Journals
1
  • S. Westreich, “Matrix Localization and Embedding”, Communications in Algebra, 16 (1) (1988), 75-102.
  • S. Westreich, “On Sylvester Rank Function”, J. of the London Math. Society, 43 (2) (1991), 199-214.
  • M. Cohen and S. Westreich, “Central Invariants of H-module Algebras”, Communications in Algebra, 21 (8) (1993), 2859-2883.
  • M. Cohen and S. Westreich, “From Supersymmetry to Quantum Commutativity”, J. of Algebra, 168 (1) (1994), 1-27.
  • M. Cohen, D. Fischman and S. Westreich, “Schur’s Double Centralizer Theorem for Triangular Hopf Algebras”, Proc. of the American Math. Society, 122 (1) (1994), 19-29.
  • M. Cohen, S. Raianu and S. Westreich, “Semiinvariants for Hopf Algebra Actions”, Israel J. of Math., 88 (1994), 279-306.
  • S. Westreich, “Quasitriangular Hopf Algebras whose Group of Grouplike Elements  Form an Abelian Group”, Proc. of the American Math. Society, 124 (4) (1996) 1023-1026.
  • M. Cohen, S. Westreich and S. Zhu, “Determinants, Integrability and Noether’s Theorem for Quantum Commutative Algebras”, Israel J. of Math. 96 (1996), 185-222.
  • S. Gelaki and S. Westreich, “On the Quasitriangularity of Uq(sln)' ”, J. of the London Math. Society, (2) (57) (1998), 105-125.
  • M. Cohen and S. Westreich, “Determinants and Symmetries in Yetter-Dinfeld Categories”, Kluwer Academic Publishers, Applied Categorical Structures 6: 267-289, 1998.
  • S. Gelaki and S. Westreich, “Hopf algebras of type Uq(sln)’ and Oq(SLn)’ which give rise to certain invariants of knots, links and 3-manifolds”, Trans. Amer. Math. Soc. 352 (2000), 3821-3836.
  • S. Gelaki and S. Westreich, “On Semisimple Hopf Algebras of Dimension pq”, Proc. of the Amererican Math. Soc. 128 (2000) (1), 39-47.

 

  • Errata to: "On semisimple Hopf algebras of dimension pq" [Proc. Amer. Math. Soc. {128} (2000), no. 1, 39-47; MR 2000c:16050]. Proc. Amer. Math. Soc. 128 (2000), no. 9, 2829-2831 (electronic). 16W30
  • M. Cohen and S. Westreich, “On generalized invariants of injective non-singular module algebras over their invariants”, J. of Algebra, 223 (2000), 489-510.
  • S. Westreich, “A Galois-type correspondence theory for actions of finite dimensional pointed Hopf algebras on prime algebras”, J. of Algebra, 219 (1999) (2), 606-624.
  • S. Westreich, “Inner actions, outer actions and Galois correspondence”, . New trends in Hopf algebra theory (La Falda, 1999), 325-337, Contemp. Math., 267, Amer. Math. Soc., Providence, RI, 2000.
  • S. Westreich and T. Yanai, “More about Galois-type correspondence”, J. of Algebra, 246 (2001),(2), 629-640.
  • D. Radford and S. Westreich, “Trace-like functionals on the double of the Taft Hopf algebra”, J. of Algebra, to appear.
  • M. Cohen and S. Westreich, “Some interrelations between Hopf algebras and their duals”, J. of Algebra, to appear.

 

Books
S

S. Gelaki, M. Cohen and S. Westreich, “Hopf algebras”, volume 4 of the
Handbook of Algebra, invited by Elsevier Science Publisherswhich, scheduled to appear this year