Relative second bounded cohomology of free groups
Abstract
This paper is devoted to the computation of the space Hb2(,H;R), where is a free group of finite rank n≥ 2 and H is a subgroup of finite rank. More precisely we prove that H has infinite index in if and only if Hb2(,H;R) is not trivial, and furthermore, if and only if there is an isometric embedding ∞nD(Z) Hb2(,H;R), where D(Z) is the space of bounded alternating functions on Z equipped with the defect norm.
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