Erratum to: On odd rank integral quadratic forms: canonical representatives of projective classes and explicit construction of integral classes with square-free determinant

Let \(g\) be an integral quadratic form of rank \(n=2m+1\) and \(p\) a prime number such that \(p^{2}\) divides \(\Delta =\det g\). Then there is an integral \(n\times n\) matrix \(T\) and a rank \(n\) integral quadratic form \(E\) such that \( \det T=p^{mk}\) andwhere \(k\) is 1 or 2.

Assume that \(g\) has the maximal number \(c\) of rows (and columns) divisible by \(p\) inside its integral class (say, the first \(c\) rows and columns of \(g\)). If \(c=1\) then, by Lemma 4 in the original article, the first row and column of \(g\) is superdivisible by \(p\). Then \(T=\langle 1,p,p,\ldots ,p\rangle \) has \(\det T=p^{2m}\) andwhere \(E\) is integral, which completes the proof in case \(c=1\). If \(c=n\) the result is trivial. We next assume \(1<c<n\). Let \(h\) be the \((n-c)\)-form obtained by deleting the first \(c\) rows and columns of \(g\). Then \(p\not \mid \det h\). Otherwise, by Lemma 4 again, there would be an integral \( (n-c)\times (n-c)\) matrix \(S\) with \(\det S=\pm 1\) such that \(S^{t}hS\) has a row divisible by \(p\). Then, denoting the rank \(c\) identity matrix by \(I_{c}\), the formis integrally equivalent to \(g\) and has more than \(c\) rows divisible by \(p\), which is impossible. By Lemma 1 applied to the rank \((n-c)\) form \(h\), where \(c=2e\) or \(c=2e+1\), \(e\ge 1\), there is an integral \((n-c)\times (n-c)\) matrix \(R\) such that \(\det R=p^{m-e+1}\) and \(R^{t}hR=pE_{1}\), where \( E_{1}\) is integral. Set \(T=I_{c}\oplus R\). Then \(\det T=p^{m-e+1}\), \(m\ge m-e+1\), andwhere \(E\) is integral. This completes the proof of Corollary 13. \(\square \)