Sang June Lee (이상준), On strong Sidon sets of integers

IBS/KAIST Joint Discrete Math Seminar

On strong Sidon sets of integers
Sang June Lee
Duksung Women’s University, Seoul
2019/05/08 Wed 4:30PM-5:30PM (IBS, Room B232)
Let N be the set of natural numbers. A set A⊂N is called a Sidon set if the sums a1+a2, with a1,a2∈S and a1≤a2, are distinct, or equivalently, if
|(x+w)−(y+z)|≥1
for every x,y,z,w∈S with x<y≤z<w. We define strong Sidon sets as follows:</p>

For a constant α with 0≤α<1, a set S⊂N is called an α-strong Sidon set if
|(x+w)−(y+z)|≥wα
for every x,y,z,w∈S with x<y≤z<w.

The motivation of strong Sidon sets is that a strong Sidon set generates many Sidon sets by altering each element a bit. This infers that a dense strong Sidon set will guarantee a dense Sidon set contained in a sparse random subset of N.

In this talk, we are interested in how dense a strong Sidon set can be. This is joint work with Yoshiharu Kohayakawa, Carlos Gustavo Moreira and Vojtěch Rödl.

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