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  • 11 votes cast
Jun
23
awarded  Nice Question
Mar
21
awarded  Yearling
Nov
1
awarded  Popular Question
Sep
15
awarded  Popular Question
Jul
2
awarded  Curious
Feb
3
awarded  Popular Question
Feb
22
revised What is the norm of the operator $\phi: L^3[-2,2] \to \mathbb{C}$ defined by $ \phi(f)=\int_{0}^{1}e^xf(x-1)dx$?
added 790 characters in body
Feb
21
accepted Inequality relating diameter of the image of a holomorphic function on the unit disk to the derivative at 0.
Feb
21
asked Inequality relating diameter of the image of a holomorphic function on the unit disk to the derivative at 0.
Feb
20
accepted Example demonstrating that $R=\{a+bi\sqrt5: a,b \in \mathbb{Z}\}$ is not a Euclidean domain.
Feb
20
accepted An example of an infinite non-abelian solvable group
Feb
20
accepted Ring of rational numbers with odd denominator
Feb
20
asked Example demonstrating that $R=\{a+bi\sqrt5: a,b \in \mathbb{Z}\}$ is not a Euclidean domain.
Feb
19
accepted What is the norm of the operator $\phi: L^3[-2,2] \to \mathbb{C}$ defined by $ \phi(f)=\int_{0}^{1}e^xf(x-1)dx$?
Feb
19
asked What is the norm of the operator $\phi: L^3[-2,2] \to \mathbb{C}$ defined by $ \phi(f)=\int_{0}^{1}e^xf(x-1)dx$?
Feb
14
accepted Showing this integral from complex analysis is an integer without residues
Feb
13
revised Showing this integral from complex analysis is an integer without residues
added 8 characters in body
Feb
13
comment Showing this integral from complex analysis is an integer without residues
I see now that I made a mistake in my original post. I'll correct it.
Feb
13
asked Showing this integral from complex analysis is an integer without residues
Feb
8
accepted Ring of dyadic rationals