Regular 3-polytopes of type \n,n\
Abstract
For each integer \( n ≥ 3 \), we construct a self-dual regular 3-polytope \( P \) of type \( \n, n\ \) with \( 2n n \) flags, resolving two foundamental open questions on the existence of regular polytopes with certain Schl\"afli types. The automorphism group \( Aut(P) \) is explicitly realized as the semidirect product \( F2n-1 D2n \), where \( D2n \) is the dihedral group of order \( 2n \), with a complete presentation for \( Aut(P) \) is provided. This advances the systematic construction of regular polytopes with prescribed symmetries.
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