Well-partial orders, and the ordinal invariants used to measure them, are relevant in set theory, program verification, proof theory and many other areas of computer science and mathematics. In this article we focus on a common data structure in programming, finite multisets of some well partial order. There are two natural orders one can define on the set of finite multisets of a partial order: the multiset embedding and the multiset ordering. Though the maximal order type of these orders is already known, other ordinal invariants remain mostly unknown. Our main contributions are expressions to compute compositionally the width of the multiset embedding and the height of the multiset ordering. Furthermore, we provide a new ordinal invarian...
We solve the Dynamic Ehrenfeucht-Fra\"iss\'e Game on linear orders for both players, yielding a norm...
Kruskal claims in his now-classical 1972 paper [47] that well-partial-orders are among the most freq...
Abstract. Ordinary computations can be characterised by register machines working with natural numbe...
We investigate the ordinal invariants height, length, and width of well quasi orders (WQO), with par...
We give a sharpening of a recent result of Aschenbrenner and Pong about the maximal order type of th...
International audienceWe present a collection of formalized results about finite nested multisets, d...
The paper focuses on the structure of fundamental sequences of ordinals smaller than $e$. A first re...
International audienceWe investigate the ordinal invariants height, length, and width of well quasi ...
We present a collection of formalized results about finite nested multisets, developed using the Isa...
Series Encyclopedia of Mathematics and Its Applications (No. 144)Ordered sets are ubiquitous in math...
We present a collection of formalized results about finite nested multisets, developed using the Isa...
"Ordered sets are ubiquitous in mathematics and have significant applications in computer science, s...
We propose some convenient notations for expressing complicated properties of finite and infinite, o...
AbstractIt is well known that the collection N of finite series-parallel posets is well-quasi-ordere...
In this article we characterize a countable ordinal known as the big Veblen number in terms of natur...
We solve the Dynamic Ehrenfeucht-Fra\"iss\'e Game on linear orders for both players, yielding a norm...
Kruskal claims in his now-classical 1972 paper [47] that well-partial-orders are among the most freq...
Abstract. Ordinary computations can be characterised by register machines working with natural numbe...
We investigate the ordinal invariants height, length, and width of well quasi orders (WQO), with par...
We give a sharpening of a recent result of Aschenbrenner and Pong about the maximal order type of th...
International audienceWe present a collection of formalized results about finite nested multisets, d...
The paper focuses on the structure of fundamental sequences of ordinals smaller than $e$. A first re...
International audienceWe investigate the ordinal invariants height, length, and width of well quasi ...
We present a collection of formalized results about finite nested multisets, developed using the Isa...
Series Encyclopedia of Mathematics and Its Applications (No. 144)Ordered sets are ubiquitous in math...
We present a collection of formalized results about finite nested multisets, developed using the Isa...
"Ordered sets are ubiquitous in mathematics and have significant applications in computer science, s...
We propose some convenient notations for expressing complicated properties of finite and infinite, o...
AbstractIt is well known that the collection N of finite series-parallel posets is well-quasi-ordere...
In this article we characterize a countable ordinal known as the big Veblen number in terms of natur...
We solve the Dynamic Ehrenfeucht-Fra\"iss\'e Game on linear orders for both players, yielding a norm...
Kruskal claims in his now-classical 1972 paper [47] that well-partial-orders are among the most freq...
Abstract. Ordinary computations can be characterised by register machines working with natural numbe...