Schnirelmann density: Difference between revisions

Latest revision as of 21:18, 6 May 2009

Definition

Let $S$ be a subset of the set $\mathbb {N}$ of natural numbers. The Schnirelmann density of $S$ is defined as:

$\inf _{n\in \mathbb {N} }{\frac {S\cap \{1,2,\dots ,n\}}{n}}$ .

The definition can be modified to consider subsets of $\mathbb {N} _{0}$ , the natural numbers with zero. the Schnirelmann desity of $\mathbb {N} _{0}$ is defined as:

$\inf _{n\in \mathbb {N} _{0}}{\frac {S\cap \{0,1,\dots ,n\}}{n+1}}$ .

Note that Schnirelmann density is highly sensitive to initial values, and for this reason, the value of the Schnirelmann density depends on whether we are treating the set as a subset of $\mathbb {N}$ or of $\mathbb {N} _{0}$ .

@@ Line 10: / Line 10: @@
 <math>\inf_{n \in \mathbb{N}_0} \frac{S \cap \{ 0,1, \dots, n \}}{n + 1}</math>.
+Note that Schnirelmann density is highly sensitive to initial values, and for this reason, the value of the Schnirelmann density depends on whether we are treating the set as a subset of <math>\mathbb{N}</math> or of <math>\mathbb{N}_0</math>.
 ==Related notions==
-* [[Asymptotic Schnirelmann density]]
+* [[Upper asymptotic density]]
+* [[Lower asymptotic density]]
 ==Facts==
 * [[Mann's theorem]]
 * [[Schnirelmann's theorem on Goldbach's conjecture]]