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1908.]

The conformal transformations of a space of four dimensions.

81

The differential equation thus reduces to

{\begin{array}{cl}{\frac {d^{2}P}{dz^{2}}}&+\left({\frac {1-\alpha -\alpha '}{z-a}}+{\frac {1-\beta -\beta '}{z-b}}+{\frac {1-\gamma -\gamma '}{z-c}}\right){\frac {dP}{dz}}\\\\&+\left[{\frac {\alpha \alpha '(a-b)(a-c)}{z-a}}+{\frac {\beta \beta '(b-a)(b-c)}{z-b}}+{\frac {\gamma \gamma '(c-a)(c-b)}{z-c}}+\right]\times {\frac {P}{(z-a)(z-b)(z-c)}}=0.\end{array}}

This is Papperitz's form^[1] of the differential equation satisfied by Riemann's general hypergeometric function^[2]

P\ \left\{{\begin{array}{ccccccc}a&&b&&c\\\\\alpha &&\beta &&\gamma &&z\\\\\alpha '&&\beta '&&\gamma '\end{array}}\right\}

;

hence we have the result that

U=l^{-\alpha }\lambda ^{-\alpha '}m^{-\beta }\mu ^{-\beta '}n^{-\gamma }\nu ^{-\gamma '}P\ \left\{{\begin{array}{ccccccc}a&&b&&c\\\\\alpha &&\beta &&\gamma &&z\\\\\alpha '&&\beta '&&\gamma '\end{array}}\right\}

is a homogeneous function of (l, m, n, λ, μ, ν) of degree -1, satisfying the equation

{\frac {\partial ^{2}U}{\partial l\partial \lambda }}+{\frac {\partial ^{2}U}{\partial m\partial \mu }}+{\frac {\partial ^{2}U}{\partial n\partial \nu }}=0.

When expressed in terms of x, y, z and w, it will thus be a solution of the equation

{\frac {\partial ^{2}U}{\partial x^{2}}}+{\frac {\partial ^{2}U}{\partial y^{2}}}+{\frac {\partial ^{2}U}{\partial z^{2}}}+{\frac {\partial ^{2}U}{\partial w^{2}}}=0.

The various transformations^[3] of the general hypergeometric function are easily obtained from this result. If we write U in the form

U=l^{-\alpha -\theta }\lambda ^{-\alpha '-\theta }m^{-\beta -\phi }\mu ^{-\beta '-\phi }n^{-\gamma -\psi }\nu ^{-\gamma '-\psi }(l\lambda )^{\theta }(m\mu )^{\phi }(n\nu )^{\psi }P\ \left\{{\begin{array}{ccccccc}a&&b&&c\\\\\alpha &&\beta &&\gamma &&z\\\\\alpha '&&\beta '&&\gamma '\end{array}}\right\},

↑ Mathematische Annalen, T. XXV. (1885), p. 213.
↑ Abhandlungen d. K. Gesell. d. Wissenschaften zu Göttingen, Band VII. (1857), Gesammelte Werke, p. 63.
↑ See Whittaker's Analysis, p. 240. Forsyth's Theory of Linear Differential Equations, Vol. IV., p. 135.

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