A note on ANR's
Abstract
It is shown that if for a complete metric space (X,d) there is a constant ε > 0 such that the intersection j=1n Bd(xj,rj) of open balls is nonempty for every finite system x1,...,xn ∈ X of centers and a corresponding system of radii r1,...,rn > 0 such that d(xj,xk) ≤sl ε and d(xj,xk) < rj + rk (j,k = 1,...,n), then X is an ANR; and if in the above one may put ε = ∞, the space X is an AR. A certain criterion for an incomplete metric space to be an A(N)R is presented.
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