The characteristic of a field is the smallest positive integer n such that nI = 0 where I denotes the multiplicative identity. If no such n exists, then the characteristic is zero. It is denoted by the symbol char(F). In this article, the characteristic of a field is either 0 or a prime number.
Table of Contents
Characteristic of a Field is 0 or Prime
Proof:
Let F be a field.
So F is a commutative ring with unity I.
If there is no least positive integer n such that nI=0, then char(F)=0.
So suppose that char(F) = n. This means n is the least positive integer such that nI=0. We need to show that n is a prime number.
If possible suppose that n is a composite number. So we can write
n = pq
for some integers p and q with 1< p, q < n. Now since char(F) = n, we have nI = 0 which implies that
(pq)I = 0
⇒ (pI) (qI) = 0
As every field is an integral domain and an integral domain contains no zero divisor, this implies that
either pI = 0 or qI = 0.
This contradicts the fact that n is the smallest positive integer such that nI = 0. So our assumption is wrong. This shows that n=char(F) must be a prime number. This completes the proof of the fact that the characteristic of a field is either a prime or 0.
Main Topic: Field Theory: definition, Examples, Theorems
Fields of characteristic 0
The field of real numbers and complex numbers, that is, ℝ and ℂ are fields of characteristic zero. Also, the field ℚ of rational numbers has characteristic 0. Therefore, every algebraic number field (a field extension of ℚ) is of characteristic 0.
The p-adic fields are of characteristic 0. These fields are extensively used in modern number theory now a days. For example, the 2-adic field ℚ2 has characteristic zero.
Also Read: Integral Domain | Characteristic of a Ring
Prove that every finite integral domain is a field
Fields of Prime Characteristic
If a field is of prime characteristic, say p, then the field must be a finite field. Some examples of fields of prime characteristic are listed below.
- The field 𝔽pn of elements pn. Note that 𝔽pn ≅ ℤ/pnℤ.
- The field GLn(𝔽pn) of non-singular matrices over 𝔽pn.
FAQs
Answer: The character of the field ℤ/pℤ is p.
Answer: The rational field Q has characteristic 0.
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