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\begin{document}
\section{Bibliography for mathematical physics foundations}
A1. \textbf{Axiomatics and \htmladdnormallink{categories}{http://planetphysics.us/encyclopedia/Cod.html} in the foundations of physics}
\begin{thebibliography}{99}
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Auslander, M. 1965. Coherent Functors. \emph{Proc. Conf. Cat. Algebra, La Jolla},
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Awodey, S. \& Reck, E. R., 2002, Completeness and Categoricity II. Twentieth-Century Metalogic to Twenty-first-Century Semantics, \emph{History and Philosophy of Logic}, 23, (2): 77--94.
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Awodey, S., 2004, An Answer to Hellman's Question: Does Category Theory Provide a Framework for Mathematical Structuralism, \emph{Philosophia Mathematica}, 12: 54--64.
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Baianu, I.C.: 1971a, Organismic Supercategories and Qualitative Dynamics of Systems. \emph{Ibid.}, \textbf{33} (3), 339--354.
\bibitem{ICB4}
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Baianu, I. C., Glazebrook, J. F. and G. Georgescu: 2004, Categories of Quantum Automata and N-Valued \L ukasiewicz Algebras in Relation to Dynamic Bionetworks, \textbf{(M,R)}--Systems and Their Higher Dimensional Algebra,
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\bibitem{ICB8}
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\bibitem{BBGG1}
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\bibitem{BASA92}
Blass, A. \& Scedrov, A., 1992, Complete Topoi Representing Models of Set Theory,
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\bibitem{BA84}
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\bibitem{BHR2}
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Brown, R., Glazebrook, J. F. and I.C. Baianu.: 2007b, A Conceptual, Categorical and Higher Dimensional Algebra Framework of Universal Ontology and the Theory of Levels for Highly Complex Structures and Dynamics., \emph{Axiomathes} (17): 321--379.
\bibitem{BPP2k4}
Brown, R., Paton, R. and T. Porter.: 2004, Categorical language and
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\bibitem{BR-SCB76}
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\end{document}