Your search keyword '"Vicenzo, Massimo"' showing total 4 results

1. Acyclic List Colouring Locally Planar Graphs

Author

Postle, Luke, Smith-Roberge, Evelyne, and Vicenzo, Massimo

Subjects

Mathematics - Combinatorics

Abstract

A (vertex) colouring of graph is \emph{acyclic} if it contains no bicoloured cycle. In 1979, Borodin proved that planar graphs are acyclically 5-colourable. In 2010, Kawarabayashi and Mohar proved that locally planar graphs are acyclically 7-colourable. In 2002, Borodin, Fon-Der-Flaass, Kostochka, Raspaud, and Sopena proved that planar graphs are acyclically 7-list-colourable. We prove that locally planar graphs are acyclically 9-list-colourable\textemdash no bound for acyclic list colouring locally planar graphs for any fixed number of colours was previously known., Comment: 19 pages, 4 figures

Published

2024

2. An Algorithm to Recover Shredded Random Matrices

Author

Atamanchuk, Caelan, Devroye, Luc, and Vicenzo, Massimo

Subjects

Mathematics - Probability, Computer Science - Discrete Mathematics, Computer Science - Data Structures and Algorithms, Mathematics - Combinatorics, 60C05 (Primary) 68Q25 (Secondary)

Abstract

Given some binary matrix $M$, suppose we are presented with the collection of its rows and columns in independent arbitrary orderings. From this information, are we able to recover the unique original orderings and matrix? We present an algorithm that identifies whether there is a unique ordering associated with a set of rows and columns, and outputs either the unique correct orderings for the rows and columns or the full collection of all valid orderings and valid matrices. We show that there is a constant $c > 0$ such that the algorithm terminates in $O(n^2)$ time with high probability and in expectation for random $n \times n$ binary matrices with i.i.d.\ Bernoulli $(p)$ entries $(m_{ij})_{ij=1}^n$ such that $\frac{c\log^2(n)}{n(\log\log(n))^2} \leq p \leq \frac{1}{2}$.

Published

2023

3. AN ALGORITHM TO RECOVER SHREDDED RANDOM MATRICES.

Author

ATAMANCHUK, CAELAN, DEVROYE, LUC, and VICENZO, MASSIMO

Subjects

COMBINATORICS, RANDOM matrices, MATRICES (Mathematics), ALGORITHMS, PROBABILITY theory

Abstract

Given some binary matrix M, suppose we are presented with the collection of its rows and columns in independent arbitrary orderings. From this information, are we able to recover the unique original orderings and matrix? We present an algorithm that identifies whether there is a unique ordering associated with a set of rows and columns, and outputs either the unique correct orderings for the rows and columns or the full collection of all valid orderings and valid matrices. We show that there is a constant c>0 such that the algorithm terminates in O(n²) time with high probability and in expectation for random n×n binary matrices with i.i.d. entries (mij)nij=1 such that P(mi⁢j=1)=p and c⁢log²⁡(n)/n⁢(log⁡log⁡(n))² ≤p≤1/2.. [ABSTRACT FROM AUTHOR]

Published

2024

4. Il Mesolitico

Author

Fontana, Federica and Raiteri Luca Vicenzo Massimo

Subjects

Socio-culturale

Published

2017