Suppose $A$ is a non-trivial linear operator acting upon infinity dimensional vector space. Say given $A^2$=0 and provide that $A$ is hermitian. Is this sufficient to conclude $A$ is non nilpotent? I could not come up with counter example so far.
2026-03-26 12:52:57.1774529577
About hermiticity implying non-nilpotency for infinite dimensional vector space(Corrected)
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