1 |
R. Diestel, Graph Theory, G.T.M. No.88, Springer-Verlag, New York, 1997.
|
2 |
E. Enochs, I. Herzog, S. Park, Cyclic quiver rings and polycyclic-by-finite group rings, Houston J. Math. 25(1)(1999), 1-13.
|
3 |
E. Enochs, I. Herzog, A homotopy of quiver morphism with applications to rep- resentations, Canad. J. Math. 51(2)(1999), 294-308.
DOI
|
4 |
S. Park, Projective representations of quivers, Int. J. Math. Math. Sci. 31(2)(2002), 97-101.
DOI
ScienceOn
|
5 |
S. Park, D. Shin, Injective representation of quiver, Commun. Korean Math. Soc. 21(1)(2006), 37-43.
과학기술학회마을
DOI
ScienceOn
|
6 |
S. Park, Injective and projective properties of representation of quivers with n edges, Korean J. Math. 16(3)(2008), 323-334.
|
7 |
S. Park, E. Enochs and H. Kim, Injective covers and envelopes of representation of linear quiver, Comm. Algebra 37(2)(2009), 515-524.
DOI
ScienceOn
|
8 |
J. Rotman, An Introduction to Homological Algebra, Academic Press Inc., New York, 1979.
|