Stack Exchange network consists of 183 Q&A communities including Stack Overflow, the largest, most trusted online community for developers to learn, share their knowledge, and build their careers.
Suppose we have $n$ points $P$ and $m$ circles $C$ in the plane. Let $I(P,C)=\{(p,c), p \in P, c \in C, p \in c\}.$ Then what do we know about
${max}_{m,n} |I(P,C)|$$\max_{m,n} |I(P,C)|$?
Any references?
Suppose we have $n$ points $P$ and $m$ circles $C$ in the plane. Let $I(P,C)=\{(p,c), p \in P, c \in C, p \in c\}.$ Then what do we know about
${max}_{m,n} |I(P,C)|$?
Any references?
Suppose we have $n$ points $P$ and $m$ circles $C$ in the plane. Let $I(P,C)=\{(p,c), p \in P, c \in C, p \in c\}.$ Then what do we know about
$\max_{m,n} |I(P,C)|$?
Incidences between points and circles in the plane
Suppose we have $n$ points $P$ and $m$ circles $C$ in the plane. Let $I(P,C)=\{(p,c), p \in P, c \in C, p \in c\}.$ Then what do we know about
${max}_{m,n} |I(P,C)|$?
