k≥ 0 to be in Lp when Au satisfies a suitable (necessary) condition. This is generalized to exterior domains under mandatory restrictions on N and p and to Douglis-Nirenberg elliptic systems whose entries are homogeneous operators with constant coefficients and possibly different orders.