I know for linear operator $T$ on finite dimensional space $V$ such that $T^2=T$, we have $V=R(T)\oplus N(T)$, but does the result hold true for infinite dimensional spaces also? I tried to find counterexample but couldn't find. Any hint will be helpful.
2026-03-29 05:11:34.1774761094
Direct sum of infinite dimensional vector space for idempotent operator
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