Bibliography of T. J. Ford

  1. (with I. D. Palmer, and R. Sanders), Separation of solar and interplanetary diffusion in solar cosmic ray events, J. Geophys. Res., 82 (1977), pp. 4704--4709.
  2. (with F. R. DeMeyer), On units of group rings, J. Pure Appl. Algebra, 16 (1980), pp. 245--248.
  3. Every finite abelian group is the Brauer group of a ring, Proc. Amer. Math. Soc., 82 (1981), pp. 315--321.
  4. (with F. R. DeMeyer), On the Brauer group of surfaces and subrings of k[x,y], in Brauer Groups in Ring Theory and Algebraic Geometry, vol. 917 of Lecture Notes in Math., 1982, Springer-Verlag, Berlin, pp. 211--221. pdf file.
  5. (with F. R. DeMeyer), On the Brauer group of surfaces, J. Algebra, 86 (1984), pp. 259--271.
  6. Hecke actions on Brauer groups, J. Pure Appl. Algebra, 33 (1984), pp. 11--17.
  7. (with F. R. DeMeyer), Homomorphisms of progenerator modules, J. Algebra, 113 (1988), pp. 379--398.
  8. Homomorphisms of progenerator modules under a change of base ring, Comm. Algebra, 16 (1988), pp. 457--482.
  9. On the Brauer group of a Laurent polynomial ring, J. Pure Appl. Algebra, 51 (1988), pp. 111--117.
  10. (with F. R. DeMeyer), Computing the Brauer-Long group of Z/2-dimodule algebras, J. Pure Appl. Algebra, 54 (1988), pp. 197--208.
  11. On the Brauer group of k[x1, ..., xn,1/f], J. Algebra, 122 (1989), pp. 410--424.
  12. On the Brauer group and the cup product map, in Perspectives in Ring Theory, F. van Oystaeyen and L. Le Bruyn, eds., NATO ASI series, Kluwer Academic Publ., Dordrecht, 1988, pp. 135--145. pdf file
  13. On the Brauer group of a localization, J. Algebra, 147 (1992), pp. 365--378.
  14. (with D. Saltman), Division algebras over henselian surfaces, Israel Mathematical Conference Proceedings, 1 (1989), pp. 320--336. pdf file
  15. Division algebras over nonlocal henselian surfaces, Pacific J. Math., 147 (1991), pp. 301--310.
  16. (with F. R. DeMeyer, and H. P. Miranda), Rational singularities and the Brauer group, J. Algebra, 162 (1993), pp. 287--294.
  17. On the Brauer group and quotient singularities, Illinois J. Math., 35 (1991), pp. 496--498.
  18. (with F. R. DeMeyer), On the Brauer group of toric varieties, Trans. Amer. Math. Soc., 335 (1993) pp. 559--577.
  19. (with F. R. DeMeyer), Nontrivial, locally trivial Azumaya algebras, in Azumaya Algebras, Actions, and Modules, D. Haile and J. Osterburg, eds., vol. 124 of Contemporary Mathematics, AMS, 1992, pp. 39--49.
  20. (with J. Blass, and P. Blass), On a remark of Grothendieck, Comm. Algebra, 18 (1990), pp. 3685--3687. pdf file
  21. On the Brauer group of a desingularization of a normal surface, Comm. Algebra, 20 (1992), pp. 3785--3791.
  22. The Brauer group and ramified double covers of surfaces, Comm. Algebra, 20 (1992), pp. 3793--3803.
  23. Products of symbol algebras that ramify only on a nonsingular plane elliptic curve, The Ulam Quarterly, 1 (1992), pp. 12--16. PostScript file
  24. (with F. R. DeMeyer, and H. P. Miranda), The cohomological Brauer group of toric varieties, J. of Alg. Geom., 2 (1993) pp. 137--154.
  25. Examples of locally trivial Azumaya algebras, K-theory and Algebraic Geometry: Connections with Quadratic Forms and Division Algebras (Santa Barbara, CA, 1992), vol. 58 of Proc. Sympos. Pure Math., Amer. Math. Soc., Providence, RI, 1995, pp. 197--216. pdf file
  26. Topological invariants of a fan associated to a toric variety, Comm. Algebra, 23 (1995), pp. 4031--4045. pdf file
  27. Division algebras and quadratic reciprocity, pdf file
  28. (with J. Brewer, L. Klingler and W. Schmale) When does the ring K[Y] have the coefficient assignment property?, J. Pure Appl. Algebra, 112 (1996), pp. 239--246. doi:10.1016/0022-4049(95)00142-5
  29. The toroidal embedding arising from an irrational fan, Resultate Math. 35 (1999), pp. 44--69. pdf file.
  30. The Brauer group of a curve over a strictly local discrete valuation ring, Israel J. Math. 96 (1996), pp. 259--266. pdf file.
  31. Division algebras that ramify only along a singular plane cubic curve, New York J. Math. 1 (1995) pp. 178--183.
  32. The Brauer group of an affine cone, J. Pure Appl. Algebra, 155 (2001), pp. 29--40. doi:10.1016/S0022-4049(99)00074-2
  33. (with R. Stimets), The Picard group of a general toric variety of dimension three, Comm. Algebra, 30 (2002), pp. 5771-­-5779. pdf file.
  34. The Brauer Group of a Toric Variety associated to a Finite Distributive Lattice, J. Pure Appl. Algebra, 159 (2001), pp. 75-­-82. doi:10.1016/S0022-4049(00)00124-9
  35. Division algebras that ramify only on a plane quartic curve with simply connected components, Algebr. Represent. Theory, 6 (2003), pp. 501-­-514.
  36. Division algebras that ramify only on a plane nodal cubic curve plus a line, J. Pure Appl. Algebra, 188 (2004), pp. 117-­-126. doi:10.1016/j.jpaa.2003.10.015
  37. Division algebras that ramify only on the zeros of an elementary symmetric polynomial , Int. Electron. J. Algebra., 2 (2007), pp. 189-­-207. pdf file.
  38. The Relative Brauer Group of a Cyclic Cover of Affine Space, Preprint, pdf file.
  39. Rings and Modules, Pre-preprint, pdf file.
Timothy J. Ford

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