Forking in locally free algebras
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Keywords
Free Algebra
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Literature cited
- 1.A. I. Mal'tsev, “Axiomatizable classes of locally free algebras of certain types,” Sib. Mat. Zh.,3, No. 5, 729–743 (1962).Google Scholar
- 2.S. Shelah, Classification Theory and the Number of Non-Isomorphic Models, North-Holland, Amsterdam-New York-Oxford (1978).Google Scholar
- 3.A. Pillay and M. Prest, “Forking and pushouts in modulus,” Proc. London Math. Soc.,46, 365–384 (1983).Google Scholar
- 4.P. Rothmaler, “Stationary types in modules,” Preprint, Akademie der Wiseenschaften der DDR, Inst. für Math. (Prepr. P-Math-24/81) (1981).Google Scholar
- 5.V. Harnik and L. Harrington, “Fundamentals of forking,” Ann. Pure Appl. Logic,26, No. 3, 245–286 (1984).Google Scholar
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© Plenum Publishing Corporation 1990