In mathematics, the extended natural numbers is a set which contains the values and (infinity). That is, it is the result of adding a maximum element to the natural numbers. Addition and multiplication work as normal for finite values, and are extended by the rules (), and for .
With addition and multiplication, is a semiring but not a ring, as lacks an additive inverse.[1] The set can be denoted by , or .[2][3][4] It is a subset of the extended real number line, which extends the real numbers by adding and .[2]
Applications
editIn graph theory, the extended natural numbers are used to define distances in graphs, with being the distance between two unconnected vertices.[2] They can be used to show the extension of some results, such as the max-flow min-cut theorem, to infinite graphs.[5]
In topology, the topos of right actions on the extended natural numbers is a category PRO of projection algebras.[4]
In constructive mathematics, the extended natural numbers are a one-point compactification of the natural numbers, yielding the set of non-increasing binary sequences i.e. such that . The sequence represents , while the sequence represents . It is a retract of and the claim that implies the limited principle of omniscience.[3]
Notes
edit- ^ Sakarovitch (2009), p. 28.
- ^ a b c Koch (2020).
- ^ a b Escardó (2013).
- ^ a b Khanjanzadeh & Madanshekaf (2018).
- ^ Folkman & Fulkerson (1970).
References
edit- Folkman, Jon; Fulkerson, D.R. (1970). "Flows in Infinite Graphs". Journal of Combinatorial Theory. 8 (1). doi:10.1016/S0021-9800(70)80006-0.
- Escardó, Martín H (2013). "Infinite Sets That Satisfy The Principle of Omniscience in Any Variety of Constructive Mathematics". Journal of Symbolic Logic. 78 (3).
- Koch, Sebastian (2020). "Extended Natural Numbers and Counters" (PDF). Formalized Mathematics. 28 (3).
- Khanjanzadeh, Zeinab; Madanshekaf, Ali (2018). "Weak Ideal Topology in the Topos of Right Acts Over a Monoid". Communications in Algebra. 46 (5).
- Sakarovitch, Jacques (2009). Elements of automata theory. Translated from the French by Reuben Thomas. Cambridge: Cambridge University Press. ISBN 978-0-521-84425-3. Zbl 1188.68177.
Further reading
edit- Robert, Leonel (3 September 2013). "The Cuntz semigroup of some spaces of dimension at most two". arXiv:0711.4396.
- Lightstone, A. H. (1972). "Infinitesimals". The American Mathematical Monthly. 79 (3).
- Khanjanzadeh, Zeinab; Madanshekaf, Ali (2019). "On Projection Algebras". Southeast Asian Bulletin of Mathematics. 43 (2).
External links
edit- Extended natural number at the nLab