The module of a 2-component link

[B]Blanchfield, R. C. Intersection theory of manifolds with operators with applications to knot theory, Annals of Math.65 (1957), 340–56.

[Ba]Bass, H. On the ubiquity of Gorenstein rings, Math. Zeit.82 (1963), 8–28.

[Bo]Bourbaki, N. “Elements de Mathematiques,” XXVII, Algebre Commutative Ch. VII, Hermann, Paris, 1968.

[By]Bailey, J. Alexander invariants of links Ph.D. dissertation, U. of British Columbia, 1977.

[C]Crowell, R. Corresponding group and module sequences, Nagoya Math. J.19 (1961), 27–40.

[F]Fox, R. Free differential calculus II, Annals of Math.59 (1954), 196–210.

[H] J. Hillman,Knots and links in low dimensions, Ph.D. dissertation, Austrialian National University 1978.

[H1]Hillman, J. Alexander polynomials, annihilator ideals and the Steinitz-Fox-Smythe invariant, Proc. London Math. Soc. (to appear).

[H2]Hillaman, J. Alexander ideals, longitudes, etc., Abstracts 80T-G110, Abstracts Amer. Math. Soc.,1 (1980), 595.

[L] J. Levine,A method for generating link polynomials, Amer. J. Math.89 (1967), 69–84.

[L1] J. Levine,Knot modules, Trans. A.M.S.229 (1978), 1–50.

[L2]Levine, J. “Algebraic structure of knot modules,” Lecture Notes in Mathematics Number 772, Springer-Verlag, New York.

[M]Milnor, J. A duality theorem for Reidemeister torsion, Annals. of Math76 (1962), 137–47.

[Mc]MacLane, S. “Homology”, Academic Press New York, 1963.

[N]Nakanishi, Y. A surgical view of Alexander invariants of links, Math. Sem. Notes, Kobe U.8 (1980), 199–218.

[R]Rees, D. The grade of an ideal or module, Proc. Camb. Phil. Soc.53 (1957), 28–42.

[S]Sato, N On the Alexander modules of links, Illinois J. Math.25 (1981), 508–19.