%0 Journal Article %1 Murthy2009Farey %A Murthy, Sameer %A Pioline, Boris %D 2009 %K dyon-pf, farey-tail, stringthy-blackholes %T A Farey tale for N=4 dyons %U http://arxiv.org/abs/0904.4253 %X We study exponentially suppressed contributions to the degeneracies of extremal black holes. Within Sen's quantum entropy function framework and focusing on extremal black holes with an intermediate AdS3 region, we identify an infinite family of semi-classical AdS2 geometries which can contribute effects of order exp(S\_0/c), where S\_0 is the Bekenstein-Hawking-Wald entropy and c is an integer greater than one. These solutions lift to the extremal limit of the SL(2,Z) family of BTZ black holes familiar from the "black hole Farey tail". We test this understanding in N=4 string vacua, where exact dyon degeneracies are known to be given by Fourier coefficients of Siegel modular forms. We relate the sum over poles in the Siegel upper half plane to the Farey tail expansion, and derive a "Farey tale" expansion for the dyon partition function. Mathematically, this provides a (formal) lift from Hilbert modular forms to Siegel modular forms with a pole at the diagonal divisor.

@article{Murthy2009Farey, abstract = {{We study exponentially suppressed contributions to the degeneracies of extremal black holes. Within Sen's quantum entropy function framework and focusing on extremal black holes with an intermediate AdS3 region, we identify an infinite family of semi-classical AdS2 geometries which can contribute effects of order exp(S\_0/c), where S\_0 is the Bekenstein-Hawking-Wald entropy and c is an integer greater than one. These solutions lift to the extremal limit of the SL(2,Z) family of BTZ black holes familiar from the "black hole Farey tail". We test this understanding in N=4 string vacua, where exact dyon degeneracies are known to be given by Fourier coefficients of Siegel modular forms. We relate the sum over poles in the Siegel upper half plane to the Farey tail expansion, and derive a "Farey tale" expansion for the dyon partition function. Mathematically, this provides a (formal) lift from Hilbert modular forms to Siegel modular forms with a pole at the diagonal divisor.}}, added-at = {2019-02-26T10:37:35.000+0100}, archiveprefix = {arXiv}, author = {Murthy, Sameer and Pioline, Boris}, biburl = {https://www.bibsonomy.org/bibtex/29c3e73dc05f40aef95c0eb005e2f2cfe/acastro}, citeulike-article-id = {7432579}, citeulike-linkout-0 = {http://arxiv.org/abs/0904.4253}, citeulike-linkout-1 = {http://arxiv.org/pdf/0904.4253}, day = 28, eprint = {0904.4253}, interhash = {ae112e138cb2319b31bf173436e87b6d}, intrahash = {9c3e73dc05f40aef95c0eb005e2f2cfe}, keywords = {dyon-pf, farey-tail, stringthy-blackholes}, month = apr, posted-at = {2010-07-09 14:58:07}, priority = {2}, timestamp = {2019-02-26T10:37:35.000+0100}, title = {{A Farey tale for N=4 dyons}}, url = {http://arxiv.org/abs/0904.4253}, year = 2009 }