Luhn algorithm
The Luhn algorithm or Luhn formula, also known as the "modulus 10" or "mod 10" algorithm, named after its creator, IBM scientist Hans Peter Luhn, is a simple check digit formula used to validate a variety of identification numbers. It is described in US patent 2950048A, granted on 23 August 1960.[1]
The algorithm is in the public domain and is in wide use today. It is specified in ISO/IEC 7812-1.[2] It is not intended to be a cryptographically secure hash function; it was designed to protect against accidental errors, not malicious attacks. Most credit cards and many government identification numbers use the algorithm as a simple method of distinguishing valid numbers from mistyped or otherwise incorrect numbers.
Description
[edit]The check digit is computed as follows:
- Drop the check digit from the number (if it's already present). This leaves the payload.
- Start with the payload digits. Moving from right to left, double every second digit, starting from the second-to-last digit (not the last digit of the payload). If doubling a digit results in a value > 9, subtract 9 from it (or sum its digits).
- Sum all the resulting digits (including the ones that were not doubled).
- The check digit is calculated by , where s is the sum from step 3. This is the smallest number (possibly zero) that must be added to to make a multiple of 10. Other valid formulas giving the same value are , , and . Note that the formula will not work in all environments due to differences in how negative numbers are handled by the modulo operation.
Example for computing check digit
[edit]Assume an example of an account number 1789372997 (just the "payload", check digit not yet included):
7 | 9 | 9 | 2 | 7 | 3 | 9 | 8 | 7 | 1 | |
Multipliers | 2 | 1 | 2 | 1 | 2 | 1 | 2 | 1 | 2 | 1 |
---|---|---|---|---|---|---|---|---|---|---|
= | = | = | = | = | = | = | = | = | = | |
14 | 9 | 18 | 2 | 14 | 3 | 18 | 8 | 14 | 1 | |
Sum digits | 5 (1 4) | 9 | 9 (1 8) | 2 | 5 (1 4) | 3 | 9 (1 8) | 8 | 5 (1 4) | 1 |
The sum of the resulting digits is 56.
The check digit is equal to .
This makes the full account number read 17893729974.
Example for validating check digit
[edit]- Drop the check digit (last digit) of the number to validate. (e.g. 17893729974 ⊟ 1789372997)
- Calculate the check digit (see above)
- Compare your result with the original check digit. If both numbers match, the result is valid. (e.g. (givenCheckDigit = calculatedCheckDigit) ⇔ (isValidCheckDigit)).
Strengths and weaknesses
[edit]The Luhn algorithm will detect all single-digit errors, as well as almost all transpositions of adjacent digits. It will not, however, detect transposition of the two-digit sequence 09 to 90 (or vice versa). It will detect most of the possible twin errors (it will not detect 22 ↔ 55, 33 ↔ 66 or 44 ↔ 77).
Other, more complex check-digit algorithms (such as the Verhoeff algorithm and the Damm algorithm) can detect more transcription errors. The Luhn mod N algorithm is an extension that supports non-numerical strings.
Because the algorithm operates on the digits in a right-to-left manner and zero digits affect the result only if they cause shift in position, zero-padding the beginning of a string of numbers does not affect the calculation. Therefore, systems that pad to a specific number of digits (by converting 1234 to 0001234 for instance) can perform Luhn validation before or after the padding and achieve the same result.
The algorithm appeared in a United States Patent[1] for a simple, hand-held, mechanical device for computing the checksum. The device took the mod 10 sum by mechanical means. The substitution digits, that is, the results of the double and reduce procedure, were not produced mechanically. Rather, the digits were marked in their permuted order on the body of the machine.
Pseudocode implementation
[edit]The following function takes a card number, including the check digit, as an array of integers and outputs true if the check digit is correct, false otherwise.
function isValid(cardNumber[1..length]) sum := 0 parity := length mod 2 for i from 1 to length do if i mod 2 != parity then sum := sum cardNumber[i] elseif cardNumber[i] > 4 then sum := sum 2 * cardNumber[i] - 9 else sum := sum 2 * cardNumber[i] end if end for return cardNumber[length] == ((10 - (sum mod 10)) mod 10) end function
Uses
[edit]The Luhn algorithm is used in a variety of systems, including:
- Credit card numbers
- IMEI numbers
- National Provider Identifier numbers in the United States
- Canadian social insurance numbers
- Israeli ID numbers
- South African ID numbers
- South African Tax reference numbers
- Swedish national identification numbers
- Swedish Corporate Identity Numbers (OrgNr)
- Greek Social Security Numbers (ΑΜΚΑ)
- ICCID of SIM cards
- European patent application numbers
- Survey codes appearing on McDonald's, Taco Bell, and Tractor Supply Co. receipts
- United States Postal Service package tracking numbers use a modified Luhn algorithm[3]
- Italian VAT numbers (Partita Iva)[4]
References
[edit]- ^ a b US patent 2950048A, Luhn, Hans Peter, "Computer for Verifying Numbers", published 23 August 1960, issued 23 August 1960
- ^ "Annex B: Luhn formula for computing modulus-10 "double-add-double" check digits". Identification cards — Identification of issuers — Part 1: Numbering system (standard). International Organization for Standardization & International Electrotechnical Commission. January 2017. ISO/IEC 7812-1:2017.
- ^ Publication 199: Intelligent Mail Package Barcode (IMpb) Implementation Guide for Confirmation Services and Electronic Payment Systems (PDF) (28th ed.). United States: United States Postal Service. 10 October 2023. Archived (PDF) from the original on 17 November 2023. Retrieved 29 November 2023.
- ^ Albanese, Ilenia (10 August 2022). "A cosa serve la Partita Iva? Ecco cosa sapere" [What is a VAT number for? Here's what to know]. Partitaiva.it (in Italian). Archived from the original on 29 June 2024. Retrieved 29 June 2024.
External links
[edit]- Luhn test of credit card numbers on Rosetta Code: Luhn algorithm/formula implementation in 160 programming languages as of 22 July 2024[ref]