论文信息 - Stable theories without dense forking chains

Stable theories without dense forking chains

SummaryWe define a generalized notion of rank for stable theories without dense forking chains, and use it to derive that every type is domination-equivalent to a finite product of regular types. We apply this to show that in a small theory admitting finite coding, no realisation of a nonforking extension of some strong type can be algebraic over some realisation of a forking extension.

Anand Pillay | Predrag Tanovic | Bernhard Herwig | James G. Loveys | O. Wagner

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