Every semiprimary ring is the endomorphism ring of a projective module over a quasi-hereditary ring

Dlab V, Ringel CM (1989)
Proceedings of the American Mathematical Society 107(1): 1-5.

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Dlab V, Ringel CM. Every semiprimary ring is the endomorphism ring of a projective module over a quasi-hereditary ring. Proceedings of the American Mathematical Society. 1989;107(1):1-5.
Dlab, V., & Ringel, C. M. (1989). Every semiprimary ring is the endomorphism ring of a projective module over a quasi-hereditary ring. Proceedings of the American Mathematical Society, 107(1), 1-5.
Dlab, V., and Ringel, C. M. (1989). Every semiprimary ring is the endomorphism ring of a projective module over a quasi-hereditary ring. Proceedings of the American Mathematical Society 107, 1-5.
Dlab, V., & Ringel, C.M., 1989. Every semiprimary ring is the endomorphism ring of a projective module over a quasi-hereditary ring. Proceedings of the American Mathematical Society, 107(1), p 1-5.
V. Dlab and C.M. Ringel, “Every semiprimary ring is the endomorphism ring of a projective module over a quasi-hereditary ring”, Proceedings of the American Mathematical Society, vol. 107, 1989, pp. 1-5.
Dlab, V., Ringel, C.M.: Every semiprimary ring is the endomorphism ring of a projective module over a quasi-hereditary ring. Proceedings of the American Mathematical Society. 107, 1-5 (1989).
Dlab, Vlastimil, and Ringel, Claus Michael. “Every semiprimary ring is the endomorphism ring of a projective module over a quasi-hereditary ring”. Proceedings of the American Mathematical Society 107.1 (1989): 1-5.
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