Articles dans des revues avec comité de lecture (54)
  1. 31. Cahen, M., Leroy, J., Parker, M., Tricerri, F., & Vanhecke, L. (1990). Lorentz manifolds modelled on a Lorentz symmetric space. Journal of geometry and physics, 7(4), 571-581.
  2. 32. Rawnsley, J., Cahen, M., & Gutt, S. (1990). Quantization of Kähler manifolds I: geometric interpretation of Berezin's quantization. Journal of geometry and physics, 7(1), 45-62.
  3. 33. Cahen, M., Franc, A., & Gutt, S. (1989). Spectrum of the Dirac operator on complex projective space P2q-1(ℂ). letters in mathematical physics, 18(2), 165-176. doi:10.1007/BF00401871
  4. 34. Cahen, M., Gutt, S., Kozameh, C., & Newman, E. (1988). Yang-Mills equations and solvable groups. II. Journal of mathematical physics, 29(4), 1022-1025.
  5. 35. Cahen, M., Flato, M., Gutt, S., & Sternheimer, D. (1985). Do different deformations lead to the same spectrum? Journal of geometry and physics, 2(1), 35-48.
  6. 36. Cahen, M., & Gutt, S. (1984). Discrete spectrum of the hydrogen atom: An illustration of deformation theory methods and problems. Journal of geometry and physics, 1(2), 65-83.
  7. 37. Cahen, M., & Gutt, S. (1982). Regular * representations of lie algebras. letters in mathematical physics, 6(5), 395-404. doi:10.1007/BF00419321
  8. 38. Cahen, M., & Gutt, S. (1981). Invariant*-products of holomorphic functions on the hyperbolic hermitian spaces. letters in mathematical physics, 5(3), 219-228. doi:10.1007/BF00420702
  9. 39. Cahen, M., & Gutt, S. (1981). Invariance des équations de Maxwell. Bulletin de la Société mathématique de Belgique. Série A, 33, 91-97.
  10. 40. Cahen, M., & Gutt, S. (1981). Invariant * products of holomorphic functions on the hyperbolic hermitian spaces. letters in mathematical physics, 5, 219-228.
  11. 41. Cahen, M., & Gutt, S. (1980). Maxwell's equations in Segal's model: Solutions and their invariance. letters in mathematical physics, 4(4), 275-287. doi:10.1007/BF00402576
  12. 42. Cahen, M., Gutt, S., & De Wilde, M. (1980). Local cohomology of the algebra of C∞ functions on a connected manifold. letters in mathematical physics, 4(3), 157-167. doi:10.1007/BF00316669
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