On the direct sum of two bounded linear operators and subspace-hypercyclicity
classification
🧮 math.FA
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subspace-hypercycliccriterionoperatorshypercyclicsatisfiesthendirectoplus
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In this paper, we show that if the direct sum of two operators is subspace-hypercyclic (satisfies subspace hypercyclic criterion), then both operators are subspace-hypercyclic (satisfy subspace hypercyclic criterion). Moreover, if an operator $T$ satisfies subspace-hypercyclic criterion, then so $T\oplus T$ does. Also, we obtain that under certain conditions, if $T\oplus T$ is hypercyclic then $T$ satisfies subspace-hypercyclic criterion and, the subspace-hypercyclic operators satisfy subspace-hypercyclic criterion which gives the "subspace-hypercyclic" analogue of Theorem 2.3. (in Hereditarily hypercyclic operators, J. Funct. Anal., 167:94--112, 1999 by P. B\'es and A. Peris).
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