Add to ORKGA long standing conjecture of Richter and Thomassen states that the total number of intersection points between any n simple closed Jordan curves in the plane, so that any two of them intersect and no three curves pass through the same point, is at least (1-O (1))n2. We confirm the above conjecture in several important cases, including the case (1) when all curves are convex, and (2) when the family of curves can be partitioned into two equal classes such that each curve from the first class is touching every curve from the second class. (Two curves are said to be touching if they have precisely one point in common, at which they do not properly cross.) An important ingredient of our proofs is the following statement: Let S be a family of t...
Given a set of planar curves (Jordan arcs), each pair of which meets — either crosses or touches — e...
AbstractLet C be a family of n convex bodies in the plane, which can be decomposed into k subfamilie...
By a curve in Rd we mean a continuous map γ: I → Rd, where I ⊂ R is a closed interval. We call a cur...
A long-standing conjecture of Richter and Thomassen states that the total number of intersection poi...
If two closed Jordan curves in the plane have precisely one point in common, then it is called a tou...
A long standing conjecture of Richter and Thomassen states that the total number of in-tersection po...
If two Jordan curves in the plane have precisely one point in common, and there they do not properly...
Given n continuous open curves in the plane, we say that a pair is touching if they have only one in...
Given n continuous open curves in the plane, we say that a pair is touching if they have finitely ma...
\u3cp\u3eGiven a set of planar curves (Jordan arcs), each pair of which meets — either crosses or to...
A collection of simple closed Jordan curves in the plane is called a family of pseudo-circles if any...
Given n continuous open curves in the plane, we say that a pair is touching if they have only one in...
Given a set of planar curves (Jordan arcs), each pair of which meets — either crosses or touches — e...
Let (K 1 , 2 ) be two families of closed curves on a surface S, such that |= m,|K 2 |=n,m ...
Given n continuous open curves in the plane, we say that a pair is touching if they have only one in...
Given a set of planar curves (Jordan arcs), each pair of which meets — either crosses or touches — e...
AbstractLet C be a family of n convex bodies in the plane, which can be decomposed into k subfamilie...
By a curve in Rd we mean a continuous map γ: I → Rd, where I ⊂ R is a closed interval. We call a cur...
A long-standing conjecture of Richter and Thomassen states that the total number of intersection poi...
If two closed Jordan curves in the plane have precisely one point in common, then it is called a tou...
A long standing conjecture of Richter and Thomassen states that the total number of in-tersection po...
If two Jordan curves in the plane have precisely one point in common, and there they do not properly...
Given n continuous open curves in the plane, we say that a pair is touching if they have only one in...
Given n continuous open curves in the plane, we say that a pair is touching if they have finitely ma...
\u3cp\u3eGiven a set of planar curves (Jordan arcs), each pair of which meets — either crosses or to...
A collection of simple closed Jordan curves in the plane is called a family of pseudo-circles if any...
Given n continuous open curves in the plane, we say that a pair is touching if they have only one in...
Given a set of planar curves (Jordan arcs), each pair of which meets — either crosses or touches — e...
Let (K 1 , 2 ) be two families of closed curves on a surface S, such that |= m,|K 2 |=n,m ...
Given n continuous open curves in the plane, we say that a pair is touching if they have only one in...
Given a set of planar curves (Jordan arcs), each pair of which meets — either crosses or touches — e...
AbstractLet C be a family of n convex bodies in the plane, which can be decomposed into k subfamilie...
By a curve in Rd we mean a continuous map γ: I → Rd, where I ⊂ R is a closed interval. We call a cur...