On a Hilbert-type operator with a class of homogeneous kernels.
On a multiple Hilbert-type integral inequality with the symmetric kernel.
On a trace inequality for one-sided potentials and applications to the solvability of nonlinear integral equations.
On the logarithmic potential defined for a Van Koch curve.
Optimal domains for kernel operators on [0,∞) × [0,∞)
Let T be a kernel operator with values in a rearrangement invariant Banach function space X on [0,∞) and defined over simple functions on [0,∞) of bounded support. We identify the optimal domain for T (still with values in X) in terms of interpolation spaces, under appropriate conditions on the kernel and the space X. The techniques used are based on the relation between linear operators and vector measures.