Probabilistic Bounds on the Number of Elements to Generate Finite Nilpotent Groups and Their Applications

Abstract

This work establishes a new probabilistic bound on the number of elements to generate finite nilpotent groups. Let k(G) denote the probability that k random elements generate a finite nilpotent group G. For any 0 < ε < 1, we prove that k(G) 1 - ε if k rank(G) + 2(2/ε) (a bound based on the group rank) or if k len(G) + 2(1/ε) (a bound based on the group chain length). Moreover, these bounds are shown to be nearly tight. Both bounds sharpen the previously known requirement of k 2 |G| + 2(1/ε) + 2. Our results provide a foundational tool for analyzing probabilistic algorithms, enabling a better estimation of the iteration count for the finite Abelian hidden subgroup problem (AHSP) standard quantum algorithm and a reduction in the circuit repetitions required by Regev's factoring algorithm.

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