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Modular arithmetic

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(Redirected from Congruence class) Computation modulo a fixed integer This article is about the concept that uses the "a (mod m)" notation. For the binary operation mod(a,m), see modulo.
Time-keeping on this clock uses arithmetic modulo 12. Adding 4 hours to 9 o'clock gives 1 o'clock, since 13 is congruent to 1 modulo 12.

In mathematics, modular arithmetic is a system of arithmetic for integers, where numbers "wrap around" when reaching a certain value, called the modulus. The modern approach to modular arithmetic was developed by Carl Friedrich Gauss in his book Disquisitiones Arithmeticae, published in 1801.

A familiar use of modular arithmetic is in the 12-hour clock, in which the day is divided into two 12-hour periods. If the time is 7:00 now, then 8 hours later it will be 3:00. Simple addition would result in 7 + 8 = 15, but 15:00 reads as 3:00 on the clock face because clocks "wrap around" every 12 hours and the hour number starts over at zero when it reaches 12. We say that 15 is congruent to 3 modulo 12, written 15 ≡ 3 (mod 12), so that 7 + 8 ≡ 3 (mod 12). Similarly, 8:00 represents a period of 8 hours, and twice this would give 16:00, which reads as 4:00 on the clock face, written as 2 × 8 ≡ 4 (mod 12).

Congruence

Given an integer m ≥ 1, called a modulus, two integers a and b are said to be congruent modulo m, if m is a divisor of their difference; that is, if there is an integer k such that

ab = k m.

Congruence modulo m is a congruence relation, meaning that it is an equivalence relation that is compatible with the operations of addition, subtraction, and multiplication. Congruence modulo m is denoted

ab (mod m).

The parentheses mean that (mod m) applies to the entire equation, not just to the right-hand side (here, b).

This notation is not to be confused with the notation b mod m (without parentheses), which refers to the modulo operation, the remainder of b when divided by m: that is, b mod m denotes the unique integer r such that 0 ≤ r < m and rb (mod m).

The congruence relation may be rewritten as

a = k m + b,

explicitly showing its relationship with Euclidean division. However, the b here need not be the remainder in the division of a by m. Rather, ab (mod m) asserts that a and b have the same remainder when divided by m. That is,

a = p m + r,
b = q m + r,

where 0 ≤ r < m is the common remainder. We recover the previous relation (ab = k m) by subtracting these two expressions and setting k = pq.

Because the congruence modulo m is defined by the divisibility by m and because -1 is a unit in the ring of integers, a number is divisible by -m exactly if it is divisible by m. This means that every non-zero integer m may be taken as modulus.

Examples

In modulus 12, one can assert that:

38 ≡ 14 (mod 12)

because the difference is 38 − 14 = 24 = 2 × 12, a multiple of 12. Equivalently, 38 and 14 have the same remainder 2 when divided by 12.

The definition of congruence also applies to negative values. For example:

2 3 ( mod 5 ) 8 7 ( mod 5 ) 3 8 ( mod 5 ) . {\displaystyle {\begin{aligned}2&\equiv -3{\pmod {5}}\\-8&\equiv 7{\pmod {5}}\\-3&\equiv -8{\pmod {5}}.\end{aligned}}}

Basic properties

The congruence relation satisfies all the conditions of an equivalence relation:

  • Reflexivity: aa (mod m)
  • Symmetry: ab (mod m) if ba (mod m).
  • Transitivity: If ab (mod m) and bc (mod m), then ac (mod m)

If a1b1 (mod m) and a2b2 (mod m), or if ab (mod m), then:

  • a + kb + k (mod m) for any integer k (compatibility with translation)
  • k ak b (mod m) for any integer k (compatibility with scaling)
  • k ak b (mod k m) for any integer k
  • a1 + a2b1 + b2 (mod m) (compatibility with addition)
  • a1a2b1b2 (mod m) (compatibility with subtraction)
  • a1 a2b1 b2 (mod m) (compatibility with multiplication)
  • ab (mod m) for any non-negative integer k (compatibility with exponentiation)
  • p(a) ≡ p(b) (mod m), for any polynomial p(x) with integer coefficients (compatibility with polynomial evaluation)

If ab (mod m), then it is generally false that kk (mod m). However, the following is true:

For cancellation of common terms, we have the following rules:

  • If a + kb + k (mod m), where k is any integer, then ab (mod m).
  • If k ak b (mod m) and k is coprime with m, then ab (mod m).
  • If k ak b (mod k m) and k ≠ 0, then ab (mod m).

The last rule can be used to move modular arithmetic into division. If b divides a, then (a/b) mod m = (a mod b m) / b.

The modular multiplicative inverse is defined by the following rules:

  • Existence: There exists an integer denoted a such that aa ≡ 1 (mod m) if and only if a is coprime with m. This integer a is called a modular multiplicative inverse of a modulo m.
  • If ab (mod m) and a exists, then ab (mod m) (compatibility with multiplicative inverse, and, if a = b, uniqueness modulo m).
  • If axb (mod m) and a is coprime to m, then the solution to this linear congruence is given by xab (mod m).

The multiplicative inverse xa (mod m) may be efficiently computed by solving Bézout's equation a x + m y = 1 for x, y, by using the Extended Euclidean algorithm.

In particular, if p is a prime number, then a is coprime with p for every a such that 0 < a < p; thus a multiplicative inverse exists for all a that is not congruent to zero modulo p.

Advanced properties

Some of the more advanced properties of congruence relations are the following:

  • Fermat's little theorem: If p is prime and does not divide a, then a ≡ 1 (mod p).
  • Euler's theorem: If a and m are coprime, then a ≡ 1 (mod m), where φ is Euler's totient function.
  • A simple consequence of Fermat's little theorem is that if p is prime, then aa (mod p) is the multiplicative inverse of 0 < a < p. More generally, from Euler's theorem, if a and m are coprime, then aa (mod m). Hence, if ax1 (mod m), then xa (mod m).
  • Another simple consequence is that if ab (mod φ(m)), where φ is Euler's totient function, then kk (mod m) provided k is coprime with m.
  • Wilson's theorem: p is prime if and only if (p − 1)! ≡ −1 (mod p).
  • Chinese remainder theorem: For any a, b and coprime m, n, there exists a unique x (mod mn) such that xa (mod m) and xb (mod n). In fact, xb mn m + a nm n (mod mn) where mn is the inverse of m modulo n and nm is the inverse of n modulo m.
  • Lagrange's theorem: If p is prime and f (x) = a0 x + ... + ad is a polynomial with integer coefficients such that p is not a divisor of a0, then the congruence f (x) ≡ 0 (mod p) has at most d non-congruent solutions.
  • Primitive root modulo m: A number g is a primitive root modulo m if, for every integer a coprime to m, there is an integer k such that ga (mod m). A primitive root modulo m exists if and only if m is equal to 2, 4, p or 2p, where p is an odd prime number and k is a positive integer. If a primitive root modulo m exists, then there are exactly φ(φ(m)) such primitive roots, where φ is the Euler's totient function.
  • Quadratic residue: An integer a is a quadratic residue modulo m, if there exists an integer x such that xa (mod m). Euler's criterion asserts that, if p is an odd prime, and a is not a multiple of p, then a is a quadratic residue modulo p if and only if
    a ≡ 1 (mod p).

Congruence classes

The congruence relation is an equivalence relation. The equivalence class modulo m of an integer a is the set of all integers of the form a + k m, where k is any integer. It is called the congruence class or residue class of a modulo m, and may be denoted as (a mod m), or as a or when the modulus m is known from the context.

Each residue class modulo m contains exactly one integer in the range 0 , . . . , | m | 1 {\displaystyle 0,...,|m|-1} . Thus, these | m | {\displaystyle |m|} integers are representatives of their respective residue classes.

It is generally easier to work with integers than sets of integers; that is, the representatives most often considered, rather than their residue classes.

Consequently, (a mod m) denotes generally the unique integer k such that 0 ≤ k < m and ka (mod m); it is called the residue of a modulo m.

In particular, (a mod m) = (b mod m) is equivalent to ab (mod m), and this explains why "=" is often used instead of "≡" in this context.

Residue systems

Each residue class modulo m may be represented by any one of its members, although we usually represent each residue class by the smallest nonnegative integer which belongs to that class (since this is the proper remainder which results from division). Any two members of different residue classes modulo m are incongruent modulo m. Furthermore, every integer belongs to one and only one residue class modulo m.

The set of integers {0, 1, 2, ..., m − 1} is called the least residue system modulo m. Any set of m integers, no two of which are congruent modulo m, is called a complete residue system modulo m.

The least residue system is a complete residue system, and a complete residue system is simply a set containing precisely one representative of each residue class modulo m. For example, the least residue system modulo 4 is {0, 1, 2, 3}. Some other complete residue systems modulo 4 include:

  • {1, 2, 3, 4}
  • {13, 14, 15, 16}
  • {−2, −1, 0, 1}
  • {−13, 4, 17, 18}
  • {−5, 0, 6, 21}
  • {27, 32, 37, 42}

Some sets that are not complete residue systems modulo 4 are:

  • {−5, 0, 6, 22}, since 6 is congruent to 22 modulo 4.
  • {5, 15}, since a complete residue system modulo 4 must have exactly 4 incongruent residue classes.

Reduced residue systems

Main article: Reduced residue system

Given the Euler's totient function φ(m), any set of φ(m) integers that are relatively prime to m and mutually incongruent under modulus m is called a reduced residue system modulo m. The set {5, 15} from above, for example, is an instance of a reduced residue system modulo 4.

Covering systems

Main article: Covering system

Covering systems represent yet another type of residue system that may contain residues with varying moduli.

Integers modulo m

Remark: In the context of this paragraph, the modulus m is almost always taken as positive.

The set of all congruence classes modulo m is called the ring of integers modulo m, and is denoted Z / m Z {\textstyle \mathbb {Z} /m\mathbb {Z} } , Z / m {\displaystyle \mathbb {Z} /m} , or Z m {\displaystyle \mathbb {Z} _{m}} . The notation Z m {\displaystyle \mathbb {Z} _{m}} is, however, not recommended because it can be confused with the set of m-adic integers. The ring Z / m Z {\displaystyle \mathbb {Z} /m\mathbb {Z} } is fundamental to various branches of mathematics (see § Applications below).

For m > 0 one has

Z / m Z = { a ¯ m a Z } = { 0 ¯ m , 1 ¯ m , 2 ¯ m , , m 1 ¯ m } . {\displaystyle \mathbb {Z} /m\mathbb {Z} =\left\{{\overline {a}}_{m}\mid a\in \mathbb {Z} \right\}=\left\{{\overline {0}}_{m},{\overline {1}}_{m},{\overline {2}}_{m},\ldots ,{\overline {m{-}1}}_{m}\right\}.}

When m = 1, Z / m Z {\displaystyle \mathbb {Z} /m\mathbb {Z} } is the zero ring; when m = 0, Z / m Z {\displaystyle \mathbb {Z} /m\mathbb {Z} } is not an empty set; rather, it is isomorphic to Z {\displaystyle \mathbb {Z} } , since a0 = {a}.

Addition, subtraction, and multiplication are defined on Z / m Z {\displaystyle \mathbb {Z} /m\mathbb {Z} } by the following rules:

  • a ¯ m + b ¯ m = ( a + b ) ¯ m {\displaystyle {\overline {a}}_{m}+{\overline {b}}_{m}={\overline {(a+b)}}_{m}}
  • a ¯ m b ¯ m = ( a b ) ¯ m {\displaystyle {\overline {a}}_{m}-{\overline {b}}_{m}={\overline {(a-b)}}_{m}}
  • a ¯ m b ¯ m = ( a b ) ¯ m . {\displaystyle {\overline {a}}_{m}{\overline {b}}_{m}={\overline {(ab)}}_{m}.}

The properties given before imply that, with these operations, Z / m Z {\displaystyle \mathbb {Z} /m\mathbb {Z} } is a commutative ring. For example, in the ring Z / 24 Z {\displaystyle \mathbb {Z} /24\mathbb {Z} } , one has

12 ¯ 24 + 21 ¯ 24 = 33 ¯ 24 = 9 ¯ 24 {\displaystyle {\overline {12}}_{24}+{\overline {21}}_{24}={\overline {33}}_{24}={\overline {9}}_{24}}

as in the arithmetic for the 24-hour clock.

The notation Z / m Z {\displaystyle \mathbb {Z} /m\mathbb {Z} } is used because this ring is the quotient ring of Z {\displaystyle \mathbb {Z} } by the ideal m Z {\displaystyle m\mathbb {Z} } , the set formed by all k m with k Z . {\displaystyle k\in \mathbb {Z} .}

Considered as a group under addition, Z / m Z {\displaystyle \mathbb {Z} /m\mathbb {Z} } is a cyclic group, and all cyclic groups are isomorphic with Z / m Z {\displaystyle \mathbb {Z} /m\mathbb {Z} } for some m.

The ring of integers modulo m is a field if and only if m is prime (this ensures that every nonzero element has a multiplicative inverse). If m = p is a prime power with k > 1, there exists a unique (up to isomorphism) finite field G F ( m ) = F m {\displaystyle \mathrm {GF} (m)=\mathbb {F} _{m}} with m elements, which is not isomorphic to Z / m Z {\displaystyle \mathbb {Z} /m\mathbb {Z} } , which fails to be a field because it has zero-divisors.

If m > 1, ( Z / m Z ) × {\displaystyle (\mathbb {Z} /m\mathbb {Z} )^{\times }} denotes the multiplicative group of the integers modulo m that are invertible. It consists of the congruence classes am, where a is coprime to m; these are precisely the classes possessing a multiplicative inverse. They form an abelian group under multiplication; its order is φ(m), where φ is Euler's totient function

Applications

In pure mathematics, modular arithmetic is one of the foundations of number theory, touching on almost every aspect of its study, and it is also used extensively in group theory, ring theory, knot theory, and abstract algebra. In applied mathematics, it is used in computer algebra, cryptography, computer science, chemistry and the visual and musical arts.

A very practical application is to calculate checksums within serial number identifiers. For example, International Standard Book Number (ISBN) uses modulo 11 (for 10-digit ISBN) or modulo 10 (for 13-digit ISBN) arithmetic for error detection. Likewise, International Bank Account Numbers (IBANs), for example, make use of modulo 97 arithmetic to spot user input errors in bank account numbers. In chemistry, the last digit of the CAS registry number (a unique identifying number for each chemical compound) is a check digit, which is calculated by taking the last digit of the first two parts of the CAS registry number times 1, the previous digit times 2, the previous digit times 3 etc., adding all these up and computing the sum modulo 10.

In cryptography, modular arithmetic directly underpins public key systems such as RSA and Diffie–Hellman, and provides finite fields which underlie elliptic curves, and is used in a variety of symmetric key algorithms including Advanced Encryption Standard (AES), International Data Encryption Algorithm (IDEA), and RC4. RSA and Diffie–Hellman use modular exponentiation.

In computer algebra, modular arithmetic is commonly used to limit the size of integer coefficients in intermediate calculations and data. It is used in polynomial factorization, a problem for which all known efficient algorithms use modular arithmetic. It is used by the most efficient implementations of polynomial greatest common divisor, exact linear algebra and Gröbner basis algorithms over the integers and the rational numbers. As posted on Fidonet in the 1980s and archived at Rosetta Code, modular arithmetic was used to disprove Euler's sum of powers conjecture on a Sinclair QL microcomputer using just one-fourth of the integer precision used by a CDC 6600 supercomputer to disprove it two decades earlier via a brute force search.

In computer science, modular arithmetic is often applied in bitwise operations and other operations involving fixed-width, cyclic data structures. The modulo operation, as implemented in many programming languages and calculators, is an application of modular arithmetic that is often used in this context. The logical operator XOR sums 2 bits, modulo 2.

The use of long division to turn a fraction into a repeating decimal in any base b is equivalent to modular multiplication of b modulo the denominator. For example, for decimal, b = 10.

In music, arithmetic modulo 12 is used in the consideration of the system of twelve-tone equal temperament, where octave and enharmonic equivalency occurs (that is, pitches in a 1:2 or 2:1 ratio are equivalent, and C-sharp is considered the same as D-flat).

The method of casting out nines offers a quick check of decimal arithmetic computations performed by hand. It is based on modular arithmetic modulo 9, and specifically on the crucial property that 10 ≡ 1 (mod 9).

Arithmetic modulo 7 is used in algorithms that determine the day of the week for a given date. In particular, Zeller's congruence and the Doomsday algorithm make heavy use of modulo-7 arithmetic.

More generally, modular arithmetic also has application in disciplines such as law (e.g., apportionment), economics (e.g., game theory) and other areas of the social sciences, where proportional division and allocation of resources plays a central part of the analysis.

Computational complexity

Since modular arithmetic has such a wide range of applications, it is important to know how hard it is to solve a system of congruences. A linear system of congruences can be solved in polynomial time with a form of Gaussian elimination, for details see linear congruence theorem. Algorithms, such as Montgomery reduction, also exist to allow simple arithmetic operations, such as multiplication and exponentiation modulo m, to be performed efficiently on large numbers.

Some operations, like finding a discrete logarithm or a quadratic congruence appear to be as hard as integer factorization and thus are a starting point for cryptographic algorithms and encryption. These problems might be NP-intermediate.

Solving a system of non-linear modular arithmetic equations is NP-complete.

See also

Notes

  1. Sandor Lehoczky; Richard Rusczky (2006). David Patrick (ed.). the Art of Problem Solving. Vol. 1 (7 ed.). AoPS Incorporated. p. 44. ISBN 0977304566.
  2. Weisstein, Eric W. "Modular Arithmetic". Wolfram MathWorld. Archived from the original on 2023-07-14. Retrieved 2020-08-12.
  3. Pettofrezzo & Byrkit (1970, p. 90)
  4. Long (1972, p. 78)
  5. Long (1972, p. 85)
  6. It is a ring, as shown below.
  7. "2.3: Integers Modulo n". Mathematics LibreTexts. 2013-11-16. Archived from the original on 2021-04-19. Retrieved 2020-08-12.
  8. Sengadir T., Discrete Mathematics and Combinatorics, p. 293, at Google Books
  9. "Euler's sum of powers conjecture". rosettacode.org. Archived from the original on 2023-03-26. Retrieved 2020-11-11.
  10. Garey, M. R.; Johnson, D. S. (1979). Computers and Intractability, a Guide to the Theory of NP-Completeness. W. H. Freeman. ISBN 0716710447.

References

External links

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