Abstract
The problem of uniqueness of monotone continuous linear extensions of $$T_{(2N)} = \{ 1,T_1 ,...,T_{2N} \} \in E'_{(2N)} = \prod\limits_{n = 0}^{2N} {E'_n } $$ is solved. A characterization of a relativistic QFT in terms of finitely many VEV's is derived. All results are illustrated by an explicit discussion of the extension problem for special cases ofT (4)={1,0,T 2,T 3,T 4}. This discussion contains explicitly necessary and sufficient conditions onT (4) for the existence of minimal extensions and some convenient sufficient conditions.
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