p-adic number

Template:Wikipedia

Template:En-noun

1. Template:Lb An element of a completion of the field of rational numbers with respect to a p-adic ultrametric.^[1]

   Template:Ux

   In the set of 3-adic numbers, the closed ball of radius 1/3 "centered" at 1, call it B, is the set ${\displaystyle \{x|\mathrm{\exists }n\in \mathbb{Z}.x=3n+1\}.}$ This closed ball partitions into exactly three smaller closed balls of radius 1/9: ${\displaystyle \{x|\mathrm{\exists }n\in \mathbb{Z}.x=1+9n\},}$ ${\displaystyle \{x|\mathrm{\exists }n\in \mathbb{Z}.x=4+9n\},}$ and ${\displaystyle \{x|\mathrm{\exists }n\in \mathbb{Z}.x=7+9n\}.}$ Then each of those balls partitions into exactly 3 smaller closed balls of radius 1/27, and the sub-partitioning can be continued indefinitely, in a fractal manner.
   Likewise, going upwards in the hierarchy, B is part of the closed ball of radius 1 centered at 1, namely, the set of integers. Two other closed balls of radius 1 are "centered" at 1/3 and 2/3, and all three closed balls of radius 1 form a closed ball of radius 3, ${\displaystyle \{x|\mathrm{\exists }n\in \mathbb{Z}.x=1+\frac{n}{3}\},}$ which is one out of three closed balls forming a closed ball of radius 9, and so on.

   • Template:Quote-book
   • Template:Quote-book
   • Template:Quote-book

• An expanded, constructive definition:
  • For given ${\displaystyle p}$, the natural numbers are exactly those expressible as some finite sum ${\displaystyle {\sum }_{k=0}^n{a}_k{p}^k}$, where each ${\displaystyle a_k}$ is an integer: ${\displaystyle 0\le a_k<p}$ and ${\displaystyle n\ge 0}$. (To this extent, ${\displaystyle p}$ acts exactly like a base).
  • The slightly more general sum ${\displaystyle {\sum }_{k=N}^n{a}_k{p}^k}$ (where ${\displaystyle N}$ can be negative) expresses a class of fractions: natural numbers divided by a power of ${\displaystyle p}$.
  • Much more expressiveness (to encompass all of ${\displaystyle \mathbb{Q}}$) results from permitting infinite sums: ${\displaystyle {\sum }_{k=N}^{\mathrm{\infty }}{a}_k{p}^k}$.
    • The p-adic ultrametric and the limitation on coefficients together ensure convergence, meaning that infinite sums can be manipulated to produce valid results that at times seem paradoxical. (For example, a sum with positive coefficients can represent a negative rational number. In fact, the concept Template:M has limited meaning for p-adic numbers; it is best simply interpreted as Template:M.)
  • Forming the completion of ${\displaystyle \mathbb{Q}}$ with respect to the ultrametric means augmenting it with the limit points of all such infinite sums.
• The augmented set is denoted ${\displaystyle {\mathbb{Q}}_p}$.
• The construction works generally (for any integer ${\displaystyle p>1}$), but it is only for prime ${\displaystyle p}$ that it becomes of significant mathematical interest.
  • For ${\displaystyle p}$ the power of some prime number, ${\displaystyle {\mathbb{Q}}_p}$ is still a field. For other composite ${\displaystyle p}$, ${\displaystyle {\mathbb{Q}}_p}$ is a ring, but not a field.
• ${\displaystyle {\mathbb{Q}}_p}$ is not the same as ${\displaystyle ℝ}$.
  • For example, ${\displaystyle \sqrt{p}\notin {\mathbb{Q}}_p}$ for any ${\displaystyle p}$, and, for some values of ${\displaystyle p}$, ${\displaystyle \sqrt{-1}\in {\mathbb{Q}}_p}$.

• Template:Sense
  • rational number
    • integer

• Template:L
• Template:L, Template:L
• Template:L
• Template:L
• Template:L

Template:Trans-top

• Chinese:

  Mandarin: Template:T

• Finnish: Template:T
• French: Template:T
• German: Template:T
• Italian: Template:T
• Polish: Template:Not used, Template:T
• Romanian: Template:T

Template:Trans-bottom

• Template:L

• Template:Pedia
• Template:Pedia
• Template:Pedia
• Template:Pedia
• p-adic Number on Template:W
• P-adic number on Template:W

Template:Cln