Real-time collaboration for Jupyter Notebooks, Linux Terminals, LaTeX, VS Code, R IDE, and more,
all in one place.
Real-time collaboration for Jupyter Notebooks, Linux Terminals, LaTeX, VS Code, R IDE, and more,
all in one place.
| Download
GAP 4.8.9 installation with standard packages -- copy to your CoCalc project to get it
Project: cocalc-sagemath-dev-slelievre
Views: 418384# p6m (p6mm) # http://en.wikipedia.org/wiki/Wallpaper_group#Group_p6m M:=[ [1,2], [1,6], [2,3], [3,5], [5,7], [6,7] ]; C2n := Group( (1,4)(2,3)(5,6) ); #north C2e := Group( (2,6)(3,5) ); #east C2sw := Group( (1,3)(4,6) ); #southwest D12 := Group( (1,4)(2,3)(5,6), (1,3)(4,6) ); #north and southwest D6 := Group( (2,6)(3,5), (1,3)(4,6) ); #east and southwest D4 := Group( (1,4)(2,3)(5,6), (2,6)(3,5) ); #north and east iso := rec( 1 := D12, 2 := C2n, 3 := D4, 5 := C2e, 6 := C2sw, 7 := D6 ); mu := []; dim := 3; # 1: 6 x 94 matrix with rank 5 and kernel dimension 1. Time: 0.000 sec. # 2: 94 x 1446 matrix with rank 86 and kernel dimension 8. Time: 0.004 sec. # 3: 1446 x 27838 matrix with rank 1356 and kernel dimension 90. Time: 0.980 sec. # 4: 27838 x 594246 matrix with rank 26476 and kernel dimension 1362. Time: 401.141 sec. # Cohomology dimension at degree 0: GF(2)^(1 x 1) # Cohomology dimension at degree 1: GF(2)^(1 x 3) # Cohomology dimension at degree 2: GF(2)^(1 x 4) # Cohomology dimension at degree 3: GF(2)^(1 x 6)