ON A SOLUTIONS OF ONE CLASS OF ALMOST HYPOELLIPTIC EQUATIONS

Abstract

We prove that if $P(D)=P(D_1,D_2)=\sum_\alpha\gamma_\alpha D_1^{\alpha_1}D_2^{\alpha_2}$ is almost hippoelliptic regular operator, then for enough small $\delta>0$, all solutions of equation $P(D)u=0$ from $L_{2,\delta}(R^2)$ are entire analytical functions.