Commuting functions of the position and momentum observables on locally compact abelian groups

We find in this paper the equimeasurable hulls and kernels of some function classes on a locally compact abelian group. These classes consist of all functions for which the Fourier transform belongs to a given Lorentz space on the dual group. Different special cases of the problems considered in thi

It is proved that if a group of unitary operators and a local semigroup of isometries satisfy the Weyl commutation relations then they can be extended to groups of unitary operators which also satisfy the commutation relations. As an application a result about the extension of a class of locally def

On the structure of connected locally compact groups Dedicated to the 100. anniversary of the birthday of Erhard Xchmidt By H. BOSECK and G. CZICHOWSKI in Greifswald (Eingegangen am 29.12.1975) Let G denote a connected locally compact topological group. By the theorem of YAMABE the group G is a pro

For a closed subgroup H of a locally compact group G consider the property that the continuous positive definite functions on G which are identically one on H separate points in G"H from points in H. We prove a structure theorem for almost connected groups having this separation property for every c

Let 0 be a locally compact abelian ordered group. We say that 0 has the extension property if every operator valued continuous positive definite function on an interval of 0 has a positive definite extension to the whole group and we say that 0 has the commutant lifting property if a natural extensi