International Journal of Mathematics and Mathematical Sciences (Jan 2005)

Gleason-kahane-Żelazko theorem for spectrally bounded algebra

  • S. H. Kulkarni,
  • D. Sukumar

DOI
https://doi.org/10.1155/IJMMS.2005.2447
Journal volume & issue
Vol. 2005, no. 15
pp. 2447 – 2460

Abstract

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We prove by elementary methods the following generalization of a theorem due to Gleason, Kahane, and Żelazko. Let A be a real algebra with unit 1 such that the spectrum of every element in A is bounded and let φ:A→ℂ be a linear map such that φ(1)=1 and (φ(a))2+(φ(b))2≠0 for all a, b in A satisfying ab=ba and a2+b2 is invertible. Then φ(ab)=φ(a)φ(b) for all a, b in A. Similar results are proved for real and complex algebras using Ransford's concept of generalized spectrum. With these ideas, a sufficient condition for a linear transformation to be multiplicative is established in terms of generalized spectrum.