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Title of Journal: Nuov Cim B

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Abbravation: Il Nuovo Cimento B (1971-1996)

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Società Italiana di Fisica

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1826-9877

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The algebra of bounded additive operators on a com

Authors: C S Sharma
Publish Date: 2007/10/16
Volume: 100, Issue: 2, Pages: 291-295
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Abstract

It is proved that the algebra of bounded additive operators on a complex Hilbert space is the smallest algebra a vector space in which a ring structure is defined on the set of vectors containing both linear and antilinear bounded operators on the complex Hilbert space It is proved further that this algebra is normed and involutive

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  2. Maximal acceleration and the time-energy uncertainty relation
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  7. Machian solution with matter injection in cosmology
  8. A note on a quantum-mechanical harmonic oscillator in a space of constant curvature
  9. The gyrofrequency of a charged particle in a constant electromagnetic field. II.—The general result
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  11. Electromagnetic potential vectors and spontaneous symmetry breaking
  12. Triplet correlations in model liquids
  13. Gravitational-wave tail in Einstein’s linear theory
  14. On the hypothesis that quantum mechanics has a nonlocal structure
  15. A deterministic representation of plane-wave interference
  16. The reconstruction theorem with external sources
  17. Nonabsorption resonances by nonlinear coherent effects in a three-level system
  18. Solution with third-order accuracy for the electron distribution function in weakly ionized gases and intrinsic semiconductors
  19. Probable observation of «excitonic» superconductivity in formvar-aluminum sandwiches
  20. Existence and stability criteria for circular geodesics in the vicinity of a Reissner-Nordström black hole
  21. High-resolution spectroscopy in the far ultraviolet
  22. A theoretical analysis on vibrational-energy transfers in gases
  23. A new calculation of atmospheric neutrino flux
  24. Four-dimensional symmetry from a broad viewpoint
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  27. Rotationally symmetric clusters with zero net angular momentum
  28. On exact canonical momenta of collective motion in a many-boson system
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