G. Khuskivadze and V. Paatashvili
abstract:
It is proved that for harmonic functions from the Smirnov class
$e(L_{1p}(\rho_1),L_{2q}'(\rho_2))$ (i.e., for functions satisfying the
inequality (2)) in a simply connected domain with the Lyapunov boundary $L$
almost everywhere on $L$ there exist the angular boundary values which on the
part $L_2$ of the boundary form an absolutely continuous function.
Mathematics Subject Classification: 31A05, 35J05
Key words and phrases: Harmonic functions, Smirnov classes of harmonic functions, Zaremba's problem, absolute continuity