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QE rings in characteristic p n
Journal of Symbolic Logic 48 (1):140 - 162 (1983)
Abstract
We show that all QE rings of prime power characteristic are constructed in a straightforward way out of three components: a filtered Boolean power of a finite field, a nilpotent Jacobson radical, and the ring Z p n or the Witt ring W 2 (F 4 ) (which is the characteristic four analogue of the Galois field with four elements)Links
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Citations of this work
Finite QE rings in characteristic p 2.Dan Saracino & Carol Wood - 1985 - Annals of Pure and Applied Logic 28 (1):13-31.
Homogeneous finite rings in characteristic 2n.Dan Saracino & Carol Wood - 1988 - Annals of Pure and Applied Logic 40 (1):11-28.
Homogeneous finite rings in characteristic 2< sup> n.Dan Saracino & Carol Wood - 1988 - Annals of Pure and Applied Logic 40 (1):11-28.
TERLOUW, J., Reduction of higher type levels by means of an ordinal analysis of finite terms WOOD, C., see SARACINO, D.D. Saracino - 1985 - Annals of Pure and Applied Logic 28 (1):322.
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