Abstract:
Necessary and sufficient conditions on a weight function v guaranteeing the bounded-
ness/compactness of the Riemann-Liouville transform with variable parameter R α(x)
q(x)
from L p(x) to L v
are found. The measure of non-compactness of this operation is
also estimated from both sides in variable exponent spaces.
Necessary and sufficient conditions guaranteeing the trace inequality for positive
kernel operators in classical Lebesgue spaces defined on cones of nilpotent groups are
established. Compactness criteria for these operators in classical weighted Lebesgue
spaces are also obtained. Two-sided estimate for Schatten-von Neumann ideal norms
of weighted higher order kernel operators are established. Asymptotic formulas for
singular numbers for some potential-type operators are derived. Some of these results
are applied to the problem of the existence of non-negative solution for certain non-
linear integral equation.