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Author Archives: Persiflage
The Modular Forms Database is Annoying
It used to be the case, 10 or so years ago, that William Stein maintained a website with extensive tables of \(q\)-expansions of modular forms, computed using magma. However, as the edifice of civilization begins to crumble, this website no … Continue reading
Mysterious Formulae
I’m not one of those mathematicians who is in love with abstraction for its own sake (not that there’s anything wrong with that). I can still be seduced by an explicit example, or even — quell horreur — a definite … Continue reading
Posted in Mathematics
Tagged Ben Howard, Brunier, Chowla-Selberg, Dick Gross, Faltings Height, Kudla, MSRI, Mysterious Formulae, Rapoport, Tonghai Yang, Zagier
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In Brief
The start of the academic year has a habit of bringing forth distractions, not least of all to someone as disorganized as me. So here are a few remarks in brief. The class number of \(\mathbf{Q}(\zeta_{151})^{+}\) is one. John Miller, … Continue reading
Posted in Art, Mathematics, Waffle
Tagged 2048, 256, Class Numbers, Iwaniec, John Miller, Matisse, MoMA, Schoof, Stickelberger's Theorem
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iTunes top Ten
tl;dr: lots of Bach, if you’re not into that sort of thing, at least check out Mel Brooks. And if you’re not into that *either*, well then I don’t know what’s wrong with you. Following Jordan, here is a list … Continue reading
Posted in Music
Tagged Art of Fugue, Bach, Byrd, Cello Suites, iTunes, Musical Offering, Patrick Emerton, Satie, Schubert
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Applying for an NSF grant
It’s not easy to write a good grant proposal. But it can be even harder to write one for the first time, especially if you’re not quite sure who will be reading your proposal. So today, I want to say … Continue reading
The nearly ordinary deformation ring is (usually) torsion over weight space
Let \(F/{\mathbf{Q}}\) be an arbitrary number field. Let \(p\) be a prime which splits completely in \(F\), and consider an absolutely irreducible representation: \(\rho: G_{F} \rightarrow {\mathrm{GL}}_2({\overline{\mathbf{Q}}}_p)\) which is unramified outside finitely many primes. If one assumes that \(\rho\) is … Continue reading
Tricky Fingers
How is one supposed to play this exactly? One can neither can play a 14th in the right hand (my hands are not that big) nor play legato parallel 10ths in the left; hence some sort of arpeggiation is required. … Continue reading
The Artin conjecture is rubbish
Let \(\rho: G_{\mathbf{Q}} \rightarrow \mathrm{GL}_N(\mathbf{C})\) be a continuous irreducible representation. Artin conjectured that the L-function \(L(\rho,s)\) is analytically continues to an entire function on \(\mathbf{C}\) (except for the trivial representation where the is a simple pole at one) and satisfies … Continue reading
Posted in Mathematics
Tagged Andrew Booker, Artin, Cebotarev Density Theorem, Class Number Problem, Dick Gross, Goldfeld, GRH, Jo Dwyer, Langlands, Rubbish, Springer, Stark, Zagier
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K_2(O_F) for number fields F
Belabas and Gangl have a nice paper ( Generators and relations for \(K_2({\mathcal{O}}_F)\), which can be found here) where they compute \(K_2({\mathcal{O}}_E)\) for a large number of quadratic fields \(E\). There main result is a method for proving upper bounds … Continue reading
Posted in Mathematics
Tagged Alexander Rahm, Aurel Page, Banaszak, Belabas, Bloch, Borel, Brownkin, Chern class map, Euler System, Gangl, Higher Regulators, Hutchinson, K-theory, magma, pari, Popescu, Soule, Stark, Tricky Computation, Zagier
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Intermezzo
Scholze is giving a course at Berkeley! Follow Jared Weinstein’s lecture notes from the course here. I believe that the lectures are also being recorded and will be available approximately one week after each lecture; I will add a link … Continue reading
Posted in Waffle
Tagged Bourbaki, Chablis, Colloquia, Gowers, Jared Weinstein, Peter Scholze, Sowa, Suslin
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