Add to ORKGPach's selection theorem asserts that for any positive integer $d$ there exists a constant $c_d > 0$ such that for any positive integer $n$ and any finite sets $X_1, ..., X_{d+1} in \mathbb{R}^d$ each with $n$ points there exist disjoint subsets $Z_1, ..., Z_{d+1}, Z_i$ is a subset of $X_i$ and a point $z$ such that $z$ belongs to any rainbow $(Z_1, ..., Z_{d+1})$-simplex; that is, a convex hull of points $z_1, ..., z_{d+1}$ where $z_i$ belongs to $Z_i$. Although the topological method is a valuable tool for improving the bounds for certain selection theorems (introduced by Gromov), we prove that Pach's theorem does not admit a topological extension. Joint work with Imre B\'ar\'any, Roy Meshulam and Eran Nevo.Non UBCUnreviewedAuthor affili...
1 Definitions and notation Let A and B be given families of subsets of some set S. Then the followin...
AbstractGiven a relation Ω:X→Y between topological spaces, we inquire whether it has a constant sele...
Radon's Theorem: If A is a set of d + 2 points in R d , then there are disjoint subsets A 1 ...
Let U1,…,Ud+1 be n-element sets in Rd . Pach’s selection theorem says that there exist subsets ...
We estimate the selection constant in the following geometric selection theorem by Pach: For every p...
We estimate the selection constant in the following geometric selection theorem by Pach: For every p...
Pach showed that every d+1 sets of points Q_1,..,Q_{d+1} in R^d contain linearly-sized subsets P_i i...
G. Gruenhage gave a characterization of paracompactness of locally compact spaces in terms of game t...
We survey some of the major open problems involving selection principles, diagonalizations, and cove...
AbstractIt is demonstrated that the hyperspace of at most (n+1)-point sets has a Vietoris continuous...
The study of selection principles in mathematics is the study of diagonalization processes. In this ...
The study of selection principles in mathematics is the study of diagonalization processes. In this ...
Abstract. G. Gruenhage gave a characterization of paracompact-ness of locally compact spaces in term...
The study of selection principles in mathematics is the study of diagonalization processes. In this ...
Every (continuous) selection for the non-empty 2-point subsets of a space X naturally defines an int...
1 Definitions and notation Let A and B be given families of subsets of some set S. Then the followin...
AbstractGiven a relation Ω:X→Y between topological spaces, we inquire whether it has a constant sele...
Radon's Theorem: If A is a set of d + 2 points in R d , then there are disjoint subsets A 1 ...
Let U1,…,Ud+1 be n-element sets in Rd . Pach’s selection theorem says that there exist subsets ...
We estimate the selection constant in the following geometric selection theorem by Pach: For every p...
We estimate the selection constant in the following geometric selection theorem by Pach: For every p...
Pach showed that every d+1 sets of points Q_1,..,Q_{d+1} in R^d contain linearly-sized subsets P_i i...
G. Gruenhage gave a characterization of paracompactness of locally compact spaces in terms of game t...
We survey some of the major open problems involving selection principles, diagonalizations, and cove...
AbstractIt is demonstrated that the hyperspace of at most (n+1)-point sets has a Vietoris continuous...
The study of selection principles in mathematics is the study of diagonalization processes. In this ...
The study of selection principles in mathematics is the study of diagonalization processes. In this ...
Abstract. G. Gruenhage gave a characterization of paracompact-ness of locally compact spaces in term...
The study of selection principles in mathematics is the study of diagonalization processes. In this ...
Every (continuous) selection for the non-empty 2-point subsets of a space X naturally defines an int...
1 Definitions and notation Let A and B be given families of subsets of some set S. Then the followin...
AbstractGiven a relation Ω:X→Y between topological spaces, we inquire whether it has a constant sele...
Radon's Theorem: If A is a set of d + 2 points in R d , then there are disjoint subsets A 1 ...