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an Entity in Data Space: dbkwik.org

The hyperlicious function is defined as * \(h_x(a,b) = ext{hyper}(a,x + 2,b)\), * \(h_x(a,b,c,\ldots,m,n,1) = h_x(a,b,c,\ldots,n)\), and * \(h_x(a,b,c,\ldots,m,n) = h_{h_x(a,b,c,\ldots,m - 1)}(a,b,c,\ldots,m)\).

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