Word Measures on GLN(q) and Free Group Algebras
Abstract
Fix a finite field K of order q and a word w in a free group F on r generators. A w-random element in GLN(K) is obtained by sampling r independent uniformly random elements g1,…,gr∈ GLN(K) and evaluating w(g1,…,gr). Consider Ew[fix], the average number of vectors in KN fixed by a w-random element. We show that Ew[fix] is a rational function in qN. Moreover, if w=ud with u a non-power, then the limit N∞Ew[fix] depends only on d and not on u. These two phenomena generalize to all stable characters of the groups \ GLN(K)\N. A main feature of this work is the connection we establish between word measures on GLN(K) and the free group algebra K[F]. A classical result of Cohn [1964] and Lewin [1969] is that every one-sided ideal of K[F] is a free K[F]-module with a well-defined rank. We show that for w a non-power, Ew[fix]=2+CqN+O(1q2N), where C is the number of rank-2 right ideals I K[F] which contain w-1 but not as a basis element. We describe a full conjectural picture generalizing this result, featuring a new invariant we call the q-primitivity rank of w. In the process, we prove several new results about free group algebras. For example, we show that if T is any finite subtree of the Cayley graph of F, and I K[F] is a right ideal with a generating set supported on T, then I admits a basis supported on T. We also prove an analogue of Kaplansky's unit conjecture for certain K[F]-modules.
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