n = 642 = 2·3·107

Number of selected skew morphism classes of C642 is 0
Total number of skew morphisms of C642 is 848
Total number of skew morphism classes of C642 is 15
Total number of automorphisms of C642 is 212

  1. Skew morphsim class of size 1
  
  of order 2
  with kernel of order 642
  and smallest kernel generator 1
  and power function values [ 1 ]
  and with periodicity 1
  and with complexity 1
  and with auto-order 2
  φ | √φ | φ' | φ2


  2. Skew morphsim class of size 52
  
  of order 53
  with kernel of order 642
  and smallest kernel generator 1
  and power function values [ 1 ]
  and with periodicity 1
  and with complexity 1
  and with auto-order 53
  φ | √φ | φ' | φ53


  3. Skew morphsim class of size 52
  
  of order 106
  with kernel of order 642
  and smallest kernel generator 1
  and power function values [ 1 ]
  and with periodicity 1
  and with complexity 1
  and with auto-order 106
  φ | √φ | φ' | φ106


  4. Skew morphsim class of size 1
  
  of order 2
  with kernel of order 642
  and smallest kernel generator 1
  and power function values [ 1 ]
  and with periodicity 1
  and with complexity 1
  and with auto-order 2
  φ | √φ | φ' | φ2


  5. Skew morphsim class of size 52
  
  of order 106
  with kernel of order 642
  and smallest kernel generator 1
  and power function values [ 1 ]
  and with periodicity 1
  and with complexity 1
  and with auto-order 106
  φ | √φ | φ' | φ106


  6. Skew morphsim class of size 1
  
  of order 2
  with kernel of order 642
  and smallest kernel generator 1
  and power function values [ 1 ]
  and with periodicity 1
  and with complexity 1
  and with auto-order 2
  φ | √φ | φ' | φ2


  7. Skew morphsim class of size 52
  
  of order 106
  with kernel of order 642
  and smallest kernel generator 1
  and power function values [ 1 ]
  and with periodicity 1
  and with complexity 1
  and with auto-order 106
  φ | √φ | φ' | φ106


  8. Skew morphsim class of size 2
  
  of order 3
  with kernel of order 321
  and smallest kernel generator 2
  and power function values [ 1, 2 ]
  and with periodicity 1
  and with complexity 2
  and with auto-order 2
  φ | √φ | φ' | φ|<2>


  9. Skew morphsim class of size 106
  
  of order 107
  with kernel of order 321
  and smallest kernel generator 2
  and power function values [ 1, 106 ]
  and with periodicity 1
  and with complexity 2
  and with auto-order 2
  φ | √φ | φ' | φ|<2>


  10. Skew morphsim class of size 212
  
  of order 321
  with kernel of order 321
  and smallest kernel generator 2
  and power function values [ 1, 320 ]
  and with periodicity 1
  and with complexity 2
  and with auto-order 2
  φ | √φ | φ' | φ|<2>


  11. Skew morphsim class of size 104
  
  of order 159
  with kernel of order 321
  and smallest kernel generator 2
  and power function values [ 1, 107 ]
  and with periodicity 1
  and with complexity 2
  and with auto-order 2
  φ | √φ | φ' | φ|<2>


  12. Skew morphsim class of size 2
  
  of order 6
  with kernel of order 321
  and smallest kernel generator 2
  and power function values [ 1, 5 ]
  and with periodicity 1
  and with complexity 2
  and with auto-order 2
  φ | √φ | φ' | φ|<2>


  13. Skew morphsim class of size 104
  
  of order 318
  with kernel of order 321
  and smallest kernel generator 2
  and power function values [ 1, 107 ]
  and with periodicity 1
  and with complexity 2
  and with auto-order 2
  φ | √φ | φ' | φ|<2>


  14. Skew morphsim class of size 106
  
  of order 214
  with kernel of order 321
  and smallest kernel generator 2
  and power function values [ 1, 213 ]
  and with periodicity 1
  and with complexity 2
  and with auto-order 2
  φ | √φ | φ' | φ|<2>