On (r, 2)-capacities for a class of elliptic pseudo differential operators

The paper deals with function spaces F>,?(R", a ) and P;X(Rn, a ) defined on the EucLIDean n-space R". These spaces will be defined on the basis of function spaces of BESOV-HARDY-SOBOLEV type F;,(Rn) and B:,JRn) -see-[25], and by appropriate pseudo-differential operators A(x, 0,). We get scales of s

## Abstract In this paper we prove subelliptic estimates for operators of the form Δ__~x~ +__ λ^2^ (__x__)__S__ in ℝ__^N^__ = ℝ × ℝ, where the operator __S__ is an elliptic integro ‐ differential operator in ℝ__^N^__ and λ is a nonnegative Lipschitz continuous function.

## On degenerate boundary value problems for elliptic differential operators of second order in the plane and the index of degenerate pseudo-differential operators on a closed curve By JOHANNES ELSCHNER in Berlin (Eingegangen am 21.11. 1980)