[1] |
KHARCHEV S, LEBEDEV D. Integral representation for the eigenfunctions of a quantum periodic Toda chain[J]. Letters in Mathematical Physics, 1999, 50(1): 53-77.
|
[2] |
FRANCO S, HATSUDA Y, MARIO M. Exact quantization conditions for cluster integrable systems[J]. Journal of Statistical Mechanics: Theory and Experiment, 2016, 2016(6): 063107.
|
[3] |
HATSUDA Y, MARINO M. Exact quantization conditions for the relativistic Toda lattice[J]. Journal of High Energy Physics, 2016, 2016(5): 133.
|
[4] |
SCIARAPPA A. Exact relativistic Toda chain eigenfunctions from separation of variables and gauge theory[J]. Journal of High Energy Physics, 2017, 2017(10): 116.
|
[5] |
KASHANI-POOR A K. Quantization condition from exact WKB for difference equations[J]. Journal of High Energy Physics, 2016, 2016(6): 180.
|
[6] |
MARINO M, ZAKANY S. Exact eigenfunctions and the open topological string[J]. Journal of Physics A: Mathematical and Theoretical, 2017, 50(32): 325401.
|
[7] |
MARINO M, ZAKANY S. Wavefunctions, integrability, and open strings[DB/OL]. arXiv.org: arXiv 1706.07402, 2017.
|
[8] |
FADDEEV L D. Modular double of the quantum group SLq (2, R)[C]// Lie Theory and Its Applications in Physics. Berlin: Springer, 2014: 21-31.
|
[9] |
GRASSiA, HATSUDA Y, MARINO M. Topological strings from quantum mechanics[DB/OL]. arXiv.org: arXiv 1410.3382, 2014.
|
[10] |
WANG Xin, ZHANG Guojun, HUANG Minxin. New exact quantization condition for toric Calabi-Yau geometries[J]. Physical Review Letters, 2015, 115(12): 121601.
|
[11] |
KHARCHEV S, LEBEDEV D, SEMENOV-TIAN-SHANSKY M. Unitary representations of Uq(sl(2; R)), the modular double, and the multiparticle q-deformed Toda chains[J]. Communications in Mathematical Physics, 2002, 225(3): 573-609.
|
[12] |
BULLIMORE M, KIM H C. The superconformal index of the (2, 0) theory with defects[J]. Journal of High Energy Physics, 2015, 2015(5): 48.
|
[13] |
FADDEEV L D, KASHAEV R M. Quantum dilogarithm[C]// Fifty Years of Mathematical Physics: Selected Works of Ludwig Faddeev. Singapore: World Scientific, 2016: 502-509.
|
[14] |
BARNES E W. The theory of the double gamma function[J]. Philosophical Transactions of the Royal Society of London, Series A, 1901, 196: 265-387.
|
[15] |
BARNES E W. On the theory of multiple gamma function[J].Trans Cambridge Phil Soc, 1904, 19: 374-425.
|
[1] |
KHARCHEV S, LEBEDEV D. Integral representation for the eigenfunctions of a quantum periodic Toda chain[J]. Letters in Mathematical Physics, 1999, 50(1): 53-77.
|
[2] |
FRANCO S, HATSUDA Y, MARIO M. Exact quantization conditions for cluster integrable systems[J]. Journal of Statistical Mechanics: Theory and Experiment, 2016, 2016(6): 063107.
|
[3] |
HATSUDA Y, MARINO M. Exact quantization conditions for the relativistic Toda lattice[J]. Journal of High Energy Physics, 2016, 2016(5): 133.
|
[4] |
SCIARAPPA A. Exact relativistic Toda chain eigenfunctions from separation of variables and gauge theory[J]. Journal of High Energy Physics, 2017, 2017(10): 116.
|
[5] |
KASHANI-POOR A K. Quantization condition from exact WKB for difference equations[J]. Journal of High Energy Physics, 2016, 2016(6): 180.
|
[6] |
MARINO M, ZAKANY S. Exact eigenfunctions and the open topological string[J]. Journal of Physics A: Mathematical and Theoretical, 2017, 50(32): 325401.
|
[7] |
MARINO M, ZAKANY S. Wavefunctions, integrability, and open strings[DB/OL]. arXiv.org: arXiv 1706.07402, 2017.
|
[8] |
FADDEEV L D. Modular double of the quantum group SLq (2, R)[C]// Lie Theory and Its Applications in Physics. Berlin: Springer, 2014: 21-31.
|
[9] |
GRASSiA, HATSUDA Y, MARINO M. Topological strings from quantum mechanics[DB/OL]. arXiv.org: arXiv 1410.3382, 2014.
|
[10] |
WANG Xin, ZHANG Guojun, HUANG Minxin. New exact quantization condition for toric Calabi-Yau geometries[J]. Physical Review Letters, 2015, 115(12): 121601.
|
[11] |
KHARCHEV S, LEBEDEV D, SEMENOV-TIAN-SHANSKY M. Unitary representations of Uq(sl(2; R)), the modular double, and the multiparticle q-deformed Toda chains[J]. Communications in Mathematical Physics, 2002, 225(3): 573-609.
|
[12] |
BULLIMORE M, KIM H C. The superconformal index of the (2, 0) theory with defects[J]. Journal of High Energy Physics, 2015, 2015(5): 48.
|
[13] |
FADDEEV L D, KASHAEV R M. Quantum dilogarithm[C]// Fifty Years of Mathematical Physics: Selected Works of Ludwig Faddeev. Singapore: World Scientific, 2016: 502-509.
|
[14] |
BARNES E W. The theory of the double gamma function[J]. Philosophical Transactions of the Royal Society of London, Series A, 1901, 196: 265-387.
|
[15] |
BARNES E W. On the theory of multiple gamma function[J].Trans Cambridge Phil Soc, 1904, 19: 374-425.
|