A Smörgåsbord of Skyrmions: index, 1, 2, 3, 4, 5, 6, 7, 8, 9, 10, 11, 12, 13, 14, 15, 16

9a		ε	1.0993 ± 0.0001
		b	0.9999
		r	2.0123
		VD	(2091.6,4258.9,4276.3)
		UD	(348.9,326.6,329.8)
55.0%		sym	C1h
The 7a-Skyrmion with a 2-torus attached to a face.
9b		ε	1.0995 ± 0.0001
		b	0.9999
		r	1.9293
		VD	(2824.6,2846.7,4076.5)
		UD	(340.7,324.8,324.9)
35.0%		sym	D4d [R. A. Battye and P. M. Sutcliffe, Phys. Rev. Lett. 79, 363-366 (1997)]
Fours holes on top and bottom, related by a 45° twist.
9c		ε	1.1003 ± 0.0001
		b	0.9999
		r	1.9311
		VD	(2514.9,3224.4,4020.0)
		UD	(338.9,323.3,327.4)
0.07%		sym	C2v
Symmetric graphene.
9d		ε	1.1014 ± 0.0001
		b	0.9999
		r	2.1861
		VD	(1589.1,5498.4,5585.9)
		UD	(326.0,350.5,350.9)
9.23%		sym	C1h
A chain. Can be thought of as four 2-tori with a single Skyrmion attached on one end, or the 6a-Skyrmion attached to the tetrahedron, or alternatively as the 8a-Skyrmion with a 1-Skyrmion attached to the end.
9e		ε	1.1021 ± 0.0001
		b	0.9999
		r	2.1425
		VD	(1775.4,5035.5,5323.9)
		UD	(359.4,332.6,337.0)
0.21%		sym	C2v
Two cubes in the same orientation joined by a single Skyrmion between them. Note that two cubes in the same orientation placed together are unstable to one of the cubes twisting. The single Skyrmion stabilizes the unstable 8-Skyrmion.
9f		ε	1.1038 ± 0.0001
		b	0.9999
		r	1.9111
		VD	(3200.3,3202.0,3204.9)
		UD	(331.6,331.5,331.5)
0.55%		sym	Td [R. A. Battye and P. M. Sutcliffe, Phys. Rev. Lett. 79, 363-366 (1997)]
Tetrahedrally symmetric. Can be described in the rational map approximation.