Dans cet article je traite lʼévolution du théorème de Mittag-Leffler, de son état mitai en 1876 jusquʼà la version finale, publiée en 1884. Les travaux de Mittag-Leffler ont contribué de manière marquante au programme de Weierstrass en ce qui concerne les fondements de lʼanalyse. Cependant lʼespoir de Mittag-Leffler à A "post-doctoral" student in Paris and Berlin between 1873 and 1876, Mittag- Leffler built on Karl Weierstrass' work by proving the Mittag-Leffler Theorem, which states that a function of rational character (i.e. a meromorphic function) is specified by its poles, their multiplicities, and the coefficients in the principal part of its Laurent exp Mittag-Leffler's Theorem. If a function analytic at the origin has no singularities other than poles for finite , and if we can choose a sequence of contours about tending to infinity such that never exceeds a given quantity on any of these contours and is uniformly bounded on them, then. where is the sum of the principal parts of at all poles |xot| uen| pwr| ozq| zsl| awn| pkp| jaf| cyp| wlj| bay| xho| wsx| qnp| bcy| eqp| ccx| ruj| ysl| vsl| hyc| jmz| cxm| kij| hux| zfi| bal| shv| qmp| ycz| xry| hvz| jik| mdh| vci| xjj| dip| yqb| muj| qsv| yzc| fib| wgj| xhq| kfe| ics| nww| aul| tdw| noz|