1908.]
The conformal transformations of a space of four dimensions.
79
where P is a function of the ratio of any two of the quantities lλ, mμ, nν. The quantity U will then be a solution of the equation
 .
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if the relation
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is satisfied, for it will then be a homogeneous function of degree -1 in (l, m, n, λ, μ, ν).
Let us put
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where a, b and c are arbitrary constants. The relation
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is then satisfied, and P becomes a function of z alone. We may thus write
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the particular functional form in terms of ξ, η, ζ being chosen to facilitate the calculations. H is clearly a homogeneous function of degree zero in ξ, η, ζ and therefore in l, m, n, λ, μ, ν.
On differentiating equation (1), we obtain
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The differential equation
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will thus be satisfied, if
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