\(1^{st}\) announcement for the 2023 Midwestern Workshop on Asymptotic Analysis - October 13 - 15 at #IUPUI . Graduate students and all participants are welcome to contribute a research poster.
Online registration (free!) and schedule of speakers now online at:
http://mwaa.math.iupui.edu/
#NSFfunded #MathConference #ComplexAnalysis #RealAnalysis #Indianapolis
#indianapolis #realanalysis #complexanalysis #mathconference #nsffunded #iupui
\(0^{th}\) announcement (save the date) for the 2023 Midwestern Workshop on Asymptotic Analysis - October 13 - 15 at #IUPUI
Coming soon: web site update with more information and the list of speakers
http://mwaa.math.iupui.edu/
#MathConference #ComplexAnalysis #RealAnalysis #Indianapolis
#indianapolis #realanalysis #complexanalysis #mathconference #iupui
I really only have a cursory understanding of the broad strokes of foundational #mathematics - like I did my undergrad #RealAnalysis and #AbstractAlgebra stint but I didn't get to take #Topology and while the joy of getting to engage with #Mathstodon is so real it just makes me wish I could even figure out how to go to #GraduateSchool because #Algebra gives me so much joy, but I'm pretty sure my grades aren't good enough even if I could #ExecutiveFunction some applications. It hurts.
#mathematics #realanalysis #abstractalgebra #topology #mathstodon #graduateschool #algebra #executivefunction
I always struggle with epsilon-delta style proofs đź’€
what are some things people do to make these more palatable? #calculus #realanalysis
Here is a #math question from a line of my #economics research:
There are functions which are discontinuous everywhere (Dirichlet function) and non-monotonic continuous but non-differentiable everywhere functions (Weierstrass function). Can a monotonic function be continuous but non-differentiable everywhere? Can the Lebesgue integral of a non-negative discontinuous everywhere function yield a continuous but non-differentiable everywhere function?
#measuretheory #realanalysis #MathMonday #economics #math
I would like to study Real Analysis.
Any #book suggestions?
I started studying from the Principles Of Mathematical Analysis by #Rudin in order to move to Real And Complex analysis. From baby to papa, one would say. I am also aware that there exists Introductory Real Analysis by #Kolmogorov, who I've heard was a great Mathematician. Has anyone studied his book?Any thoughts?Which book would be more preferable to follow?
#realanalysis #mathematics #math #kolmogorov #rudin #book
Video lectures for a #RealAnalysis class that I've taught at #UCLA:
Feel free to e-mail me if you are interested in the problem sets and other study materials.
https://youtube.com/playlist?list=PL54Pt_mZzBqjcodJ_GqXxqG1WCCmq433k
@rayhanmomin ah, and I see your at Booth. If you use as your textbook “Tools of the Trade” for beginning #realanalysis you’ll find plenty of folks around Hyde Park that learned from the math pirate himself (Paul Sally)
@rayhanmomin I don’t know about automated grading, but I’m sure you could post here with the assignment, appropriate hashtags eg #realanalysis #homeworkhelp and a content warning (to hide answers). You also might need to check if the posting is within the terms of the copyrighted materials and academic integrity (don’t want to accidentally get anyone else in trouble for copying answers)
For some reason there's a small, almost trivial early result in #RealAnalysis that I really like:
Every bounded infinite collection of rational numbers has an accumulation point.
Is there a similar, simple, elegant result that you like?