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This must come from the name Weierstrass normal form given to the elliptic integrals $$ \int\frac{ds}{\sqrt{4s^3-g_2s-g_3}},\quad \int\frac{s\,ds}{\sqrt{4s^3-g_2s-g_3}},\quad \int\frac{ds}{(s-\alpha)\sqrt{4s^3-g_2s-g_3}} $$ in Klein (1885, pp. 454–459), Enneper-Müller (1890, pp. 26–30, 222), Burkhardt (1899, p. 161), Kohn-Loria (1909, p. 480), Fricke (1913, pp. 253, 294, 297), etc.

(First publication of the normal form itself was by Weierstrass’ students: Biermann (1865, pp. 5–10), Müller (1867, pp. 1, 19), Schwering (1869, p. 9), Kiepert (1870, p. 7), Schwarz (1871, pp. 78, 102), Weierstrass-Schwarz (1885, pp. 2, 12, 31, 61, 68, 86).)

This must come from the name Weierstrass normal form given to the elliptic integrals $$ \int\frac{ds}{\sqrt{4s^3-g_2s-g_3}},\quad \int\frac{s\,ds}{\sqrt{4s^3-g_2s-g_3}},\quad \int\frac{ds}{(s-\alpha)\sqrt{4s^3-g_2s-g_3}} $$ in e.g. Klein (1885, pp. 454–459), Enneper-Müller (1890, pp. 26–30, 222), Burkhardt (1899, p. 161), Hensel-Landsberg (1902, p. 650), Kohn-Loria (1909, p. 480), Fricke (1913, pp. 253, 294, 297), etc.

(First publication of the normal form itself was by Weierstrass’ students: Biermann (1865, pp. 5–10), Müller (1867, pp. 1, 19), Schwering (1869, p. 9), Kiepert (1870, p. 7), Schwarz (1871, pp. 78, 102), Weierstrass-Schwarz (1885, pp. 2, 12, 31, 61, 68, 86).)

This must come from the name Weierstrass normal form given to the elliptic integrals $$ \int\frac{ds}{\sqrt{4s^3-g_2s-g_3}},\quad \int\frac{s\,ds}{\sqrt{4s^3-g_2s-g_3}},\quad \int\frac{ds}{(s-\alpha)\sqrt{4s^3-g_2s-g_3}} $$ in Weierstrass-Schwarz (1885: see pp. 2, 12, 31, 61, 68, 86), Klein (1885, pp. 454–459), Enneper-Müller (1890, pp. 26–30, 222), Burkhardt (1899, p. 161), Kohn-Loria (1909, p. 480), Fricke (1913, pp. 253, 294, 297), etc.

(First publication of the normal form itself was by Weierstrass’ students: Biermann (1865, pp. 5–10), Müller (1867, pp. 1, 19), Schwering (1869, p. 9), Kiepert (1870, p. 7), Schwarz (1871, pp. 78, 102).)

This must come from the name Weierstrass normal form given to the elliptic integrals $$ \int\frac{ds}{\sqrt{4s^3-g_2s-g_3}},\quad \int\frac{s\,ds}{\sqrt{4s^3-g_2s-g_3}},\quad \int\frac{ds}{(s-\alpha)\sqrt{4s^3-g_2s-g_3}} $$ in Klein (1885, pp. 454–459), Enneper-Müller (1890, pp. 26–30, 222), Burkhardt (1899, p. 161), Kohn-Loria (1909, p. 480), Fricke (1913, pp. 253, 294, 297), etc.

(First publication of the normal form itself was by Weierstrass’ students: Biermann (1865, pp. 5–10), Müller (1867, pp. 1, 19), Schwering (1869, p. 9), Kiepert (1870, p. 7), Schwarz (1871, pp. 78, 102), Weierstrass-Schwarz (1885, pp. 2, 12, 31, 61, 68, 86).)

This must come from the name Weierstrass normal form given to the elliptic integrals $$ \int\frac{ds}{\sqrt{4s^3-g_2s-g_3}},\quad \int\frac{s\,ds}{\sqrt{4s^3-g_2s-g_3}},\quad \int\frac{ds}{(s-\alpha)\sqrt{4s^3-g_2s-g_3}} $$ in Weierstrass-Schwarz (1885, p. 86), Klein (1885, pp. 454–459), Enneper-Müller (1890, pp. 26–30, 222), Burkhardt (1899, p. 161), Kohn-Loria (1909, p. 480), Fricke (1913, pp. 253, 294, 297), etc.

(First publication of the normal form itself was by Weierstrass’ students: Biermann (1865, pp. 5–10), Müller (1867, pp. 1, 19), Schwering (1869, p. 9), Kiepert (1870, p. 7), Schwarz (1871, pp. 78, 102).)

This must come from the name Weierstrass normal form given to the elliptic integrals $$ \int\frac{ds}{\sqrt{4s^3-g_2s-g_3}},\quad \int\frac{s\,ds}{\sqrt{4s^3-g_2s-g_3}},\quad \int\frac{ds}{(s-\alpha)\sqrt{4s^3-g_2s-g_3}} $$ in Weierstrass-Schwarz (1885: see pp. 2, 12, 31, 61, 68, 86), Klein (1885, pp. 454–459), Enneper-Müller (1890, pp. 26–30, 222), Burkhardt (1899, p. 161), Kohn-Loria (1909, p. 480), Fricke (1913, pp. 253, 294, 297), etc.

(First publication of the normal form itself was by Weierstrass’ students: Biermann (1865, pp. 5–10), Müller (1867, pp. 1, 19), Schwering (1869, p. 9), Kiepert (1870, p. 7), Schwarz (1871, pp. 78, 102).)