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visits member for 2 years, 8 months
seen Mar 10 at 4:58

Jul
2
awarded  Curious
Apr
9
awarded  Popular Question
Oct
6
awarded  Yearling
Dec
7
revised Suppose that $f(z)$ is meromorphic on a disk, show that negative powers in the Laurent series of $f(z)$ is the sum of the principal parts of its poles
edited title
Dec
7
asked Suppose that $f(z)$ is meromorphic on a disk, show that negative powers in the Laurent series of $f(z)$ is the sum of the principal parts of its poles
Nov
26
accepted Show that the series representation of the Bessel function works
Nov
26
comment Show that the series representation of the Bessel function works
Ohh I see you changed the sum for w a little bit to get the $z^{n+2j−2}$ contribution. Got it. Thanks so much!!
Nov
26
comment Show that the series representation of the Bessel function works
Just a quick clarification - how did you get the contribution from w to not contain z? Thanks in advance!
Nov
26
revised Show that the series representation of the Bessel function works
added 7 characters in body
Nov
26
revised Show that the series representation of the Bessel function works
added 17 characters in body
Nov
26
accepted If $(a_n)_n$ is bounded, then $\sum\limits_n a_{n}n^{-z}$ converges uniformly for $\Re z \geq 1+\epsilon$
Nov
26
asked Show that the series representation of the Bessel function works
Nov
8
accepted Show that $\sum \frac{z^k}{k}$ does not converge uniformly for |z|<1
Nov
8
asked If $(a_n)_n$ is bounded, then $\sum\limits_n a_{n}n^{-z}$ converges uniformly for $\Re z \geq 1+\epsilon$
Nov
8
asked Show that $\sum \frac{z^k}{k}$ does not converge uniformly for |z|<1
Jun
7
accepted Is the integral $\int_1^\infty\frac{x^{-a} - x^{-b}}{\log(x)}\,dx$ convergent?
Jun
6
revised Is the integral $\int_1^\infty\frac{x^{-a} - x^{-b}}{\log(x)}\,dx$ convergent?
added 9 characters in body
Jun
6
asked Is the integral $\int_1^\infty\frac{x^{-a} - x^{-b}}{\log(x)}\,dx$ convergent?
May
16
accepted If the closures of two subsets of a topological space are equal, are the closures of the images of the two subsets under a continuous map also equal?
May
16
asked If the closures of two subsets of a topological space are equal, are the closures of the images of the two subsets under a continuous map also equal?