Abstract
This short note argues that the Cantorian space E (∞) , with its effective invariant Hausdorff dimension d h =4, can be thought of in terms of a knot complement, K c . We show, for a specific knot K, that the hyperbolic volume for the three manifold K c = R 3− K is V ( K c ) sime; V ( S (4) ) , where S (4) is a three sphere in R 4.
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