On the Growth of Groups and Automorphisms.
We consider the growth functions beta(Gamma)(n) of amalgamated free products Gamma = A *(C) B, where A congruent to B are finitely generated, C is free abelian and \A/C\ = A/B\ = 2. For every d is an element of N there exist examples with beta(Gamma)(n) similar or equal to n(d+1)beta(A)(n). There al...
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| বিন্যাস: | Conference item |
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2005
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| সংক্ষিপ্ত: | We consider the growth functions beta(Gamma)(n) of amalgamated free products Gamma = A *(C) B, where A congruent to B are finitely generated, C is free abelian and \A/C\ = A/B\ = 2. For every d is an element of N there exist examples with beta(Gamma)(n) similar or equal to n(d+1)beta(A)(n). There also exist examples with beta(Gamma)(n) similar or equal to e(n). Similar behavior is exhibited among Dehn functions. |
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