The subject has received later contributions at the hands of Weierstrass, Kronecker(Crelle, 101), and Méray.
Numerous mathematicians were born in Germany, including Carl Friedrich Gauss, David Hilbert, Bernhard Riemann, Gottfried Leibniz,
Karl Weierstrass, Hermann Weyl, Felix Klein and Emmy Noether.
Weierstrass's method has been completely set
forth by SalvatorePincherle in 1880,[27] and Dedekind's has received additional prominence through the author's later work(1888) and the endorsement by PaulTannery(1894).
Weierstrass's method has been completely set
forth by Salvatore Pincherle in 1880, and Dedekind's has received additional prominence through the author's later work(1888) and the endorsement by Paul Tannery 1894.
Weierstrass, Cantor, and Heine base their theories on infinite series,
while Dedekind founds his on the idea of a cut(Schnitt) in the system of real numbers, separating all rational numbers into two groups having certain characteristic properties.
Weierstrass, Cantor, and Heine based their theories on infinite series,
while Dedekind founded his on the idea of a cut(Schnitt) in the system of real numbers, separating all rational numbers into two groups having certain characteristic properties.