This Wikipedia page currently quotes Bombieri and Vaaler's result on Siegel's lemma:
Suppose we are given a system of $m$ linear equations in $n$ unknowns such that $n>m$, say
$a_{11}x_1+\dots+a_{1n}x_n=0$
$\dots$
$a_{m1}x_1+\dots+a_{mn}x_n=0$
where the coefficients are rational integers, not all $0$, and bounded by $B$. The system then has a solution
$(x_1,x_2,\dots,x_n)$
with the $x$s all rational integers, not all $0$, and bounded by
$(nB)^{m/(n-m)}.$
Bombieri and Vaaler ($1983$) gave the following sharper bound for the $x$'s:
$\max|x_j|\leq\Big(D^{-1}\sqrt{\mathsf{det}(AA^T)}\Big)^{1/(n-m)}$
where $D$ is the greatest common divisor of the $m$ by $m$ minors of the matrix $A$, and $A^T$ is its transpose.
I want to know under what conditions on $A$ we can guarantee an '$\alpha$ - factor gap'. Denote $\Lambda$ to be set of solution vectors $(x_1,\dots,x_n)\in\Bbb Z^n$ for the system ($\Lambda$ is the kernel lattice).
Given $\alpha\in(0,1)$, '$\alpha$ - factor gap' guarantee basically means the inequality $$\alpha\Big(D^{-1}\sqrt{\mathsf{det}(AA^T)}\Big)^{1/(n-m)}\leq\min_{(x_1,\dots,x_n)\in\Lambda}\max|x_j|\leq\Big(D^{-1}\sqrt{\mathsf{det}(AA^T)}\Big)^{1/(n-m)}$$ is satisfied.
Let $\bf{x}_1,\bf{x}_2,\dots,\bf{x}_{n-m}\in\Bbb Z^n$ be full basis (each $\bf{x}_i\in\Bbb Z^n$) for solutions to the system (which is $\Lambda$). That is for every $(x_1,\dots,x_n)\in\Lambda$ there exists $r_1,\dots,r_{n-m}\in\Bbb Z$ such that $$(x_1,\dots,x_n)=r_1\bf{x}_1+\dots+r_{n-m}\bf{x}_{n-m}$$ holds.
At every $i\in\{1,\dots,n-m\}$ let $\lambda_{i,\infty}(\Lambda)$ be the $i$th successive minimum of kernel lattice in the $L^\infty$ norm.
To guarantee an '$\alpha$ - factor gap's is it sufficient to show there is a $T\in\Bbb N$ such that $$\alpha^{n-m}T\leq \prod_{i=1}^{n-m}\lambda_{i,\infty}(\Lambda)\leq T$$ holds where $T$ is some suitable integer in $[0,(n-m)^{\frac{n-m}2}\mathsf{det}(\Lambda)]$?
What is a sufficient condition if 1. does not work out?
Please also refer Bounded version of linear and quadratic Hasse--Minkowski theoremand-quadratic-hasse-minkowski-theorem.
