Problémy diskrétní geometrie / Problems in discrete geometry

Patáková, Zuzana

January 2015

of doctoral thesis Problems in discrete geometry Zuzana Patáková This thesis studies three different questions from discrete geometry. A common theme for these problems is that their solution is based on algebraic methods. First part is devoted to the polynomial partitioning method, which par- titions a given finite point set using the zero set of a suitable polynomial. However, there is a natural limitation of this method, namely, what should be done with the points lying in the zero set? Here we present a general version dealing with the situation and as an application, we provide a new algorithm for the semialgebraic range searching problem. In the second part we study Ramsey functions of semialgebraic predi- cates. Conlon, Fox, Pach, Sudakov, and Suk constructed the first examples of semialgebraic predicates with the Ramsey function bounded from below by a tower function. We reduce the dimension of the ambient space in their construction and as a consequence, we provide a new geometric Ramsey-type theorem with a large Ramsey function. Last part is devoted to reptile simplices. A simplex S is k-reptile if it can be tiled by k simplices with disjoint interiors that are all mutually congruent and similar to S. We show that four-dimensional k-reptile simplices can exist only for k = m2 , where m ≥ 1...

Erdos-Szekeres type theorems / Erdos-Szekeres type theorems

Eliáš, Marek

January 2012

Let P = (p1, p2, . . . , pN ) be a sequence of points in the plane, where pi = (xi, yi) and x1 < x2 < · · · < xN . A famous 1935 Erdős-Szekeres theorem asserts that every such P contains a monotone subsequence S of √ N points. Another, equally famous theorem from the same paper implies that every such P contains a convex or concave subsequence of Ω(log N) points. First we define a (k + 1)-tuple K ⊆ P to be positive if it lies on the graph of a function whose kth derivative is everywhere nonnegative, and similarly for a negative (k + 1)-tuple. Then we say that S ⊆ P is kth-order monotone if its (k + 1)- tuples are all positive or all negative. In this thesis we investigate quantitative bound for the corresponding Ramsey-type result. We obtain an Ω(log(k−1) N) lower bound ((k − 1)-times iterated logarithm). We also improve bounds for related problems: Order types and One-sided sets of hyperplanes. 1

Kombinatorické hry / Combinatorial Games Theory

Valla, Tomáš

January 2012

Title: Combinatorial Games Theory Author: Tomáš Valla Department / Institute: IUUK MFF UK Supervisor: Prof. RNDr. Jaroslav Nešetřil, DrSc., IUUK MFF UK Abstract: In this thesis we study the complexity that appears when we consider the competitive version of a certain environment or process, using mainly the tools of al- gorithmic game theory, complexity theory, and others. For example, in the Internet environment, one cannot apply any classical graph algorithm on the graph of connected computers, because it usually requires existence of a central authority, that manipu- lates with the graph. We describe a local and distributed game, that in a competitive environment without a central authority simulates the computation of the weighted vertex cover, together with generalisation to hitting set and submodular weight func- tion. We prove that this game always has a Nash equilibrium and each equilibrium yields the same approximation of optimal cover, that is achieved by the best known ap- proximation algorithms. More precisely, the Price of Anarchy of our game is the same as the best known approximation ratio for this problem. All previous results in this field do not have the Price of Anarchy bounded by a constant. Moreover, we include the results in two more fields, related to the complexity of competitive...

Metrické prostory se vzdálenostmi z pologrupy / Semigroup-valued metric spaces

Konečný, Matěj

January 2019

The structural Ramsey theory is a field on the boundary of combinatorics and model theory with deep connections to topological dynamics. Most of the known Ramsey classes in finite binary symmetric relational language can be shown to be Ramsey by utilizing a variant of the shortest path completion (e.g. Sauer's S-metric spaces, Conant's generalised metric spaces, Braunfeld's Λ-ultrametric spaces or Cherlin's metrically homogeneous graphs). In this thesis we explore the limits of the shortest path completion. We offer a unifying framework - semigroup-valued metric spaces - for all the aforementioned Ramsey classes and study their Ramsey expansions and EPPA (the extension property for partial automorphisms). Our results can be seen as evidence for the importance of studying the completion problem for amalgamation classes and have some further applications (such as the stationary independence relation). As a corollary of our general theorems, we reprove results of Hubička and Nešetřil on Sauer's S-metric spaces, results of Hubička, Nešetřil and the author on Conant's generalised metric spaces, Braunfeld's results on Λ-ultrametric spaces and the results of Aranda et al. on Cherlin's primitive 3-constrained metrically homogeneous graphs. We also solve several open problems such as EPPA for Λ-ultrametric...