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Mathematics and the 21st Century
Preview[46] N. V. Loi and R. Wiegandt, Involution algebras and the Anderson–Divinsky— Suliński property, Acta Sci. Math. Szeged, 50 (1986), 5–14. [47] N. V. Loi and R. Wiegandt, On involution rings with minimum condition, Ring Theory, Israel Math.
Semigroups and Their Applications: Proceedings of the ...
PreviewI. A. Amin, R. Wiegandt: "Torsion and torsionfree classes of acts." Contićbutions to Gonohać. Aćgobha 2, Proc. Klagenfurt Conf. 1982. Wien, Stuttgart, 1983; 19-34. 2. E. Fried, R. Wiegåndt: "Abstract relational Structures, II (Torsion theory).
Theory of Radicals
Preview[2] T. Anderson, K. Kaarli and R. Wiegandt, Radicals and subdirect decompositions, Comm. Algebra 13(1985), 479–494. [3] T. Anderson, K. Kaarli and R. Wiegandt, On left strong radicals of near-rings, Proc. Edinburgh Math. Soc . 31(1988) ...
Algebra and Geometry
R. V. GamkrelidzeAbstr., 26(8):4703 (1966). R. Wiegandt, Über transfinit nilpotente Ringe. Acta math. Acad. scient. hung., 17(1-2):101-114 (1966). R. Wiegandt, Úber halbeinfache linear Kompakte Ringe. Studia scient math. hung., (ex Akad. Mat. kutato int. közl.) ...
Advances in Algebra
PreviewG. F. Birkenmeier and R. Wiegandt, Essential covers and complements of radicals, Bull. Austral. Math. Soc., 53 (1996), 261–266. Halina France-Jackson, On a non-simple idempotent *-ring with zero centre, Acta Math. Hungar., to appear.
NonasSociative Algebra and Its Applications
PreviewR. Costa, Henrique Guzzo, Jr., A. Grichkov, L.A. Peresi. COROLLARY 6.4. Every semiprime algebra A 6 Alt with ... [3] K. I. Beidar and R. Wiegandt, Splitting theorems for nonassociative rings, Publ. Math. Debrecen, 38 (1991), 121-143. [4] K. I. ...
Ganglioside Function: Biochemical and Pharmacological ...
PreviewActa 135, 33. . Wiegandt H. (1967) J. Neurochem. 14, 671. Morgan I.G., Wolfe L. S., Mandel P. and Gombos G. (1971) Biochim. Biophys. Acta 241, 737. . Klenk E. (1939) Z. Physiol. Chem. 262, 128. . Brady R.0. and Kolodny E. H. (1972) Progr.
Rings and Radicals
R. Wiegandt[91] and Dinh Van Huynh, Characterizing rings by their modules, Topics in Algebra, Banach Center Publications #26, PWN, Warsaw, 1990. [92] , Dinh Van Huynh and Nguyen V. Dung, A characterization of noetherian modules, Quart. J. Math.
Topological Rings Satisfying Compactness Conditions
M. Ursul[Wid] A. Widiger, Die Struktur einer Klasse linear kompakter Ringe, Beitr. zur Algebra und Geom., 3 (1974), 139-159. [W1] R. Wiegandt, Uber linear kompakte regulare Ringe, Bull. de l'Acad. Polonaise des sci. math. astronom. phys., 13 ( 1965), ...
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