A short proof of Kneser's addition theorem for abelian groups
Abstract
Martin Kneser proved the following addition theorem for every abelian group G. If A,B ⊂eq G are finite and nonempty, then |A+B| |A+K| + |B+K| - |K| where K = \g ∈ G g+A+B = A+B \. Here we give a short proof of this based on a simple intersection union argument.
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