1. notice
  3. English
  5. logic-topic
  6. 1. logic
  7. 2. basic
  8. 3. map
  9. 4. order
  10. 5. combinatorics
  12. calculus
  13. 6. real-numbers
  14. 7. limit-sequence
  15. 8. division-algebra
  16. 9. Euclidean-space
  17. 10. Minkowski-space
  18. 11. polynomial
  19. 12. analytic-Euclidean
  20. 13. analytic-struct-operation
  21. 14. ordinary-differential-equation
  22. 15. volume
  23. 16. integral
  24. 17. divergence
  25. 18. limit-net
  26. 19. topology
  27. 20. compact
  28. 21. connected
  29. 22. topology-struct-operation
  30. 23. exponential
  31. 24. angle
  33. geometry
  34. 25. manifold
  35. 26. metric
  36. 27. metric-connection
  37. 28. geodesic-derivative
  38. 29. curvature-of-metric
  39. 30. Einstein-metric
  40. 31. constant-sectional-curvature
  41. 32. simple-symmetric-space
  42. 33. principal-bundle
  43. 34. group
  44. 35. stereographic-projection
  45. 36. Hopf-bundle
  47. field-theory
  48. 37. point-particle-non-relativity
  49. 38. point-particle-relativity
  50. 39. scalar-field
  51. 40. scalar-field-current
  52. 41. scalar-field-non-relativity
  53. 42. projective-lightcone
  54. 43. spacetime-momentum-spinor-representation
  55. 44. Lorentz-group
  56. 45. spinor-field
  57. 46. spinor-field-current
  58. 47. electromagnetic-field
  59. 48. Laplacian-of-tensor-field
  60. 49. Einstein-metric
  61. 50. interaction
  62. 51. harmonic-oscillator-quantization
  63. 52. spinor-field-misc
  64. 53. reference
  66. 中文
  67. 54. notice
  69. 逻辑
  70. 55. 逻辑
  71. 56. 基础
  72. 57. 映射
  73. 58. 序
  74. 59. 组合
  76. 微积分
  77. 60. 实数
  78. 61. 数列极限
  79. 62. 可除代数
  80. 63. Euclidean 空间
  81. 64. Minkowski 空间
  82. 65. 多项式
  83. 66. 解析 (Euclidean)
  84. 67. 解析 struct 的操作
  85. 68. 常微分方程
  86. 69. 体积
  87. 70. 积分
  88. 71. 散度
  89. 72. 网极限
  90. 73. 拓扑
  91. 74. 紧致
  92. 75. 连通
  93. 76. 拓扑 struct 的操作
  94. 77. 指数函数
  95. 78. 角度
  97. 几何
  98. 79. 流形
  99. 80. 度规
  100. 81. 度规的联络
  101. 82. Levi-Civita 导数
  102. 83. 度规的曲率
  103. 84. Einstein 度规
  104. 85. 常截面曲率
  105. 86. simple-symmetric-space
  106. 87. 主丛
  107. 88. 群
  108. 89. 球极投影
  109. 90. Hopf 丛
  111. 场论
  112. 91. 非相对论点粒子
  113. 92. 相对论点粒子
  114. 93. 纯量场
  115. 94. 纯量场的守恒流
  116. 95. 非相对论纯量场
  117. 96. 光锥射影
  118. 97. 时空动量的自旋表示
  119. 98. Lorentz 群
  120. 99. 旋量场
  121. 100. 旋量场的守恒流
  122. 101. 电磁场
  123. 102. 张量场的 Laplacian
  124. 103. Einstein 度规
  125. 104. 相互作用
  126. 105. 谐振子量子化
  127. 106. 旋量场杂项
  128. 107. 参考

note-math

One argument for the rationality of the action principle is its simplicity: by simply adding connections and then adding actions, one can obtain interaction equations without having to guess how matter, electromagnetic fields, and gravitational fields interact.

However, why the addition of actions is used, and whether the resulting interaction equations truly correspond to real phenomena, are not solved here …

Spinor fields, scalar fields, gauge fields, gravitational fields (Einstein-metric), or other fields are coupled in the following ways:

  • Action summation
  • gauge-connection
  • metric-volume-form
  • metric-connection

Varying with respect to 4 sets of variables gives 4 equations

We can set some fields to zero or fix certain fields to obtain partial coupling (for gravity, ==> flat-metric)

In the equation, the 4-current of the field becomes the source of the gauge potential (spinor field 4-current scalar field 4-current point particle 4-current)