Cosmology with nilpotent superfields
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- 作者:Sergio Ferrara (1) (2) (3)
Renata Kallosh (4)
Andrei Linde (4)
1. Physics Department ; Theory Unit ; CERN ; CH 1211 ; Geneva 23 ; Switzerland
2. INFN 鈥?Laboratori Nazionali di Frascati ; Via Enrico Fermi 40 ; I-00044 ; Frascati ; Italy
3. Department of Physics and Astronomy ; University of California Los Angeles ; Los Angeles ; CA ; 90095-1547 ; U.S.A.
4. Department of Physics ; Stanford University ; Stanford ; CA ; 94305 ; U.S.A. - 关键词:Cosmology of Theories beyond the SM ; D ; branes ; Supergravity Models
- 刊名:Journal of High Energy Physics
- 出版年:2014
- 出版时间:October 2014
- 年:2014
- 卷:2014
- 期:10
- 全文大小:623 KB
- 参考文献:1. Cecotti, S (1987) Higher derivative supergravity is equivalent to standard supergravity coupled to matter. 1. Phys. Lett. B 190: pp. 86 CrossRef
2. Kallosh, R, Linde, A (2013) Superconformal generalizations of the Starobinsky model. JCAP 06: pp. 028 CrossRef
3. Ferrara, S, Kallosh, R, Proeyen, A (2013) On the supersymmetric completion of R + R2 gravity and cosmology. JHEP 11: pp. 134 CrossRef
4. Kawasaki, M, Yamaguchi, M, Yanagida, T (2000) Natural chaotic inflation in supergravity. Phys. Rev. Lett. 85: pp. 3572 CrossRef
5. Kallosh, R, Linde, A (2010) New models of chaotic inflation in supergravity. JCAP 11: pp. 011 CrossRef
6. Kallosh, R, Linde, A, Rube, T (2011) General inflaton potentials in supergravity. Phys. Rev. D 83: pp. 043507
7. Kallosh, R, Linde, A, Vercnocke, B (2014) Natural inflation in supergravity and beyond. Phys. Rev. D 90: pp. 041303
8. Kallosh, R, Linde, A, Westphal, A (2014) Chaotic inflation in supergravity after Planck and BICEP2. Phys. Rev. D 90: pp. 023534
9. Kallosh, R, Linde, A (2013) Superconformal generalization of the chaotic inflation model 位 4 蠒 4 鈭尉 2 蠒 2 R $$ \frac{\lambda }{4}{\phi}^4 - \frac{\xi }{2}\ {\phi}^2R $$. JCAP 06: pp. 027 CrossRef
10. Kallosh, R, Linde, A (2013) Universality class in conformal inflation. JCAP 07: pp. 002 CrossRef
11. Kallosh, R, Linde, A, Roest, D (2014) Universal attractor for inflation at strong coupling. Phys. Rev. Lett. 112: pp. 011303 CrossRef
12. Kallosh, R, Linde, A, Roest, D (2013) Superconformal inflationary 伪-attractors. JHEP 11: pp. 198 CrossRef
13. Cecotti, S, Kallosh, R (2014) Cosmological attractor models and higher curvature supergravity. JHEP 05: pp. 114 CrossRef
14. Kallosh, R, Linde, A, Roest, D (2014) Large field inflation and double 伪-attractors. JHEP 08: pp. 052 CrossRef
15. 脕lvarez-Gaum茅, L, Gomez, C, Jimenez, R (2010) Minimal inflation. Phys. Lett. B 690: pp. 68 CrossRef
16. 脕lvarez-Gaum茅, L, Gomez, C, Jimenez, R (2011) A minimal inflation scenario. JCAP 03: pp. 027 CrossRef
17. Achucarro, A, Mooij, S, Ortiz, P, Postma, M (2012) Sgoldstino inflation. JCAP 08: pp. 013 CrossRef
18. Starobinsky, AA (1980) A new type of isotropic cosmological models without singularity. Phys. Lett. B 91: pp. 99 CrossRef
19. Starobinsky, AA (1983) The perturbation spectrum evolving from a nonsingular initially de-Sitter cosmology and the microwave background anisotropy. Sov. Astron. Lett. 9: pp. 302
20. Whitt, B (1984) Fourth order gravity as general relativity plus matter. Phys. Lett. B 145: pp. 176 CrossRef
21. Linde, AD (1983) Chaotic inflation. Phys. Lett. B 129: pp. 177 CrossRef
22. Linde, AD (1990) Particle physics and inflationary cosmology. Contemp. Concepts Phys. 5: pp. 1
23. Linde, AD (2008) Inflationary cosmology. Lect. Notes Phys. 738: pp. 1 CrossRef
24. Demozzi, V, Linde, A, Mukhanov, V (2011) Supercurvaton. JCAP 04: pp. 013 CrossRef
25. Deser, S, Zumino, B (1977) Broken supersymmetry and supergravity. Phys. Rev. Lett. 38: pp. 1433 CrossRef
26. D.V. Volkov and V.P. Akulov, / Possible universal neutrino interaction, / JETP Lett. 16 (1972) 438 [ / Pisma Zh. Eksp. Teor. Fiz. 16 (1972) 621] [INSPIRE].
27. Volkov, D, Akulov, V (1973) Is the neutrino a Goldstone particle?. Phys. Lett. B 46: pp. 109 CrossRef
28. Ro膷ek, M (1978) Linearizing the Volkov-Akulov model. Phys. Rev. Lett. 41: pp. 451 CrossRef
29. Ivanov, EA, Kapustnikov, AA (1978) General relationship between linear and nonlinear realizations of supersymmetry. J. Phys. A 11: pp. 2375
30. Lindstr枚m, U, Ro膷ek, M (1979) Constrained local superfields. Phys. Rev. D 19: pp. 2300
31. Casalbuoni, R, Curtis, S, Dominici, D, Feruglio, F, Gatto, R (1989) Nonlinear realization of supersymmetry algebra from supersymmetric constraint. Phys. Lett. B 220: pp. 569 CrossRef
32. Komargodski, Z, Seiberg, N (2009) From linear SUSY to constrained superfields. JHEP 09: pp. 066 CrossRef
33. Antoniadis, I, Dudas, E, Ghilencea, DM, Tziveloglou, P (2010) Non-linear MSSM. Nucl. Phys. B 841: pp. 157 CrossRef
34. Kuzenko, SM, Tyler, SJ (2011) Relating the Komargodski-Seiberg and Akulov-Volkov actions: exact nonlinear field redefinition. Phys. Lett. B 698: pp. 319 CrossRef
35. Antoniadis, I, Dudas, E, Ferrara, S, Sagnotti, A (2014) The Volkov-Akulov-Starobinsky supergravity. Phys. Lett. B 733: pp. 32 CrossRef
36. Ferrara, S, Kallosh, R, Linde, A, Marrani, A, Proeyen, A (2010) Jordan frame supergravity and inflation in NMSSM. Phys. Rev. D 82: pp. 045003
37. Ferrara, S, Kallosh, R, Linde, A, Marrani, A, Proeyen, A (2011) Superconformal symmetry, NMSSM and inflation. Phys. Rev. D 83: pp. 025008
38. Yamaguchi, M, Yokoyama, J (2001) New inflation in supergravity with a chaotic initial condition. Phys. Rev. D 63: pp. 043506
39. Yamaguchi, M (2001) Natural double inflation in supergravity. Phys. Rev. D 64: pp. 063502
40. Kawasaki, M, Yamaguchi, M (2002) A supersymmetric topological inflation model. Phys. Rev. D 65: pp. 103518
41. Yamaguchi, M, Yokoyama, J (2003) Chaotic hybrid new inflation in supergravity with a running spectral index. Phys. Rev. D 68: pp. 123520
42. Kadota, K, Yamaguchi, M (2007) D-term chaotic inflation in supergravity. Phys. Rev. D 76: pp. 103522
43. Davis, SC, Postma, M (2008) SUGRA chaotic inflation and moduli stabilisation. JCAP 03: pp. 015 CrossRef
44. Takahashi, F (2010) Linear inflation from running kinetic term in supergravity. Phys. Lett. B 693: pp. 140 CrossRef
45. Nakayama, K, Takahashi, F (2010) Running kinetic inflation. JCAP 11: pp. 009 CrossRef
46. Yamaguchi, M (2011) Supergravity based inflation models: a review. Class. Quant. Grav. 28: pp. 103001 CrossRef
47. Harigaya, K, Yanagida, TT (2014) Discovery of large scale tensor mode and chaotic inflation in supergravity. Phys. Lett. B 734: pp. 13 CrossRef
48. Nakayama, K, Takahashi, F, Yanagida, TT (2014) Polynomial chaotic inflation in supergravity revisited. Phys. Lett. B 737: pp. 151 CrossRef
49. Ellis, J, Garcia, MAG, Nanopoulos, DV, Olive, KA (2014) A no-scale inflationary model to fit them all. JCAP 08: pp. 044
50. Ellis, J, Garc铆a, MAG, Nanopoulos, DV, Olive, KA (2014) Resurrecting quadratic inflation in no-scale supergravity in light of BICEP2. JCAP 05: pp. 037 CrossRef
51. Ellis, J, Nanopoulos, DV, Olive, KA (2013) Starobinsky-like inflationary models as avatars of no-scale supergravity. JCAP 10: pp. 009 CrossRef
52. J. Ellis, D.V. Nanopoulos and K.A. Olive, / No-scale supergravity realization of the Starobinsky model of inflation, / Phys. Rev. Lett. 111 (2013) 111301 [ / Erratum ibid. 111 (2013) 129902] [305.1247" class="a-plus-plus">arXiv:1305.1247] [305.1247" class="a-plus-plus">INSPIRE].
53. Cecotti, S, Ferrara, S, Porrati, M, Sabharwal, S (1988) New minimal higher derivative supergravity coupled to matter. Nucl. Phys. B 306: pp. 160 CrossRef
54. Ferrara, S, Kallosh, R, Linde, A, Porrati, M (2013) Minimal supergravity models of inflation. Phys. Rev. D 88: pp. 085038
55. Farakos, F, Kehagias, A, Riotto, A (2013) On the Starobinsky model of inflation from supergravity. Nucl. Phys. B 876: pp. 187 CrossRef
56. Ferrara, S, Porrati, M (2014) Minimal R + R2 supergravity models of inflation coupled to matter. Phys. Lett. B 737: pp. 135 CrossRef
57. Cederwall, M, Gussich, A, Nilsson, BEW, Westerberg, A (1997) The Dirichlet super three-brane in ten-dimensional type IIB supergravity. Nucl. Phys. B 490: pp. 163 CrossRef
58. Cederwall, M, Gussich, A, Nilsson, BEW, Sundell, P, Westerberg, A (1997) The Dirichlet super p-branes in ten-dimensional type IIA and IIB supergravity. Nucl. Phys. B 490: pp. 179 CrossRef
59. Bergshoeff, E, Townsend, PK (1997) Super D-branes. Nucl. Phys. B 490: pp. 145 CrossRef
60. Aganagic, M, Popescu, C, Schwarz, JH (1997) Gauge invariant and gauge fixed D-brane actions. Nucl. Phys. B 495: pp. 99 CrossRef
61. Aganagic, M, Popescu, C, Schwarz, JH (1997) D-brane actions with local kappa symmetry. Phys. Lett. B 393: pp. 311 CrossRef
62. Bergshoeff, E, Kallosh, R, Ort铆n, T, Papadopoulos, G (1997) Kappa symmetry, supersymmetry and intersecting branes. Nucl. Phys. B 502: pp. 149 CrossRef
63. Kallosh, R (1998) Volkov-Akulov theory and D-branes. Lect. Notes Phys. 509: pp. 49 CrossRef
64. Bergshoeff, E, Coomans, F, Kallosh, R, Shahbazi, CS, Proeyen, A (2013) Dirac-Born-Infeld-Volkov-Akulov and deformation of supersymmetry. JHEP 08: pp. 100 CrossRef
65. Ro膷ek, M, Tseytlin, AA (1999) Partial breaking of global D =4 supersymmetry, constrained superfields and three-brane actions. Phys. Rev. D 59: pp. 106001
66. Kallosh, R, Linde, A, Olive, KA, Rube, T (2011) Chaotic inflation and supersymmetry breaking. Phys. Rev. D 84: pp. 083519
67. Kallosh, R, Linde, AD (2007) O鈥橩KLT. JHEP 02: pp. 002 CrossRef
68. Kachru, S, Kallosh, R, Linde, AD, Trivedi, SP (2003) De Sitter vacua in string theory. Phys. Rev. D 68: pp. 046005
69. Kallosh, R, Linde, AD (2004) Landscape, the scale of SUSY breaking and inflation. JHEP 12: pp. 004 CrossRef
70. J. Polonyi, / Generalization of the massive scalar multiplet coupling to the supergravity, KFKI-77-93 (1978).
71. Binetruy, P, Dvali, GR (1996) D term inflation. Phys. Lett. B 388: pp. 241 CrossRef
72. Binetruy, P, Dvali, G, Kallosh, R, Proeyen, A (2004) Fayet-Iliopoulos terms in supergravity and cosmology. Class. Quant. Grav. 21: pp. 3137 CrossRef
73. Buchm眉ller, W, Domcke, V, Wieck, C (2014) No-scale D-term inflation with stabilized moduli. Phys. Lett. B 730: pp. 155 CrossRef
74. W. Buchm眉ller, V. Domcke and K. Schmitz, / The chaotic regime of D-term inflation, arXiv:1406.6300 [INSPIRE].
75. Burgess, CP, Kallosh, R, Quevedo, F (2003) De Sitter string vacua from supersymmetric D terms. JHEP 10: pp. 056
76. R. Kallosh, L. Kofman, A.D. Linde and A. Van Proeyen, / Superconformal symmetry, supergravity and cosmology, / Class. Quant. Grav. 17 (2000) 4269 [ / Erratum ibid. 21 (2004) 5017] [hep-th/0006179] [INSPIRE].
77. Cremmer, E, Ferrara, S, Girardello, L, Proeyen, A (1983) Yang-Mills theories with local supersymmetry: lagrangian, transformation laws and super-Higgs effect. Nucl. Phys. B 212: pp. 413 CrossRef
78. Freedman, DZ, Proeyen, A (2012) Supergravity. Cambridge University Press, Cambridge U.K CrossRef
79. R. Kallosh, / Planck 2013 and superconformal symmetry, arXiv:1402.0527 [INSPIRE].
80. Antoniadis, I, Dudas, E, Sagnotti, A (1999) Brane supersymmetry breaking. Phys. Lett. B 464: pp. 38 CrossRef
81. Angelantonj, C, Antoniadis, I, D鈥橝ppollonio, G, Dudas, E, Sagnotti, A (2000) Type I vacua with brane supersymmetry breaking. Nucl. Phys. B 572: pp. 36 CrossRef
82. Dudas, E, Kitazawa, N, Sagnotti, A (2010) On climbing scalars in string theory. Phys. Lett. B 694: pp. 80 CrossRef
83. Bergshoeff, E, Kallosh, R, Ort铆n, T, Roest, D, Proeyen, A (2001) New formulations of D = 10 supersymmetry and D8-O8 domain walls. Class. Quant. Grav. 18: pp. 3359 CrossRef
84. Cecotti, S, Ferrara, S (1987) Supersymmetric Born-Infeld lagrangians. Phys. Lett. B 187: pp. 335 CrossRef
85. Bagger, J, Galperin, A (1997) A new Goldstone multiplet for partially broken supersymmetry. Phys. Rev. D 55: pp. 1091
86. McAllister, L, Silverstein, E, Westphal, A, Wrase, T (2014) The powers of monodromy. JHEP 09: pp. 123 CrossRef
87. Ketov, SV, Terada, T (2014) Inflation in supergravity with a single chiral superfield. Phys. Lett. B 736: pp. 272 CrossRef
88. Kallosh, R (2008) On inflation in string theory. Lect. Notes Phys. 738: pp. 119 CrossRef
89. Kallosh, R, Sivanandam, N, Soroush, M (2008) Axion inflation and gravity waves in string theory. Phys. Rev. D 77: pp. 043501
90. Lebedev, O, Nilles, HP, Ratz, M (2006) De Sitter vacua from matter superpotentials. Phys. Lett. B 636: pp. 126 CrossRef
91. Dine, M, Kitano, R, Morisse, A, Shirman, Y (2006) Moduli decays and gravitinos. Phys. Rev. D 73: pp. 123518
92. Kitano, R (2006) Gravitational gauge mediation. Phys. Lett. B 641: pp. 203 CrossRef
93. Kachru, S (2003) Towards inflation in string theory. JCAP 10: pp. 013 CrossRef
94. Kallosh, R, Linde, A, Vercnocke, B, Wrase, T (2014) Analytic classes of metastable de Sitter vacua. JHEP 1410: pp. 11 CrossRef
95. Dudas, E, Linde, A, Mambrini, Y, Mustafayev, A, Olive, KA (2013) Strong moduli stabilization and phenomenology. Eur. Phys. J. C 73: pp. 2268 CrossRef
96. Coughlan, GD, Fischler, W, Kolb, EW, Raby, S, Ross, GG (1983) Cosmological problems for the Polonyi potential. Phys. Lett. B 131: pp. 59 CrossRef
97. Goncharov, AS, Linde, AD, Vysotsky, MI (1984) Cosmological problems for spontaneously broken supergravity. Phys. Lett. B 147: pp. 279 CrossRef
98. Banks, T, Kaplan, DB, Nelson, AE (1994) Cosmological implications of dynamical supersymmetry breaking. Phys. Rev. D 49: pp. 779
99. G.R. Dvali, / Inflation versus the cosmological moduli problem, hep-ph/9503259 [INSPIRE].
100. Dine, M, Randall, L, Thomas, SD (1995) Supersymmetry breaking in the early universe. Phys. Rev. Lett. 75: pp. 398 CrossRef - 刊物类别:Physics and Astronomy
- 刊物主题:Physics
Elementary Particles and Quantum Field Theory
Quantum Field Theories, String Theory - 出版者:Springer Berlin / Heidelberg
- ISSN:1029-8479
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