possibly

[$≠$ eventually; see also: perhaps, conceivably]

The only points $(z,w)$ at which the continuity of $g$ is possibly in doubt have $z=0$.

Clearly, $F$ is invertible except possibly on an at most countable set.

We define a (possibly unbounded) operator $A$ by ......

Although individually these systems can still be quite complicated, a possibly more tractable task is to describe their possible joint distributions.

This yields (5) again (possibly with a different $C$).

We say that $L$ is finitely aligned if $A(L)$ is finite (possibly empty).

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