mirror of https://github.com/bsnes-emu/bsnes.git
219 lines
7.0 KiB
C++
219 lines
7.0 KiB
C++
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#pragma once
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namespace nall {
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//RS(n,k) = ReedSolomon<Length, Inputs>
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template<uint Length, uint Inputs>
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struct ReedSolomon {
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enum : uint { Parity = Length - Inputs };
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static_assert(Length <= 255 && Length > 0);
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static_assert(Parity <= 32 && Parity > 0);
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using Field = GaloisField<uint8_t, 255, 0x11d>;
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template<uint Rows, uint Cols = 1> using Polynomial = Matrix<Field, Rows, Cols>;
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template<uint Size>
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static auto shift(Polynomial<Size> polynomial) -> Polynomial<Size> {
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for(int n = Size - 1; n > 0; n--) polynomial[n] = polynomial[n - 1];
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polynomial[0] = 0;
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return polynomial;
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}
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template<uint Size>
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static auto degree(const Polynomial<Size>& polynomial) -> uint {
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for(int n = Size; n > 0; n--) {
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if(polynomial[n - 1] != 0) return n - 1;
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}
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return 0;
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}
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template<uint Size>
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static auto evaluate(const Polynomial<Size>& polynomial, Field field) -> Field {
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Field sum = 0;
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for(uint n : range(Size)) sum += polynomial[n] * field.pow(n);
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return sum;
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}
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Polynomial<Length> message;
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Polynomial<Parity> syndromes;
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Polynomial<Parity + 1> locators;
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ReedSolomon() = default;
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ReedSolomon(const ReedSolomon&) = default;
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ReedSolomon(const initializer_list<uint8_t>& source) {
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uint index = 0;
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for(auto& value : source) {
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if(index >= Length) break;
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message[index++] = value;
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}
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}
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auto operator[](uint index) -> Field& { return message[index]; }
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auto operator[](uint index) const -> Field { return message[index]; }
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auto calculateSyndromes() -> void {
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static const Polynomial<Parity> bases = [] {
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Polynomial<Parity> bases;
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for(uint n : range(Parity)) {
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bases[n] = Field::exp(n);
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}
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return bases;
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}();
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syndromes = {};
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for(uint m : range(Length)) {
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for(uint p : range(Parity)) {
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syndromes[p] *= bases[p];
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syndromes[p] += message[m];
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}
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}
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}
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auto generateParity() -> void {
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static const Polynomial<Parity, Parity> matrix = [] {
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Polynomial<Parity, Parity> matrix{};
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for(uint row : range(Parity)) {
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for(uint col : range(Parity)) {
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matrix(row, col) = Field::exp(row * col);
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}
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}
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if(auto result = matrix.invert()) return *result;
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throw; //should never occur
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}();
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for(uint p : range(Parity)) message[Inputs + p] = 0;
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calculateSyndromes();
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auto parity = matrix * syndromes;
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for(uint p : range(Parity)) message[Inputs + p] = parity[Parity - (p + 1)];
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}
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auto syndromesAreZero() -> bool {
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for(uint p : range(Parity)) {
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if(syndromes[p]) return false;
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}
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return true;
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}
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//algorithm: Berlekamp-Massey
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auto calculateLocators() -> void {
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Polynomial<Parity + 1> history{1};
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locators = history;
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uint errors = 0;
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for(uint n : range(Parity)) {
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Field discrepancy = 0;
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for(uint l : range(errors + 1)) {
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discrepancy += locators[l] * syndromes[n - l];
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}
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history = shift(history);
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if(discrepancy) {
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auto located = locators - history * discrepancy;
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if(errors * 2 <= n) {
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errors = (n + 1) - errors;
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history = locators * discrepancy.inv();
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}
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locators = located;
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}
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}
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}
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//algorithm: brute force
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//todo: implement Chien search here
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auto calculateErrors() -> vector<uint8_t> {
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calculateSyndromes();
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if(syndromesAreZero()) return {}; //no errors detected
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calculateLocators();
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vector<uint8_t> errors;
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for(uint n : range(Length)) {
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if(evaluate(locators, Field{2}.pow(255 - n))) continue;
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errors.append(Length - (n + 1));
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}
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return errors;
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}
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template<uint Size>
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static auto calculateErasures(array_view<uint8_t> errors) -> maybe<Polynomial<Size, Size>> {
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Polynomial<Size, Size> matrix{};
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for(uint row : range(Size)) {
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for(uint col : range(Size)) {
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uint index = Length - (errors[col] + 1);
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matrix(row, col) = Field::exp(row * index);
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}
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}
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return matrix.invert();
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}
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template<uint Size>
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auto correctErasures(array_view<uint8_t> errors) -> int {
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calculateSyndromes();
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if(syndromesAreZero()) return 0; //no errors detected
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if(auto matrix = calculateErasures<Size>(errors)) {
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Polynomial<Size> factors;
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for(uint n : range(Size)) factors[n] = syndromes[n];
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auto errata = matrix() * factors;
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for(uint m : range(Size)) {
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message[errors[m]] += errata[m];
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}
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calculateSyndromes();
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if(syndromesAreZero()) return Size; //corrected Size errors
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return -Size; //failed to correct Size errors
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}
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return -Size; //should never occur, but might ...
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}
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//note: the erasure matrix is generated as a Polynomial<NxN>, where N is the number of errors to correct.
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//because this is a template parameter, and the actual number of errors may very, this function is needed.
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//the alternative would be to convert Matrix<Rows, Cols> to a dynamically sized Matrix(Rows, Cols) type,
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//but this would require heap memory allocations and would be a massive performance penalty.
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auto correctErrata(array_view<uint8_t> errors) -> int {
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if(errors.size() >= Parity) return -errors.size(); //too many errors to be correctable
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switch(errors.size()) {
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case 0: return 0;
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case 1: return correctErasures< 1>(errors);
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case 2: return correctErasures< 2>(errors);
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case 3: return correctErasures< 3>(errors);
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case 4: return correctErasures< 4>(errors);
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case 5: return correctErasures< 5>(errors);
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case 6: return correctErasures< 6>(errors);
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case 7: return correctErasures< 7>(errors);
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case 8: return correctErasures< 8>(errors);
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case 9: return correctErasures< 9>(errors);
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case 10: return correctErasures<10>(errors);
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case 11: return correctErasures<11>(errors);
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case 12: return correctErasures<12>(errors);
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case 13: return correctErasures<13>(errors);
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case 14: return correctErasures<14>(errors);
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case 15: return correctErasures<15>(errors);
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case 16: return correctErasures<16>(errors);
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case 17: return correctErasures<17>(errors);
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case 18: return correctErasures<18>(errors);
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case 19: return correctErasures<19>(errors);
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case 20: return correctErasures<20>(errors);
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case 21: return correctErasures<21>(errors);
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case 22: return correctErasures<22>(errors);
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case 23: return correctErasures<23>(errors);
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case 24: return correctErasures<24>(errors);
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case 25: return correctErasures<25>(errors);
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case 26: return correctErasures<26>(errors);
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case 27: return correctErasures<27>(errors);
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case 28: return correctErasures<28>(errors);
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case 29: return correctErasures<29>(errors);
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case 30: return correctErasures<30>(errors);
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case 31: return correctErasures<31>(errors);
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case 32: return correctErasures<32>(errors);
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}
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return -errors.size(); //it's possible to correct more errors if the above switch were extended ...
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}
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//convenience function for when erasures aren't needed
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auto correctErrors() -> int {
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auto errors = calculateErrors();
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return correctErrata(errors);
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}
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};
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}
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