Titlebook: Combinatorial and Additive Number Theory IV; CANT, New York, USA, Melvyn B. Nathanson Conference proceedings 2021 The Editor(s) (if applica

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neutralize

A Conjectural Inequality for Visible Points in Lattice Parallelograms,nd straightforward) results for .(.,?.). The most interesting aspects of the paper are in Section 5 where we discuss some numerics and display some graphs of .(.,?.)/.. (These graphs resemble an integral sign that has been rotated counter-clockwise by ..) The numerics and graphs suggest the conjecture that for ., .(.,?.)/. satisfies the inequality

glomeruli

Representing Sequence Subsums as Sumsets of Near Equal Sized Sets,result, or when applying sumset results to study . (e.g., [.]). We also give an extension increasing the flexibility of the aforementioned partitioning result and prove some stronger results when . is very large.

琺瑯

2194-1009 rial and discrete geometry, and?Ramsey theory. This selection of articles will be of relevance to both researchers?and graduate students interested in current progress in number theory..978-3-030-67998-9978-3-030-67996-5Series ISSN 2194-1009 Series E-ISSN 2194-1017

Climate

2194-1009 a wide variety of topicsThis is the fourth in a series of proceedings of the Combinatorial and Additive Number Theory (CANT) conferences, based on talks from the 2019 and 2020?workshops at the City University of New York. The latter was held online due to?the COVID-19 pandemic, and featured speakers

嫌惡

嫌惡

Intrinsic Characterization of Representation Functions and Generalizations,mber . lies or does not lie in ., and the counting function .(.), which gives the number of elements . of . satisfying .. We then generalize to representation functions as sums of more than two elements of ..

Munificent

引起

Conference proceedings 20210?workshops at the City University of New York. The latter was held online due to?the COVID-19 pandemic, and featured speakers from North and South America,?Europe, and Asia. The 2020 Zoom conference was the largest CANT conference in?terms of the number of both lectures and participants..These proc

拱形面包

Vytautas ?tuikys,Renata Burbait?show that such pairs exist and give the first explicit construction of these pairs. The constructions also satisfy a number of algebraic properties. Further, we prove that for any ., the group . admits infinitely many automorphisms such that for each such automorphism ., there exists a subset . of . such that . and . form a co-minimal pair.