On the Dimension of Modules and Algebras, X: A Right Hereditary Ring which is not left Hereditary

Irving Kaplansky

doi:10.1017/S0027763000023527

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A ring R is said to be right (left) hereditary if every right (left) ideal in R is projective, that is, a direct summand of a free R-module. Cartan and Eilenberg [3, p. 15] ask whether there exists a right hereditary ring which is not left hereditary. The answer: yes.

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Beligiannis, Apostolos 2000. Relative Homological Algebra and Purity in Triangulated Categories. Journal of Algebra, Vol. 227, Issue. 1, p. 268.

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On the Dimension of Modules and Algebras, X: A Right Hereditary Ring which is not left Hereditary

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