Began writing new port of this library in C by implementing Reed-Solomon functions.

c/qrcodegen.c

@@ -0,0 +1,88 @@
+/* 
+ * QR Code generator library (C)
+ * 
+ * Copyright (c) Project Nayuki
+ * https://www.nayuki.io/page/qr-code-generator-library
+ * 
+ * (MIT License)
+ * Permission is hereby granted, free of charge, to any person obtaining a copy of
+ * this software and associated documentation files (the "Software"), to deal in
+ * the Software without restriction, including without limitation the rights to
+ * use, copy, modify, merge, publish, distribute, sublicense, and/or sell copies of
+ * the Software, and to permit persons to whom the Software is furnished to do so,
+ * subject to the following conditions:
+ * - The above copyright notice and this permission notice shall be included in
+ *   all copies or substantial portions of the Software.
+ * - The Software is provided "as is", without warranty of any kind, express or
+ *   implied, including but not limited to the warranties of merchantability,
+ *   fitness for a particular purpose and noninfringement. In no event shall the
+ *   authors or copyright holders be liable for any claim, damages or other
+ *   liability, whether in an action of contract, tort or otherwise, arising from,
+ *   out of or in connection with the Software or the use or other dealings in the
+ *   Software.
+ */
+
+#include <assert.h>
+#include <stdint.h>
+#include <string.h>
+
+
+/*---- Forward declarations for private functions ----*/
+
+static void calcReedSolomonGenerator(int degree, uint8_t result[]);
+static void calcReedSolomonRemainder(const uint8_t data[], int dataLen, const uint8_t generator[], int degree, uint8_t result[]);
+static uint8_t finiteFieldMultiply(uint8_t x, uint8_t y);
+
+
+
+/*---- Function implementations ----*/
+
+// Calculates the Reed-Solomon generator polynomial of the given degree, storing in result[0 : degree].
+static void calcReedSolomonGenerator(int degree, uint8_t result[]) {
+	// Start with the monomial x^0
+	assert(1 <= degree && degree <= 30);
+	memset(result, 0, degree * sizeof(result[0]));
+	result[degree - 1] = 1;
+	
+	// Compute the product polynomial (x - r^0) * (x - r^1) * (x - r^2) * ... * (x - r^{degree-1}),
+	// drop the highest term, and store the rest of the coefficients in order of descending powers.
+	// Note that r = 0x02, which is a generator element of this field GF(2^8/0x11D).
+	int root = 1;
+	for (int i = 0; i < degree; i++) {
+		// Multiply the current product by (x - r^i)
+		for (int j = 0; j < degree; j++) {
+			result[j] = finiteFieldMultiply(result[j], (uint8_t)root);
+			if (j + 1 < degree)
+				result[j] ^= result[j + 1];
+		}
+		root = (root << 1) ^ ((root >> 7) * 0x11D);  // Multiply by 0x02 mod GF(2^8/0x11D)
+	}
+}
+
+
+// Calculates the remainder of the polynomial data[0 : dataLen] when divided by the generator[0 : degree], where all
+// polynomials are in big endian and the generator has an implicit leading 1 term, storing the result in result[0 : degree].
+static void calcReedSolomonRemainder(const uint8_t data[], int dataLen, const uint8_t generator[], int degree, uint8_t result[]) {
+	// Perform polynomial division
+	assert(1 <= degree && degree <= 30);
+	memset(result, 0, degree * sizeof(result[0]));
+	for (int i = 0; i < dataLen; i++) {
+		uint8_t factor = data[i] ^ result[0];
+		memmove(&result[0], &result[1], (degree - 1) * sizeof(result[0]));
+		result[degree - 1] = 0;
+		for (int j = 0; j < degree; j++)
+			result[j] ^= finiteFieldMultiply(generator[j], factor);
+	}
+}
+
+
+// Returns the product of the two given field elements modulo GF(2^8/0x11D). All argument values are valid.
+static uint8_t finiteFieldMultiply(uint8_t x, uint8_t y) {
+	// Russian peasant multiplication
+	uint8_t z = 0;
+	for (int i = 7; i >= 0; i--) {
+		z = (z << 1) ^ ((z >> 7) * 0x11D);
+		z ^= ((y >> i) & 1) * x;
+	}
+	return z;
+}