Order-preserving isomorphisms between algebras of pseudo-differential operators

## Abstract For a large class of pseudo‐differential operators with a negative definite symbol __q__(__x__, ξ) in the sense of Hoh and for a large family of __x__‐dependent Bernstein functions __f__(__x__, ·) we prove that the pseudo‐differential operator with symbol −__f__(__x__, __q__(__x__, ξ))

Operator differential equations such as the matrix Riccati equation u$=a+bu+ud+ucu play a prominent role in the theory of scattering and transport and in other areas of technology; see, for example, [4,5,7] and the references cited there. Especially important are conditions for invariance of the uni

The connection between the decay of subordinate solutions and the singularities of the m-function is analysed for general one-dimensional operation of Schrodin-ger and Dirac type. Several applications to concrete examples are given, including an investigation of singular continuous spectral measures

The space of linear differential operators on a smooth manifold M has a natural one-parameter family of Diff(M )-(and Vect(M )-) module structures, defined by their action on the space of tensor densities. It is shown that, in the case of secondorder differential operators, the Vect(M)-module struct