Document JFM 25.1095.01

Sulle singolarità della Jacobiana di tre curve piane. (Italian) JFM 25.1095.01

Palermo Rend. VIII, 1-24 (1894).

Es werden die Bedingungen aufgestellt, unter welchen ein \(r_1\)-, \(r_2\)-, \(r_3\)-facher Punkt dreier Curven ein \((R+1)\)- oder \((R+2)\)-facher Punkt ihrer Jacobi’schen Curve ist, wo \(R=r_1+r_2+r_3-2\). Die erhaltenen Resultate werden insbesondere auf den Fall \(r_1=r_2=r_3=1\) angewandt.

Reviewer: Vivanti, Prof. (Messina)

Cited in 3 Documents

JFM Section:

Neunter Abschnitt. Analytische Geometrie. Capitel 2. Analytische Geometrie der Ebene. B. Theorie der algebraischen Curven.

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[1]	Vedi questiRendiconti, t. VII, pag. 193–255.
[2]	Questa Nota è, con qualche aggiunta, la riproduzione di un’altra litografata nel settembre passato.

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