Transversal Difference Numbers in Finite Abelian Quotients

Abstract

Given \(H≤ G\) finite abelian groups, a transversal \(T⊂eq G\) for \(G/H\) has fixed size \(|G/H|\), but its ambient difference support \(D(T)=T-T\) can vary with the embedding of \(H\) in \(G\). We call δ(G,H)=T |D(T)| the transversal difference number of the pair \((G,H)\). This invariant is related to finite abelian factorisation, tiling complements, and small-sumset questions, and is motivated by recent work regarding ambient Galois labels in CRT transforms for cyclotomic-subfield homomorphic encryption. We prove various results regarding this invariant, including a general lower bound δ(G,H)≥ 2|G/H|-m(G,H), where \(m(G,H)\) is the largest order of a subgroup of \(G\) disjoint from \(H\). The bound is sharp for cyclic quotients, and Kneser's theorem gives a cross-transversal estimate leading to exact product families with one nonsplit cyclic coordinate and arbitrary split factors. These results isolate the first genuinely new residual obstruction, namely the same-prime square plane \[ G=( Z/p2 Z)2, H=pG. \] For odd \(p\), this case is the technical core of the paper. Here transversals are graphs of functions \( Fp2 Fp2\), and \(D(T)\) decomposes into carry-corrected finite-field derivative images. We conjecture that \[ δ(G,H)=(2p-1)2 \] for all odd primes \(p\), prove the unconditional lower bound \(3p2-p-1\), and give small-prime, probabilistic, and fixed-polynomial evidence for the conjecture.