A conjectured class of scale-invariant distances on inner product spaces
Abstract
Let V be an inner product space, and x, y ∈ V; the conjecture is made that, for any p ∈ [1, ∞], the function dp(x, y):=\|x-y\|/(\|x\|p+ \|y\|p)1/p is a distance on V.
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