There are 1 repository under luhn topic.
Provide check digit algorithms and calculators written in Go
A C# library for validating and generating credit card numbers.
Generation and verification of card numbers using Luhn's algorithm.
A Java library for generating mathematically-valid credit card numbers for software testing. The API provides customizable criteria for generation, and is extensible to apply to any payment card type which uses Luhn validation (not limited to just credit cards).
🔒 An easy-to-use check digit library for data validation
This Python code scrapes Google search results then applies sentiment analysis, generates text summaries, and ranks keywords.
Minimal, zero-dependency implementation of the Luhn Algorithm for PHP.
Fake credit card generator and validator. This is only meant for educational purpose.
Helper classes to calculate and validate ckecksums.
Simple validator for identification numbers based on the Luhn algorithm
Pragmatic data validation
Contains helper classes that I find useful every now and then.
A set of check digit algorithms implemented in Dart
SIM card checksum and encoding utils for nibbling, mcc, mnc, etc.
Checks if a number is valid per the luhn algorithm
This Python code retrieves thousands of tweets, classifies them using TextBlob and VADER in tandem, summarizes each classification using LexRank, Luhn, LSA, and LSA with stopwords, and then ranks stopwords-scrubbed keywords per classification.
The Luhn algorithm is a simple checksum formula used to validate a variety of identification numbers, such as credit card numbers and Canadian Social Insurance Numbers.
Deep object validation library for .NET
Kata : implémenter la formule de Luhn pour vérifier des numéros de cartes bancaires
Luhn - Intuitive credit card numbers validator
A collection of summarizer algorithms
Create or validate a Lühn (mod 10) check digit in a numeric string in Go.
Luhn Module Verifier
luhn check-digit validator and generator
A full TypeScript EAN, UPC, IMEI, EID, ISBN & card validation tool
An C# implementation of the Luhn algorithm