Number of selected skew morphism classes of C1758 is 0
Total number of skew morphisms of C1758 is 2336
Total number of skew morphism classes of C1758 is 21
Total number of automorphisms of C1758 is 584

1. Skew morphsim class of size 1
     
     of order 1
     with kernel of order 1758
     and smallest kernel generator 1
     and power function values [ 1 ]
     and with periodicity 1
     and with complexity 0
     and with auto-order 1758
     φ | √φ | φ' | φ|<1758>
   
   

2. Skew morphsim class of size 1
     
     of order 2
     with kernel of order 1758
     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
   
   

3. Skew morphsim class of size 72
     
     of order 73
     with kernel of order 1758
     and smallest kernel generator 1
     and power function values [ 1 ]
     and with periodicity 1
     and with complexity 1
     and with auto-order 73
     φ | √φ | φ' | φ73
   
   

4. Skew morphsim class of size 72
     
     of order 146
     with kernel of order 1758
     and smallest kernel generator 1
     and power function values [ 1 ]
     and with periodicity 1
     and with complexity 1
     and with auto-order 146
     φ | √φ | φ' | φ146
   
   

5. Skew morphsim class of size 1
     
     of order 2
     with kernel of order 1758
     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
   
   

6. Skew morphsim class of size 2
     
     of order 4
     with kernel of order 1758
     and smallest kernel generator 1
     and power function values [ 1 ]
     and with periodicity 1
     and with complexity 1
     and with auto-order 4
     φ | √φ | φ' | φ4
   
   

7. Skew morphsim class of size 72
     
     of order 146
     with kernel of order 1758
     and smallest kernel generator 1
     and power function values [ 1 ]
     and with periodicity 1
     and with complexity 1
     and with auto-order 146
     φ | √φ | φ' | φ146
   
   

8. Skew morphsim class of size 144
     
     of order 292
     with kernel of order 1758
     and smallest kernel generator 1
     and power function values [ 1 ]
     and with periodicity 1
     and with complexity 1
     and with auto-order 292
     φ | √φ | φ' | φ292
   
   

9. Skew morphsim class of size 1
     
     of order 2
     with kernel of order 1758
     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
   
   

10. Skew morphsim class of size 72
      
      of order 146
      with kernel of order 1758
      and smallest kernel generator 1
      and power function values [ 1 ]
      and with periodicity 1
      and with complexity 1
      and with auto-order 146
      φ | √φ | φ' | φ146
    
    

11. Skew morphsim class of size 2
      
      of order 4
      with kernel of order 1758
      and smallest kernel generator 1
      and power function values [ 1 ]
      and with periodicity 1
      and with complexity 1
      and with auto-order 4
      φ | √φ | φ' | φ4
    
    

12. Skew morphsim class of size 144
      
      of order 292
      with kernel of order 1758
      and smallest kernel generator 1
      and power function values [ 1 ]
      and with periodicity 1
      and with complexity 1
      and with auto-order 292
      φ | √φ | φ' | φ292
    
    

13. Skew morphsim class of size 2
      
      of order 3
      with kernel of order 879
      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>
    
    

14. Skew morphsim class of size 292
      
      of order 293
      with kernel of order 879
      and smallest kernel generator 2
      and power function values [ 1, 292 ]
      and with periodicity 1
      and with complexity 2
      and with auto-order 2
      φ | √φ | φ' | φ|<2>
    
    

15. Skew morphsim class of size 584
      
      of order 879
      with kernel of order 879
      and smallest kernel generator 2
      and power function values [ 1, 878 ]
      and with periodicity 1
      and with complexity 2
      and with auto-order 2
      φ | √φ | φ' | φ|<2>
    
    

16. Skew morphsim class of size 2
      
      of order 6
      with kernel of order 879
      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>
    
    

17. Skew morphsim class of size 4
      
      of order 12
      with kernel of order 879
      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>
    
    

18. Skew morphsim class of size 144
      
      of order 219
      with kernel of order 879
      and smallest kernel generator 2
      and power function values [ 1, 74 ]
      and with periodicity 1
      and with complexity 2
      and with auto-order 2
      φ | √φ | φ' | φ|<2>
    
    

19. Skew morphsim class of size 144
      
      of order 438
      with kernel of order 879
      and smallest kernel generator 2
      and power function values [ 1, 293 ]
      and with periodicity 1
      and with complexity 2
      and with auto-order 2
      φ | √φ | φ' | φ|<2>
    
    

20. Skew morphsim class of size 288
      
      of order 876
      with kernel of order 879
      and smallest kernel generator 2
      and power function values [ 1, 293 ]
      and with periodicity 1
      and with complexity 2
      and with auto-order 2
      φ | √φ | φ' | φ|<2>
    
    

21. Skew morphsim class of size 292
      
      of order 586
      with kernel of order 879
      and smallest kernel generator 2
      and power function values [ 1, 585 ]
      and with periodicity 1
      and with complexity 2
      and with auto-order 2
      φ | √φ | φ' | φ|<2>