Yves Cornulier
Published 2013-05-05Version 1
In this paper, we show that Cremona groups are sofic. We actually introduce a quantitative notion of soficity, called sofic profile, and show that the group of birational transformations of a d-dimensional variety has sofic profile at most polynomial of degree d. We also observe that finitely generated subgroups of the Cremona group have a solvable word problem. This provides examples of finitely generated groups with no embeddings into any Cremona group, answering a question of S. Cantat.
Comments: 20 pages, no figure
Journal: Michigan Math. J. 62(4) (2013) 823-841
Elements generating a proper normal subgroup of the Cremona group
Obstruction to a Higman embedding theorem for residually finite groups with solvable word problem
Public key cryptography based on some extensions of group
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