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89: 35:, although the distinction between the fundamental and the antifundamental representation is a matter of convention. However, these two are often non-equivalent, because each of them is a 130: 149: 123: 154: 116: 67: 32: 36: 96: 20: 63: 57: 100: 143: 17: 28: 88: 104: 124: 8: 62:, Cambridge University Press, p. 492, 131: 117: 56:Burgess, Cliff; Moore, Guy (2006-12-07), 48: 7: 85: 83: 150:Representation theory of Lie groups 14: 87: 31:is the complex conjugate of the 25:antifundamental representation 1: 103:. You can help Knowledge by 59:The Standard Model: A Primer 155:Differential geometry stubs 171: 82: 33:fundamental representation 99:-related article is a 37:complex representation 97:differential geometry 21:differential geometry 112: 111: 162: 133: 126: 119: 91: 84: 74: 72: 53: 170: 169: 165: 164: 163: 161: 160: 159: 140: 139: 138: 137: 80: 78: 77: 70: 55: 54: 50: 45: 12: 11: 5: 168: 166: 158: 157: 152: 142: 141: 136: 135: 128: 121: 113: 110: 109: 92: 76: 75: 68: 47: 46: 44: 41: 13: 10: 9: 6: 4: 3: 2: 167: 156: 153: 151: 148: 147: 145: 134: 129: 127: 122: 120: 115: 114: 108: 106: 102: 98: 93: 90: 86: 81: 71: 69:9781139460460 65: 61: 60: 52: 49: 42: 40: 38: 34: 30: 26: 22: 19: 105:expanding it 94: 79: 58: 51: 24: 15: 18:mathematics 144:Categories 43:References 29:Lie group 66:  95:This 27:of a 23:, an 101:stub 64:ISBN 16:In 146:: 39:. 132:e 125:t 118:v 107:. 73:.