Free-product plume distribution and recovery modeling prediction in a diesel-contaminated volcanic aquifer

AbstractWe provide some necessary and some sufficient conditions for the automorphism group of a free product of (freely indecomposable, not infinite cyclic) groups to have Property (FA). The additional sufficient conditions are all met by finite groups, and so this case is fully characterised. Therefore, this paper generalises the work of N. Leder [Serre’s Property FA for automorphism groups of free products, preprint (2018), https://arxiv.org/abs/1810.06287v1]. for finite cyclic groups, as well as resolving the open case of that paper.

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The Quotient of a Free Product of Groups by a Single High-Powered Relator. I. Pictures. Fifth and Higher Powers

Proceedings of the London Mathematical Society ◽

10.1112/plms/s3-59.3.507 ◽

1989 ◽

Vol s3-59 (3) ◽

pp. 507-540 ◽

Cited By ~ 14

Author(s):

James Howie

Keyword(s):

Free Product ◽

Free Product Of Groups ◽

Product Of Groups

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Free product von Neumann algebras associated to graphs, and Guionnet, Jones, Shlyakhtenko subfactors in infinite depth

Journal of Functional Analysis ◽

10.1016/j.jfa.2013.09.011 ◽

2013 ◽

Vol 265 (12) ◽

pp. 3305-3324 ◽

Cited By ~ 9

Author(s):

Michael Hartglass

Keyword(s):

Free Product ◽

Von Neumann Algebras ◽

Von Neumann ◽

Infinite Depth

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Free product decompositions in images of certain free products of groups

Journal of Algebra ◽

10.1016/j.jalgebra.2006.08.008 ◽

2007 ◽

Vol 310 (1) ◽

pp. 57-69

Author(s):

N.S. Romanovskii ◽

John S. Wilson

Keyword(s):

Free Product ◽

Free Products ◽

Products Of Groups

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The solution of length three equations over groups

Proceedings of the Edinburgh Mathematical Society ◽

10.1017/s0013091500028108 ◽

1983 ◽

Vol 26 (1) ◽

pp. 89-96 ◽

Cited By ~ 34

Author(s):

James Howie

Keyword(s):

Free Product ◽

Cyclic Group ◽

Normal Closure ◽

Infinite Cyclic Group ◽

Canonical Map ◽

Equations Over Groups

Let G be a group, and let r = r(t) be an element of the free product G * 〈G〉 of G with the infinite cyclic group generated by t. We say that the equation r(t) = 1 has a solution in G if the identity map on G extends to a homomorphism from G * 〈G〉 to G with r in its kernel. We say that r(t) = 1 has a solution over G if G can be embedded in a group H such that r(t) = 1 has a solution in H. This property is equivalent to the canonical map from G to 〈G, t|r〉 (the quotient of G * 〈G〉 by the normal closure of r) being injective.

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