T. Chantladze, N. Kandelaki, A. Lomtatidze, D. Ugulava
abstract:
Using the theory of spline functions, we investigate the problem of minimization
of a generalized Dirichlet integral of the form
Fl(u) = Integral over
W of (l2 + Sum from i=1 to n of uxi2
) p/2, 1 < p < infinity
where W is a bounded domain of an n-dimensional
Euclidean space Rn, l >= 0 is a fixed
number, and uxi is a generalized derivative of the
function u with respect to xi according to Sobolev defined on
W. Minimization is realized with respect to the
functions u whose boundary values on G form a
preassigned function, and for them Fl(u)
is finite.