Characters of superconformal algebra and mock theta functions

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imported>Pythagoras0님의 2013년 8월 5일 (월) 05:53 판
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introduction

$\mathcal{N}=4$ superconformal algebra

$c=6k$ with $k=1$ case

  • non-BPS characters : $h>k/4,\ell=1/2$

$$ \operatorname{ch}^{\tilde R}_{h=1/4+n,\ell=0} $$

  • BPS characters : $h=1/4,\ell=0,1/2$

$$ \operatorname{ch}^{\tilde R}_{h=1/4,\ell=0}=\frac{[\theta_{11}(z;\tau)]^2}{\eta^3}\mu(z;\tau)\\ \operatorname{ch}^{\tilde R}_{h=1/4,\ell=1/2} $$ where $\mu(z;\tau)$ is the Appell-Lerch sums which is a holomorphic part of a mock modular form


$k\geq 2$ case

  • this is related to Umbral moonshine and elliptic genus of hyperKahler manifolds of complex dimension $2k$




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