Topological algebra sheaves and applications
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Topological Algebra Algebra Sheave
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References
- 1.G. E. Bredon,Sheaf Theory, McGraw-Hill, New York (1967).Google Scholar
- 2.M. Fragoulopoulou, “An introduction to the representation theory of topological *-algebras,”Schriftenreihe des Math. Instituts der Univ. Münster, 2 Serie,48, 1–81 (1988).Google Scholar
- 3.M. Fragoulopoulou, “Tensor products of enveloping locally algebras,”Schriftenreihe des Math. Instituts der Univ. Münster, to appear.Google Scholar
- 4.M. Fragoulopoulou and A. Kyriazis, “On locallym-convex *-algebra bundles,” to appear.Google Scholar
- 5.A. Inoue, “LocallyC *-algebras,”Mem. Faculty Sci. Kyushu Univ., Ser. A,25, 197–235 (1971).Google Scholar
- 6.A. Kyriazis, “On topological algebra sheaves,”J. Austral. Math. Soc., Ser. A,61, 14–29 (1996).Google Scholar
- 7.A. Kyriazis, “Central morphisms and envelopes of holomorphy,”Portug. Math.,52 (3) (1995).Google Scholar
- 8.A. Mallios,Topological Algebras: Selected Topics, North-Holland, Amsterdam (1986).Google Scholar
- 9.A. Mallios, “On topological algebra sheaves of a nuclear type,”Stud. Math.,38, 215–220 (1970).Google Scholar
- 10.A. Mallios, “Topological algebras in several complex variables,” In:Proc. Intern. Conf. Funct. Anal. Appl. Madras, 1973, Lect. Notes Math., Vol. 399, Springer, Berlin (1974), pp. 342–377.Google Scholar
- 11.A. Mallios, “On geometric topological algebras,”J. Math. Anal. Appl.,172 (2), 301–322 (1993).Google Scholar
- 12.B. R. Tennison,Sheaf Theory, Cambridge University Press, Cambridge (1975).Google Scholar
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