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In mathematics, there are several theorems basic to [[algebraic K-theory|algebraic ''K''-theory]].
Throughout, for simplicity, we assume when an [[exact category]] is a subcategory of another exact category, we mean it is strictly full subcategory (i.e., [[Isomorphism-closed subcategory|isomorphism-closed
== Theorems ==
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== Bibliography ==
*{{cite journal |first=Charles |last=Weibel |author-link=Charles Weibel |url=http://www.math.rutgers.edu/~weibel/Kbook.html |title=The ''K''-book: An introduction to algebraic K-theory |journal=Graduate Studies in Math |series=Graduate Studies in Mathematics |volume=145 |year=2013|doi=10.1090/gsm/145 |isbn=978-0-8218-9132-2 |url-access=subscription }}
*Ross E. Staffeldt, [http://folk.uio.no/rognes/kurs/mat9570v10/S89.pdf On Fundamental Theorems of Algebraic K-Theory]
*GABE ANGELINI-KNOLL, [http://www.math.wayne.edu/~gak/talks/FTKthytalk.pdf FUNDAMENTAL THEOREMS OF ALGEBRAIC K-THEORY]
*{{cite arXiv|eprint=1311.5162 |last1=Harris |first1=Tom |title=Algebraic proofs of some fundamental theorems in algebraic ''K''-theory |date=2013 |class=math.KT }}
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[[Category:Algebraic K-theory]]
[[Category:Theorems in algebraic topology]]
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