Remarks on a Result of L.A.V. Carvalho

## Abstract Calderon's extension theorem is a crucial tool in the proof of the compactneσs of the resolvent for the Maxwell operator, and whence this result is proved for domains with the strict cone property. However, the proof only requires an extension operator that extends __W__^2,2^‐functions

The purpose of this note is to show that the independence results for sharply bounded arithmetic of Takeuti [4] and Tada and Tatsuta [3] can be obtained and, in case of the latter, improved by the model-theoretic method developed by the author in [2].

James Ax has proved that when \((K, V)\) is a Henselian rank one valued field which is perfect of characteristic not zero, then to each \(\alpha\) in the algebraic closure \(\bar{K}\) of \(K\) there corresponds an element \(a \in K\) such that \(\bar{V}(\alpha-a) \geq \Delta(\alpha)\), where \(\Delt

If g and h are integers greater than 1, a ring W R is called a Wagner ring of type ( g; h) if all x # W "[0] are normal to base g but non-normal to base h. The existence of such rings was shown in 1989 by Wagner for the case when g is a proper odd prime divisor of h with ( g, (hÂg))=1. This result i