On discrete values of bilinear forms
arXiv:1512.02670
Abstract
This paper is an erratum to our paper, entitled "On an application of Guth-Katz theorem", Math. Res. Lett. 18 (2011), no. 4, 691-697. Let $F$ be the real or complex field and $Ï$ a non-degenerate skew-symmetric bilinear form in the plane $F^2$. We prove that for finite a point set $P\subset F^2\setminus\{0\}$, the set $T_Ï(P)$ of nonzero values of $Ï$ in $P\times P$, if nonempty, has cardinality $Ω(N^{9/13}).$ A presumably near-sharp estimate $Ω(N/\log N)$ was claimed in the abovemnetioned paper over the reals for a symmetric or skew-symmetric form $Ï$. However, the set-up for the proof was flawed. We discuss why we believe that justifying this claim in full strength is a major open problem. In the special case when $P=A\times A$, where $A$ is a set of at least two reals, we establish the following sum-product type estimates: $$ |AA+ AA|= Ω\left(|A|^{19/12}\right), $$ and $$|AA-AA|= Ω\left( \frac{|A|^{26/17}}{\log^{2/17}|A|}\right).$$
13pp