Large values of modular forms
classification
🧮 math.NT
math.RT
keywords
formslargemodulararbitraryconjecturedisprovefolkloreholomorphic
read the original abstract
We show that there are primitive holomorphic modular forms f of weight two and arbitrary large level N such that $|f(z)| \gg N^{1/4}$ for some point z. Thereby we disprove a folklore conjecture that the sup-norm of such forms would be as small as $N^{o(1)}$.
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