Adam Piggott
Published 2005-04-20, updated 2005-04-26Version 2
The centrepiece of this paper is a normal form for primitive elements which facilitates the use of induction arguments to prove properties of primitive elements. The normal form arises from an elementary algorithm for constructing a primitive element p in F(x, y) with a given exponent sum pair (X, Y), if such an element p exists. Several results concerning the primitive elements of F(x, y) are recast as applications of the algorithm and the normal form.
Comments: 12 pages. Replaces old version (apologies for uploading wrong version) which contained an error in the statement of Second normal form theorem
Palindromic primitives and palindromic bases in the free group of rank two
Several remarks on groups of automorphisms of free groups
Alternating quotients of free groups
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