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15 February 2023

  • curprev 11:2711:27, 15 February 2023Admin talk contribs 1,173 bytes +1,173 Created page with "{{DISPLAYTITLE:3-OV (Orthogonal Vectors)}} == Description == Given 3 sets of $d$-dimensional vectors $A_1, A_2, A_3$, each of size $n$, does there exist $a_1 \in A_1, a_2 \in A_2, a_3 \in A_3$ such that $a_1 * a_2 * a_3 = 0$? == Related Problems == Generalizations: k-OV Related: OV, Unbalanced OV == Parameters == <pre>$n$: number of vectors per set $d$: dimension of each vector; $d = omega(log(n))$</pre> == Table of Algorithms == Currently no algo..."
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