In mathematics, the Opial property is an abstract property of Banach spaces that plays an important role in the study of weak convergence of iterates of mappings of Banach spaces, and of the asymptotic behavior of nonlinear semigroups. The property is named after the Polish mathematician Zdzisà Âaw Opial.
Let (X, || ||) be a Banach space. X is said to have the Opial property if, whenever (x<sub>n</sub>)<sub>n∈N</sub> is a sequence in X converging weakly to some x<sub>0</sub> ∈ X and x ≠ x<sub>0</sub>, it follows that
Alternatively, using the contrapositive, this condition may be written as
If X is the continuous dual space of some other Banach space Y, then X is said to have the weak-∗ Opial property if, whenever (x<sub>n</sub>)<sub>n∈N</sub> is a sequence in X converging weakly-∗ to some x<sub>0</sub> ∈ X and x ≠ x<sub>0</sub>, it follows that
or, as above,
A (dual) Banach space X is said to have the uniform (weak-∗) Opial property if, for every c > 0, there exists an r > 0 such that
for every x ∈ X with ||x|| ≥ c and every sequence (x<sub>n</sub>)<sub>n∈N</sub> in X converging weakly (weakly-âÂÂ) to 0 and with