[see also: constraint, limitation, restraint]
Theorem 7 imposes a quantitative restriction on the location of the zeros of ......
However, if $B$ were omitted in (1), the case $n=0$ would imply $Nf=1$, an undesirable restriction.
Some restrictions must be placed on the behaviour of $f$.
When $A$ is the order complex of a poset, there are further restrictions on the $h$-vector of $A$.
This theorem removes the restriction to convex regions which was imposed in Theorem 8.
All our estimates hold without this restriction.
The location of the zeros of a holomorphic function in a region $\Omega$ is subject to no restriction except the obvious one concerning the absence of limit points in $\Omega$.
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