Statement from Cowen and Gallardo

4 February 2013

On 10 December 2012, we submitted a paper “Rota’s Universal Operators and Invariant Subspaces in Hilbert Spaces” for publication, and we spoke about it several times before the more formal announcement at the RSME meeting in Santiago de Compostela on 25 January 2013. By that time, the paper had been read and no problems found by several other mathematicians. We have heard nothing so far from the journal to which it was submitted.

We regret to inform you, however, that a gap in our proof was discovered after the announcement at Santiago. After working for the past few days to bridge the gap, so far unsuccessfully, we are today formally withdrawing our submission to the journal.

We will, of course, continue to work to bridge the gap. At this point, Carl plans to contribute a talk to the Southeast Analysis Meeting (SEAM) to be held at Blacksburg, Virginia on 15, 16 March 2013 with the title as above.

So far at least, there have been no errors found in the paper besides the erroneous assertion that the work included in the paper proved the
Invariant Subspace Theorem, while in fact it did not. For this reason, we plan to submit a paper by mid-March, either a paper that claims to prove the Invariant Subspace Theorem if we can bridge the gap or a paper substantially the same as the paper submitted earlier, but without claims beyond what we have actually proved correct. In the latter case, the manuscript will be made available to those interested about that time. If we believe we have proved the result, no submission, no announcement, and no manuscript will be made available until after the new manuscript has been reviewed by several mathematicians.

Carl Cowen and Eva Gallardo Gutierrez

Acerca de Miguel Lacruz

Gijón, Asturias, España, 1963
Esta entrada fue publicada en Research. Guarda el enlace permanente.

4 respuestas a Statement from Cowen and Gallardo

  1. Pingback: Encontrado un error en el trabajo de Carl Cowen y Eva Gallardo sobre el problema del subespacio invariante - Gaussianos

  2. Pingback: Una pena, pero el problema del subespacio invariante sigue abierto « Francis (th)E mule Science's News

  3. Pingback: So what was Dr. Blind’s question, then? « Since it is not …

  4. Pingback: Francis en ¡Eureka!: Las matemáticas también son protagonistas de las noticias « Francis (th)E mule Science's News


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