Optimization with Pattern-Avoiding Input
Identifikátory výsledku
Kód výsledku v IS VaVaI
<a href="https://www.isvavai.cz/riv?ss=detail&h=RIV%2F68407700%3A21240%2F24%3A00375778" target="_blank" >RIV/68407700:21240/24:00375778 - isvavai.cz</a>
Výsledek na webu
<a href="https://doi.org/10.1145/3618260.3649631" target="_blank" >https://doi.org/10.1145/3618260.3649631</a>
DOI - Digital Object Identifier
<a href="http://dx.doi.org/10.1145/3618260.3649631" target="_blank" >10.1145/3618260.3649631</a>
Alternativní jazyky
Jazyk výsledku
angličtina
Název v původním jazyce
Optimization with Pattern-Avoiding Input
Popis výsledku v původním jazyce
Permutation pattern-avoidance is a central concept of both enumerative and extremal combinatorics. In this paper we study the effect of permutation pattern-avoidance on the complexity of optimization problems. In the context of the dynamic optimality conjecture (Sleator, Tarjan, STOC 1983), Chalermsook, Goswami, Kozma, Mehlhorn, and Saranurak (FOCS 2015) conjectured that the amortized search cost of an optimal binary search tree (BST) is constant whenever the search sequence is pattern-avoiding. The best known bound to date is 2α(n)(1+o(1)) recently obtained by Chalermsook, Pettie, and Yingchareonthawornchai (SODA 2024); here n is the BST size and α(.) the inverse-Ackermann function. In this paper we resolve the conjecture, showing a tight (1) bound. This indicates a barrier to dynamic optimality: any candidate online BST (e.g., splay trees or greedy trees) must match this optimum, but current analysis techniques only give superconstant bounds. More broadly, we argue that the easiness of pattern-avoiding input is a general phenomenon, not limited to BSTs or even to data structures. To illustrate this, we show that when the input avoids an arbitrary, fixed, a priori unknown pattern, one can efficiently compute: (1) a k-server solution of n requests from a unit interval, with total cost n(1/logk), in contrast to the worst-case Θ(n/k) bound, and (2) a traveling salesman tour of n points from a unit box, of length (logn), in contrast to the worst-case Θ(root n) bound; similar results hold for the euclidean minimum spanning tree, Steiner tree, and nearest-neighbor graphs. We show both results to be tight. Our techniques build on the Marcus-Tardos proof of the Stanley-Wilf conjecture, and on the recently emerging concept of twin-width.
Název v anglickém jazyce
Optimization with Pattern-Avoiding Input
Popis výsledku anglicky
Permutation pattern-avoidance is a central concept of both enumerative and extremal combinatorics. In this paper we study the effect of permutation pattern-avoidance on the complexity of optimization problems. In the context of the dynamic optimality conjecture (Sleator, Tarjan, STOC 1983), Chalermsook, Goswami, Kozma, Mehlhorn, and Saranurak (FOCS 2015) conjectured that the amortized search cost of an optimal binary search tree (BST) is constant whenever the search sequence is pattern-avoiding. The best known bound to date is 2α(n)(1+o(1)) recently obtained by Chalermsook, Pettie, and Yingchareonthawornchai (SODA 2024); here n is the BST size and α(.) the inverse-Ackermann function. In this paper we resolve the conjecture, showing a tight (1) bound. This indicates a barrier to dynamic optimality: any candidate online BST (e.g., splay trees or greedy trees) must match this optimum, but current analysis techniques only give superconstant bounds. More broadly, we argue that the easiness of pattern-avoiding input is a general phenomenon, not limited to BSTs or even to data structures. To illustrate this, we show that when the input avoids an arbitrary, fixed, a priori unknown pattern, one can efficiently compute: (1) a k-server solution of n requests from a unit interval, with total cost n(1/logk), in contrast to the worst-case Θ(n/k) bound, and (2) a traveling salesman tour of n points from a unit box, of length (logn), in contrast to the worst-case Θ(root n) bound; similar results hold for the euclidean minimum spanning tree, Steiner tree, and nearest-neighbor graphs. We show both results to be tight. Our techniques build on the Marcus-Tardos proof of the Stanley-Wilf conjecture, and on the recently emerging concept of twin-width.
Klasifikace
Druh
D - Stať ve sborníku
CEP obor
—
OECD FORD obor
10201 - Computer sciences, information science, bioinformathics (hardware development to be 2.2, social aspect to be 5.8)
Návaznosti výsledku
Projekt
<a href="/cs/project/EH22_008%2F0004590" target="_blank" >EH22_008/0004590: Robotika a pokročilá průmyslová výroba</a><br>
Návaznosti
P - Projekt vyzkumu a vyvoje financovany z verejnych zdroju (s odkazem do CEP)
Ostatní
Rok uplatnění
2024
Kód důvěrnosti údajů
S - Úplné a pravdivé údaje o projektu nepodléhají ochraně podle zvláštních právních předpisů
Údaje specifické pro druh výsledku
Název statě ve sborníku
STOC 2024: Proceedings of the 56th Annual ACM Symposium on Theory of Computing
ISBN
979-8-4007-0383-6
ISSN
0737-8017
e-ISSN
—
Počet stran výsledku
12
Strana od-do
671-682
Název nakladatele
Association for Computing Machinery
Místo vydání
New York
Místo konání akce
Vancouver
Datum konání akce
24. 6. 2024
Typ akce podle státní příslušnosti
WRD - Celosvětová akce
Kód UT WoS článku
001254099900063