# This file was automatically created by FeynRules 1.7.100 # Mathematica version: 7.0 for Linux x86 (64-bit) (February 18, 2009) # Date: Wed 28 Nov 2012 10:15:27 from object_library import all_vertices, Vertex import particles as P import couplings as C import lorentz as L V_1 = Vertex(name='V_1', particles=[P.H, P.H, P.H, P.H], color=['1'], lorentz=[L.SSSS1], couplings={(0, 0): C.GC_72}) V_2 = Vertex(name='V_2', particles=[P.H, P.H, P.H], color=['1'], lorentz=[L.SSS1], couplings={(0, 0): C.GC_94}) V_3 = Vertex(name='V_3', particles=[P.ghG, P.ghG__tilde__, P.g], color=['f(1,2,3)'], lorentz=[L.UUV1], couplings={(0, 0): C.GC_69}) V_4 = Vertex(name='V_4', particles=[P.g, P.g, P.g], color=['f(1,2,3)'], lorentz=[L.VVV1],
# This file was automatically created by FeynRules $Revision: 821 $ # Mathematica version: 7.0 for Microsoft Windows (32-bit) (February 18, 2009) # Date: Mon 3 Oct 2011 13:27:06 from object_library import all_vertices, Vertex import particles as P import couplings as C import lorentz as L V_1 = Vertex(name='V_1', particles=[P.H, P.H, P.H, P.H], color=['1'], lorentz=[L.SSSS1], couplings={(0, 0): C.GC_30}) V_2 = Vertex(name='V_2', particles=[P.H, P.H, P.H], color=['1'], lorentz=[L.SSS1], couplings={(0, 0): C.GC_69}) V_3 = Vertex(name='V_3', particles=[P.G, P.G, P.H, P.H], color=['Identity(1,2)'], lorentz=[L.VVSS2], couplings={(0, 0): C.GC_32}) V_4 = Vertex(name='V_4', particles=[P.G, P.G, P.H], color=['Identity(1,2)'], lorentz=[L.VVS2],
# This file was automatically created by FeynRules 2.0.23 # Mathematica version: 9.0 for Mac OS X x86 (64-bit) (November 20, 2012) # Date: Sat 20 Sep 2014 16:12:10 from object_library import all_vertices, Vertex import particles as P import couplings as C import lorentz as L V_1 = Vertex(name='V_1', particles=[P.h, P.h, P.hs, P.hs], color=['1'], lorentz=[L.SSSS1], couplings={(0, 0): C.GC_23}) V_2 = Vertex(name='V_2', particles=[P.h, P.h, P.h, P.hs], color=['1'], lorentz=[L.SSSS1], couplings={(0, 0): C.GC_22}) V_3 = Vertex(name='V_3', particles=[P.h, P.hs, P.hs, P.hs], color=['1'], lorentz=[L.SSSS1], couplings={(0, 0): C.GC_21}) V_4 = Vertex(name='V_4', particles=[P.h, P.h, P.h, P.h], color=['1'], lorentz=[L.SSSS1],
# This file was automatically created by FeynRules $Revision: 1058$ # Mathematica version: 8.0 for Mac OS X x86 (64-bit) (November 6, 2010) # Date: Fri 6 Jul 2012 14:58:25 from object_library import all_vertices, Vertex import particles as P import couplings as C import lorentz as L V_1 = Vertex(name='V_1', particles=[P.H, P.H, P.H, P.H], color=['1'], lorentz=[L.SSSS1], couplings={(0, 0): C.GC_17}) V_2 = Vertex(name='V_2', particles=[P.H, P.H, P.phi0, P.phi0], color=['1'], lorentz=[L.SSSS1], couplings={(0, 0): C.GC_15}) V_3 = Vertex(name='V_3', particles=[P.phi0, P.phi0, P.phi0, P.phi0], color=['1'], lorentz=[L.SSSS1], couplings={(0, 0): C.GC_17}) V_4 = Vertex(name='V_4', particles=[P.H, P.H, P.phi__minus__, P.phi__plus__], color=['1'], lorentz=[L.SSSS1],
# This file was automatically created by FeynRules 2.0.25 # Mathematica version: 9.0 for Mac OS X x86 (64-bit) (January 24, 2013) # Date: Tue 19 Aug 2014 17:54:53 from object_library import all_vertices, Vertex import particles as P import couplings as C import lorentz as L V_1 = Vertex(name='V_1', particles=[P.H, P.H, P.H, P.H], color=['1'], lorentz=[L.SSSS1], couplings={(0, 0): C.GC_13}) V_2 = Vertex(name='V_2', particles=[P.hD, P.hD, P.hD, P.hD], color=['1'], lorentz=[L.SSSS1], couplings={(0, 0): C.GC_14}) V_3 = Vertex(name='V_3', particles=[P.hD, P.hD, P.n1, P.n1], color=['1'], lorentz=[L.SSSS1], couplings={(0, 0): C.GC_15}) V_4 = Vertex(name='V_4', particles=[P.H, P.H, P.H], color=['1'], lorentz=[L.SSS1],
# This file was automatically created by FeynRules $Revision: 535 $ # Mathematica version: 8.0 for Mac OS X x86 (64-bit) (November 6, 2010) # Date: Wed 23 Mar 2011 22:58:09 from object_library import all_vertices, Vertex import particles as P import couplings as C import lorentz as L V_1 = Vertex(name = 'V_1', particles = [ P.H, P.H, P.H ], color = [ '1' ], lorentz = [ L.SSS1 ], couplings = {(0,0):C.GC_30}) V_2 = Vertex(name = 'V_2', particles = [ P.G, P.G, P.G ], color = [ 'f(1,2,3)' ], lorentz = [ L.VVV1 ], couplings = {(0,0):C.GC_4}) V_3 = Vertex(name = 'V_3', particles = [ P.G, P.G, P.G, P.G ], color = [ 'f(-1,1,2)*f(3,4,-1)', 'f(-1,1,3)*f(2,4,-1)', 'f(-1,1,4)*f(2,3,-1)' ], lorentz = [ L.VVVV1, L.VVVV3, L.VVVV4 ], couplings = {(1,1):C.GC_6,(0,0):C.GC_6,(2,2):C.GC_6}) V_4 = Vertex(name = 'V_4', particles = [ P.A, P.W__minus__, P.W__plus__ ],
# This file was automatically created by FeynRules 2.3.29 # Mathematica version: 10.0 for Linux x86 (64-bit) (September 9, 2014) # Date: Fri 25 Aug 2017 23:44:54 from object_library import all_vertices, Vertex import particles as P import couplings as C import lorentz as L V_1 = Vertex(name = 'V_1', particles = [ P.<>CreateObjectParticleName[PartNameMG[anti[MakeIdenticalFermions[#1]] & ]], P.<>CreateObjectParticleName[PartNameMG[anti[MakeIdenticalFermions[#1]] & ]], P.<>CreateObjectParticleName[PartNameMG[anti[MakeIdenticalFermions[#1]] & ]], P.<>CreateObjectParticleName[PartNameMG[3]], P.<>CreateObjectParticleName[PartNameMG[anti[MakeIdenticalFermions[#1]] & ]], P.<>CreateObjectParticleName[PartNameMG[3]] ], color = [ '1' ], lorentz = [ L.<>PRIVATE`ConvertSpinToString[0]<>PRIVATE`ConvertSpinToString[0]<>PRIVATE`ConvertSpinToString[0]<>PRIVATE`ConvertSpinToString[0]<>PRIVATE`ConvertSpinToString[0]<>PRIVATE`ConvertSpinToString[0]<>3 ], couplings = {(0,0):C.GC_2}) V_2 = Vertex(name = 'V_2', particles = [], color = [ '1' ], lorentz = [ L.3 ], couplings = {(0,0):C.GC_1})
# This file was automatically created by FeynRules 2.1 # Mathematica version: 8.0 for Mac OS X x86 (64-bit) (November 6, 2010) # Date: Tue 2 Dec 2014 06:46:52 from object_library import all_vertices, Vertex import particles as P import couplings as C import lorentz as L V_1 = Vertex(name='V_1', particles=[P.g, P.g, P.g], color=['f(1,2,3)'], lorentz=[L.VVV1], couplings={(0, 0): C.GC_1}) V_2 = Vertex(name='V_2', particles=[P.g, P.g, P.g, P.g], color=[ 'f(-1,1,2)*f(3,4,-1)', 'f(-1,1,3)*f(2,4,-1)', 'f(-1,1,4)*f(2,3,-1)' ], lorentz=[L.VVVV1, L.VVVV3, L.VVVV4], couplings={ (1, 1): C.GC_3, (0, 0): C.GC_3, (2, 2): C.GC_3 }) V_3 = Vertex(name='V_3', particles=[P.a, P.W__minus__, P.W2__plus__], color=['1'],
# This file was automatically created by FeynRules 2.3.7 # Mathematica version: 9.0 for Linux x86 (64-bit) (November 20, 2012) # Date: Mon 24 Aug 2015 14:17:57 from object_library import all_vertices, Vertex import particles as P import couplings as C import lorentz as L V_1 = Vertex(name='V_1', particles=[P.G0, P.G0, P.G0, P.G0], color=['1'], lorentz=[L.SSSS1], couplings={(0, 0): C.GC_19}) V_2 = Vertex(name='V_2', particles=[P.G0, P.G0, P.G__minus__, P.G__plus__], color=['1'], lorentz=[L.SSSS1], couplings={(0, 0): C.GC_17}) V_3 = Vertex(name='V_3', particles=[P.G__minus__, P.G__minus__, P.G__plus__, P.G__plus__], color=['1'], lorentz=[L.SSSS1], couplings={(0, 0): C.GC_18}) V_4 = Vertex(name='V_4', particles=[P.G0, P.G0, P.H, P.H], color=['1'], lorentz=[L.SSSS1],
#============================================================================================= # 4-gluon R2 vertex #============================================================================================= # Keep in mind that Delta8(a,b) is 1/2 Tr(a,b) V_R24G = Vertex(name = 'V_R24G', particles = [ P.G, P.G, P.G, P.G ], color = [ 'Tr(1,2)*Tr(3,4)' , 'Tr(1,3)*Tr(2,4)' , 'Tr(1,4)*Tr(2,3)', \ 'd(-1,1,2)*d(-1,3,4)' , 'd(-1,1,3)*d(-1,2,4)' , 'd(-1,1,4)*d(-1,2,3)'], lorentz = [ L.R2_4G_1234, L.R2_4G_1324, L.R2_4G_1423 ], loop_particles = [ [[P.G]], [[P.u],[P.d],[P.c],[P.s]] ], couplings = {(0,0,0):C.GC_4GR2_Gluon_delta5,(0,1,0):C.GC_4GR2_Gluon_delta7,(0,2,0):C.GC_4GR2_Gluon_delta7, \ (1,0,0):C.GC_4GR2_Gluon_delta7,(1,1,0):C.GC_4GR2_Gluon_delta5,(1,2,0):C.GC_4GR2_Gluon_delta7, \ (2,0,0):C.GC_4GR2_Gluon_delta7,(2,1,0):C.GC_4GR2_Gluon_delta7,(2,2,0):C.GC_4GR2_Gluon_delta5, \ (3,0,0):C.GC_4GR2_4Struct,(3,1,0):C.GC_4GR2_2Struct,(3,2,0):C.GC_4GR2_2Struct, \ (4,0,0):C.GC_4GR2_2Struct,(4,1,0):C.GC_4GR2_4Struct,(4,2,0):C.GC_4GR2_2Struct, \ (5,0,0):C.GC_4GR2_2Struct,(5,1,0):C.GC_4GR2_2Struct,(5,2,0):C.GC_4GR2_4Struct , \ (0,0,1):C.GC_4GR2_Fermion_delta11,(0,1,1):C.GC_4GR2_Fermion_delta5,(0,2,1):C.GC_4GR2_Fermion_delta5, \ (1,0,1):C.GC_4GR2_Fermion_delta5,(1,1,1):C.GC_4GR2_Fermion_delta11,(1,2,1):C.GC_4GR2_Fermion_delta5, \ (2,0,1):C.GC_4GR2_Fermion_delta5,(2,1,1):C.GC_4GR2_Fermion_delta5,(2,2,1):C.GC_4GR2_Fermion_delta11, \ (3,0,1):C.GC_4GR2_11Struct,(3,1,1):C.GC_4GR2_5Struct,(3,2,1):C.GC_4GR2_5Struct, \ (4,0,1):C.GC_4GR2_5Struct,(4,1,1):C.GC_4GR2_11Struct,(4,2,1):C.GC_4GR2_5Struct, \ (5,0,1):C.GC_4GR2_5Struct,(5,1,1):C.GC_4GR2_5Struct,(5,2,1):C.GC_4GR2_11Struct }, type = 'R2') #============================================================================================= # gdd~ V_R2GDD = Vertex(name = 'V_R2GDD', particles = [ P.d__tilde__, P.d, P.G ],
# This file was automatically created by FeynRules 2.0.8 # Mathematica version: 8.0 for Linux x86 (64-bit) (February 23, 2011) # Date: Tue 11 Nov 2014 15:33:22 from object_library import all_vertices, Vertex import particles as P import couplings as C import lorentz as L V_1 = Vertex(name='V_1', particles=[P.G, P.G, P.G], color=['f(1,2,3)'], lorentz=[L.VVV1], couplings={(0, 0): C.GC_1}) V_2 = Vertex(name='V_2', particles=[P.G, P.G, P.G, P.G], color=[ 'f(-1,1,2)*f(3,4,-1)', 'f(-1,1,3)*f(2,4,-1)', 'f(-1,1,4)*f(2,3,-1)' ], lorentz=[L.VVVV1, L.VVVV3, L.VVVV4], couplings={ (1, 1): C.GC_2, (0, 0): C.GC_2, (2, 2): C.GC_2 }) V_3 = Vertex(name='V_3', particles=[P.A, P.W__minus__, P.W__plus__], color=['1'],
# This file was automatically created by FeynRules 2.0.25 # Mathematica version: 8.0 for Mac OS X x86 (64-bit) (February 23, 2011) # Date: Thu 8 May 2014 12:30:33 from object_library import all_vertices, Vertex import particles as P import couplings as C import lorentz as L V_1 = Vertex(name='V_1', particles=[P.vt__tilde__, P.ta__minus__, P.pi0, P.pi__plus__], color=['1'], lorentz=[L.FFSS1], couplings={(0, 0): C.GC_3}) V_2 = Vertex(name='V_2', particles=[P.vt__tilde__, P.ta__minus__, P.pi__plus__], color=['1'], lorentz=[L.FFS1], couplings={(0, 0): C.GC_2}) V_3 = Vertex(name='V_3', particles=[P.vt__tilde__, P.ta__minus__, P.e__plus__, P.ve], color=['1'], lorentz=[L.FFFF1], couplings={(0, 0): C.GC_1}) V_4 = Vertex(name='V_4', particles=[P.vt__tilde__, P.ta__minus__, P.mu__plus__, P.vm], color=['1'], lorentz=[L.FFFF1],
# Modified by F. Demartin in order to include loop Higgs EFT # Dec 2013 from object_library import all_vertices, all_CTvertices, Vertex, CTVertex import particles as P import couplings as C import lorentz as L # ====================================================================== # QCD base vertices # ====================================================================== V_3 = Vertex(name = 'V_3', particles = [ P.G, P.G, P.G ], color = [ 'f(1,2,3)' ], lorentz = [ L.VVV1 ], couplings = {(0,0):C.GC_4}) V_4 = Vertex(name = 'V_4', particles = [ P.G, P.G, P.G, P.G ], color = [ 'f(-1,1,2)*f(3,4,-1)', 'f(-1,1,3)*f(2,4,-1)', 'f(-1,1,4)*f(2,3,-1)' ], lorentz = [ L.VVVV1, L.VVVV3, L.VVVV4 ], couplings = {(1,1):C.GC_6,(0,0):C.GC_6,(2,2):C.GC_6}) V_24 = Vertex(name = 'V_24', particles = [ P.d__tilde__, P.d, P.G ], color = [ 'T(3,2,1)' ], lorentz = [ L.FFV1 ], couplings = {(0,0):C.GC_5})
# This file was automatically created by FeynRules $Revision: 535 $ # Mathematica version: 7.0 for Mac OS X x86 (64-bit) (November 11, 2008) # Date: Fri 18 Mar 2011 18:40:51 from object_library import all_vertices, Vertex import particles as P import couplings as C import lorentz as L # It was number 36 in sm V_1 = Vertex(name='V_1', particles=[P.G, P.G, P.G], color=['f(1,2,3)'], lorentz=[L.VVV1], couplings={(0, 0): C.GC_9}, type=['base', ()]) # It was number 37 in sm V_2 = Vertex(name='V_2', particles=[P.G, P.G, P.G, P.G], color=[ 'f(-1,1,2)*f(3,4,-1)', 'f(-1,1,3)*f(2,4,-1)', 'f(-1,1,4)*f(2,3,-1)' ], lorentz=[L.VVVV1, L.VVVV3, L.VVVV4], couplings={ (1, 1): C.GC_11, (0, 0): C.GC_11, (2, 2): C.GC_11 }, type=['base', ()])
# This file was automatically created by FeynRules 2.3.26 # Mathematica version: 10.3.1 for Mac OS X x86 (64-bit) (December 9, 2015) # Date: Sun 3 Sep 2017 23:30:31 from object_library import all_vertices, Vertex import particles as P import couplings as C import lorentz as L V_1 = Vertex(name = 'V_1', particles = [ P.H, P.H, P.H, P.H ], color = [ '1' ], lorentz = [ L.SSSS3 ], couplings = {(0,0):C.GC_22}) V_2 = Vertex(name = 'V_2', particles = [ P.H, P.H, P.H ], color = [ '1' ], lorentz = [ L.SSS3 ], couplings = {(0,0):C.GC_54}) V_3 = Vertex(name = 'V_3', particles = [ P.a, P.a, P.X0 ], color = [ '1' ], lorentz = [ L.VVS3 ], couplings = {(0,0):C.GC_9}) V_4 = Vertex(name = 'V_4', particles = [ P.g, P.g, P.X0 ],
# This file was automatically created by FeynRules $Revision: 595 $ # Mathematica version: 9.0 for Mac OS X x86 (64-bit) (November 20, 2012) # Date: Wed 5 Jun 2013 11:59:40 from object_library import all_vertices, Vertex import particles as P import couplings as C import lorentz as L V_1 = Vertex(name='V_1', particles=[P.G, P.G, P.G], color=['f(1,2,3)'], lorentz=[L.VVV1], couplings={(0, 0): C.GC_8}) V_2 = Vertex(name='V_2', particles=[P.G, P.G, P.G, P.G], color=[ 'f(-1,1,2)*f(3,4,-1)', 'f(-1,1,3)*f(2,4,-1)', 'f(-1,1,4)*f(2,3,-1)' ], lorentz=[L.VVVV2, L.VVVV8, L.VVVV9], couplings={ (1, 1): C.GC_10, (0, 0): C.GC_10, (2, 2): C.GC_10 }) V_3 = Vertex(name='V_3', particles=[P.A, P.W__minus__, P.W__plus__], color=['1'],
# ------------------------------------------------------------------------------ # This model file was automatically created by SARAH version4.9.1 # SARAH References: arXiv:0806.0538, 0909.2863, 1002.0840, 1207.0906, 1309.7223 # (c) Florian Staub, 2013 # ------------------------------------------------------------------------------- # File created at 17:30 on 30.1.2017 # ---------------------------------------------------------------------- from object_library import all_vertices, Vertex import particles as P import couplings as C import lorentz as L V_1 = Vertex(name='V_1', particles=[P.Ah, P.Ah, P.h], color=['1'], lorentz=[L.SSS1], couplings={(0, 0): C.GC_1}) V_2 = Vertex(name='V_2', particles=[P.h, P.h, P.h], color=['1'], lorentz=[L.SSS1], couplings={(0, 0): C.GC_2}) V_3 = Vertex(name='V_3', particles=[P.h, P.Hp, P.Hpc], color=['1'], lorentz=[L.SSS1], couplings={(0, 0): C.GC_3})
# This file was automatically created by FeynRules 1.7.178 # Mathematica version: 9.0 for Mac OS X x86 (64-bit) (November 20, 2012) # Date: Sun 26 Jan 2014 12:11:59 from object_library import all_vertices, Vertex import particles as P import couplings as C import lorentz as L V_1 = Vertex(name = 'V_1', particles = [ P.h, P.h, P.h, P.h ], color = [ '1' ], lorentz = [ L.SSSS1 ], couplings = {(0,0):C.GC_122}) V_2 = Vertex(name = 'V_2', particles = [ P.h, P.h, P.h ], color = [ '1' ], lorentz = [ L.SSS1 ], couplings = {(0,0):C.GC_123}) V_3 = Vertex(name = 'V_3', particles = [ P.ghG, P.ghG__tilde__, P.G ], color = [ 'f(1,2,3)' ], lorentz = [ L.UUV1 ], couplings = {(0,0):C.GC_4}) V_4 = Vertex(name = 'V_4', particles = [ P.G, P.G, P.G ],
# This file was automatically created by FeynRules $Revision: 634 $ # Mathematica version: 8.0 for Mac OS X x86 (64-bit) (February 23, 2011) # Date: Thu 28 Jul 2011 16:28:57 from object_library import all_vertices, Vertex import particles as P import couplings as C import lorentz as L V_1 = Vertex(name='V_1', particles=[P.H, P.H, P.H, P.H], color=['1'], lorentz=[L.SSSS1], couplings={(0, 0): C.GC_240}) V_2 = Vertex(name='V_2', particles=[P.H, P.H, P.H], color=['1'], lorentz=[L.SSS1], couplings={(0, 0): C.GC_261}) V_3 = Vertex(name='V_3', particles=[P.G, P.G, P.G], color=['f(1,2,3)'], lorentz=[L.VVV2], couplings={(0, 0): C.GC_4}) V_4 = Vertex(name='V_4', particles=[P.G, P.G, P.G, P.G], color=[ 'f(-1,1,2)*f(3,4,-1)', 'f(-1,1,3)*f(2,4,-1)',
# This file was automatically created by FeynRules $Revision: 535 $ # Mathematica version: 7.0 for Mac OS X x86 (64-bit) (November 11, 2008) # Date: Fri 18 Mar 2011 18:40:51 from object_library import all_vertices, Vertex import particles as P import couplings as C import lorentz as L # Implementation of the R2 vertices # ggg d-quark internal line V_101 = Vertex(name='V_101', particles=[P.G, P.G, P.G], color=['f(1,2,3)'], lorentz=[L.VVV1], couplings={(0, 0): C.GC_101}, type=['R2', (1, 1, 1)]) # ggg u-quark internal line V_102 = Vertex(name='V_102', particles=[P.G, P.G, P.G], color=['f(1,2,3)'], lorentz=[L.VVV1], couplings={(0, 0): C.GC_101}, type=['R2', (2, 2, 2)]) # ggg gluon internal line V_103 = Vertex(name='V_103', particles=[P.G, P.G, P.G], color=['f(1,2,3)'],
# This file was automatically created by FeynRules $Revision: 535 $ # Mathematica version: 7.0 for Mac OS X x86 (64-bit) (November 11, 2008) # Date: Fri 18 Mar 2011 18:40:51 from object_library import all_vertices, all_CTvertices, Vertex, CTVertex import particles as P import couplings as C import lorentz as L # ====================================================================== # QCD base vertices # ====================================================================== V_3 = Vertex(name='V_3', particles=[P.G, P.G, P.G], color=['f(1,2,3)'], lorentz=[L.VVV1], couplings={(0, 0): C.GC_4}) V_4 = Vertex(name='V_4', particles=[P.G, P.G, P.G, P.G], color=[ 'f(-1,1,2)*f(3,4,-1)', 'f(-1,1,3)*f(2,4,-1)', 'f(-1,1,4)*f(2,3,-1)' ], lorentz=[L.VVVV1, L.VVVV3, L.VVVV4], couplings={ (1, 1): C.GC_6, (0, 0): C.GC_6, (2, 2): C.GC_6 })
# This file was automatically created by FeynRules 2.3.29 # Mathematica version: 11.0.0 for Mac OS X x86 (64-bit) (July 28, 2016) # Date: Fri 15 Sep 2017 10:14:26 from object_library import all_vertices, Vertex import particles as P import couplings as C import lorentz as L V_1 = Vertex(name='V_1', particles=[P.H, P.H, P.H, P.H], color=['1'], lorentz=[L.SSSS3], couplings={(0, 0): C.GC_9}) V_2 = Vertex(name='V_2', particles=[P.H, P.H, P.H], color=['1'], lorentz=[L.SSS3], couplings={(0, 0): C.GC_28}) V_3 = Vertex(name='V_3', particles=[P.ghG, P.ghG__tilde__, P.g], color=['f(1,2,3)'], lorentz=[L.UUV3], couplings={(0, 0): C.GC_6}) V_4 = Vertex(name='V_4', particles=[P.g, P.g, P.g], color=['f(1,2,3)'], lorentz=[L.VVV3],
# This file was automatically created by FeynRules 2.3.13 # Mathematica version: 9.0 for Mac OS X x86 (64-bit) (November 20, 2012) # Date: Mon 10 Oct 2016 08:07:13 from object_library import all_vertices, Vertex import particles as P import couplings as C import lorentz as L V_1 = Vertex(name = 'V_1', particles = [ P.ghG, P.ghG__tilde__, P.g ], color = [ 'f(1,2,3)' ], lorentz = [ L.UUV1 ], couplings = {(0,0):C.GC_6}) V_2 = Vertex(name = 'V_2', particles = [ P.g, P.g, P.g ], color = [ 'f(1,2,3)' ], lorentz = [ L.VVV1 ], couplings = {(0,0):C.GC_6}) V_3 = Vertex(name = 'V_3', particles = [ P.g, P.g, P.g, P.g ], color = [ 'f(-1,1,2)*f(3,4,-1)', 'f(-1,1,3)*f(2,4,-1)', 'f(-1,1,4)*f(2,3,-1)' ], lorentz = [ L.VVVV4, L.VVVV7, L.VVVV8 ], couplings = {(1,1):C.GC_8,(0,0):C.GC_8,(2,2):C.GC_8}) V_4 = Vertex(name = 'V_4', particles = [ P.h1, P.h1, P.h1 ],
# This file was automatically created by FeynRules 2.1.0 # Mathematica version: 8.0 for Mac OS X x86 (64-bit) (November 6, 2010) # Date: Tue 15 Oct 2013 22:07:41 from object_library import all_vertices, Vertex import particles as P import couplings as C import lorentz as L V_1 = Vertex(name = 'V_1', particles = [ P.H, P.H, P.H, P.H ], color = [ '1' ], lorentz = [ L.SSSS1, L.SSSS2 ], couplings = {(0,0):[ C.GC_16, C.GC_107 ],(0,1):C.GC_2}) V_2 = Vertex(name = 'V_2', particles = [ P.H, P.H, P.H ], color = [ '1' ], lorentz = [ L.SSS1, L.SSS2 ], couplings = {(0,0):[ C.GC_89, C.GC_116 ],(0,1):C.GC_88}) V_3 = Vertex(name = 'V_3', particles = [ P.a, P.a, P.H ], color = [ '1' ], lorentz = [ L.VVS4 ], couplings = {(0,0):[ C.GC_1, C.GC_118, C.GC_103 ]}) V_4 = Vertex(name = 'V_4', particles = [ P.a, P.H, P.H ],
# This file was automatically created by FeynRules $Revision: 595 $ # Mathematica version: 9.0 for Mac OS X x86 (64-bit) (November 20, 2012) # Date: Fri 7 Jun 2013 19:02:32 from object_library import all_vertices, Vertex import particles as P import couplings as C import lorentz as L V_1 = Vertex(name = 'V_1', particles = [ P.G, P.G, P.G ], color = [ 'f(1,2,3)' ], lorentz = [ L.VVV1 ], couplings = {(0,0):C.GC_12}) V_2 = Vertex(name = 'V_2', particles = [ P.G, P.G, P.G, P.G ], color = [ 'f(-1,1,2)*f(3,4,-1)', 'f(-1,1,3)*f(2,4,-1)', 'f(-1,1,4)*f(2,3,-1)' ], lorentz = [ L.VVVV2, L.VVVV5, L.VVVV6 ], couplings = {(1,1):C.GC_14,(0,0):C.GC_14,(2,2):C.GC_14}) V_3 = Vertex(name = 'V_3', particles = [ P.A, P.W__minus__, P.W__plus__ ], color = [ '1' ], lorentz = [ L.VVV1 ], couplings = {(0,0):C.GC_61}) V_4 = Vertex(name = 'V_4', particles = [ P.A, P.A, P.W__minus__, P.W__plus__ ],
# This file was automatically created by FeynRules 2.3.2 # Mathematica version: 12.1.0 for Mac OS X x86 (64-bit) (March 14, 2020) # Date: Mon 3 May 2021 21:39:24 from object_library import all_vertices, Vertex import particles as P import couplings as C import lorentz as L V_1 = Vertex(name='V_1', particles=[P.H, P.H, P.H, P.H], color=['1'], lorentz=[L.SSSS1], couplings={(0, 0): C.GC_10}) V_2 = Vertex(name='V_2', particles=[P.H, P.H, P.H], color=['1'], lorentz=[L.SSS1], couplings={(0, 0): C.GC_25}) V_3 = Vertex(name='V_3', particles=[P.g, P.g, P.ax], color=['Identity(1,2)'], lorentz=[L.VVS1], couplings={(0, 0): C.GC_5}) V_4 = Vertex(name='V_4', particles=[P.ghG, P.ghG__tilde__, P.g], color=['f(1,2,3)'], lorentz=[L.UUV1],
# This file was automatically created by FeynRules 1.7.69 # Mathematica version: 8.0 for Mac OS X x86 (64-bit) (November 6, 2010) # Date: Mon 1 Oct 2012 14:58:25 from object_library import all_vertices, Vertex import particles as P import couplings as C import lorentz as L V_1 = Vertex(name = 'V_1', particles = [ P.G0, P.G0, P.G0, P.G0 ], color = [ '1' ], lorentz = [ L.SSSS1 ], couplings = {(0,0):C.GC_33}) V_2 = Vertex(name = 'V_2', particles = [ P.G0, P.G0, P.G__minus__, P.G__plus__ ], color = [ '1' ], lorentz = [ L.SSSS1 ], couplings = {(0,0):C.GC_31}) V_3 = Vertex(name = 'V_3', particles = [ P.G__minus__, P.G__minus__, P.G__plus__, P.G__plus__ ], color = [ '1' ], lorentz = [ L.SSSS1 ], couplings = {(0,0):C.GC_32}) V_4 = Vertex(name = 'V_4', particles = [ P.G0, P.G0, P.H, P.H ],
# This file was automatically created by FeynRules 2.3.19 # Mathematica version: 8.0 for Mac OS X x86 (64-bit) (February 23, 2011) # Date: Mon 18 Apr 2016 10:08:24 from object_library import all_vertices, Vertex import particles as P import couplings as C import lorentz as L V_1 = Vertex(name = 'V_1', particles = [ P.X0, P.X0, P.X0 ], color = [ '1' ], lorentz = [ L.SSS1 ], couplings = {(0,0):C.GC_98}) V_2 = Vertex(name = 'V_2', particles = [ P.X0, P.X0, P.X0, P.X0 ], color = [ '1' ], lorentz = [ L.SSSS1 ], couplings = {(0,0):C.GC_33}) V_3 = Vertex(name = 'V_3', particles = [ P.a, P.a, P.X0 ], color = [ '1' ], lorentz = [ L.VVS3, L.VVS6 ], couplings = {(0,0):C.GC_61,(0,1):C.GC_9}) V_4 = Vertex(name = 'V_4', particles = [ P.g, P.g, P.X0 ],
# This file was automatically created by FeynRules $Revision: 302 $ # Mathematica version: 7.0 for Mac OS X x86 (64-bit) (November 11, 2008) # Date: Tue 31 Aug 2010 16:54:46 from object_library import all_vertices, Vertex import particles as P import couplings as C import lorentz as L V_1 = Vertex(name='V_1', particles=[P.H, P.H, P.H], color=['1'], lorentz=[L.SSS1], couplings={(0, 0): C.GC_21}) V_2 = Vertex(name='V_2', particles=[P.G, P.G, P.G], color=['f(1,2,3)'], lorentz=[L.VVV1], couplings={(0, 0): C.GC_4}) V_3 = Vertex(name='V_3', particles=[P.G, P.G, P.G, P.G], color=[ 'f(2,3,\'a1\')*f(\'a1\',1,4)', 'f(2,4,\'a1\')*f(\'a1\',1,3)', 'f(3,4,\'a1\')*f(\'a1\',1,2)' ], lorentz=[L.VVVV1, L.VVVV3, L.VVVV4], couplings={ (1, 1): C.GC_6, (2, 0): C.GC_6,
# This file was automatically created by FeynRules 2.3.29 # Mathematica version: 11.0.0 for Linux x86 (64-bit) (July 28, 2016) # Date: Mon 10 Dec 2018 13:04:26 from object_library import all_vertices, Vertex import particles as P import couplings as C import lorentz as L V_1 = Vertex(name = 'V_1', particles = [ P.H, P.H, P.H, P.H ], color = [ '1' ], lorentz = [ L.SSSS2 ], couplings = {(0,0):C.GC_36}) V_2 = Vertex(name = 'V_2', particles = [ P.H, P.H, P.H ], color = [ '1' ], lorentz = [ L.SSS2 ], couplings = {(0,0):C.GC_60}) V_3 = Vertex(name = 'V_3', particles = [ P.ghG, P.ghG__tilde__, P.g ], color = [ 'f(1,2,3)' ], lorentz = [ L.UUV2 ], couplings = {(0,0):C.GC_6}) V_4 = Vertex(name = 'V_4', particles = [ P.g, P.g, P.g ],