Jens Harlander scite author profile

Jens Harlander

5Publications

65Citation Statements Received

64Citation Statements Given

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Affiliations

Boise State University, Goethe University Frankfurt, Western Kentucky University

Publications

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Exotic relation modules and homotopy types for certain 1–relator groups

Harlander

Jensen

2006

Algebr. Geom. Topol.

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Using stably free non-free relation modules we construct an infinite collection of 2-dimensional homotopy types, each of Euler-characteristic one and with trefoil fundamental group. This provides an affirmative answer to a question asked by Berridge and Dunwoody [1]. We also give new examples of exotic relation modules. We show that the relation module associated with the generating set {x, y 4 } for the Baumslag-Solitar group x, y | xy 2 x −1 = y 3 is stably free non-free of rank one. 57M20; 57M05

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Injective labeled oriented trees are aspherical

Harlander

Rosebrock

2016

Math. Z.

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Some Aspects of Efficiency

Harlander¹,

Baik²,

Johnson³

et al. 2000

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ON THE FP₃-CONJECTURE FOR METABELIAN GROUPS

Bieri

Harlander

2001

J. Lond. Math. Soc.

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Closing the Relation Gap by Direct Product Stabilization

Harlander

1996

Journal of Algebra

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The generation gap of a group G is the difference between the minimal number of generators of G and the rank of the augmentation ideal. The relation gap of a presentation FrN is the difference between the minimal number of elements that generate N as a normal subgroup and the minimal number of G-module generaw x tors of the relation module Nr N, N . We show that if G is a finitely presented group then there exists n such that G = Ł n Z , Z being the cyclic group of is 1 p p order p, has zero generation and zero relation gap. We apply this result to questions concerning the efficiency of finite groups. ᮊ

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Jens Harlander

Exotic relation modules and homotopy types for certain 1–relator groups

Injective labeled oriented trees are aspherical

Some Aspects of Efficiency

ON THE FP₃-CONJECTURE FOR METABELIAN GROUPS

Closing the Relation Gap by Direct Product Stabilization

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Jens Harlander

Exotic relation modules and homotopy types for certain 1–relator groups

Injective labeled oriented trees are aspherical

Some Aspects of Efficiency

ON THE FP3-CONJECTURE FOR METABELIAN GROUPS

Closing the Relation Gap by Direct Product Stabilization

Contact Info

Product

Resources

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ON THE FP₃-CONJECTURE FOR METABELIAN GROUPS