ldpc_optical/model/ldpc_sim.py

#!/usr/bin/env python3
"""
LDPC Decoder Behavioral Model - Bit-Exact Reference for RTL Verification

Implements offset min-sum decoding with layered scheduling for a
rate-1/8 QC-LDPC code (n=256, k=32, Z=32, base matrix 7x8).

Channel model: Poisson photon-counting (optical communication)

Usage:
    python3 ldpc_sim.py                    # Run BER simulation
    python3 ldpc_sim.py --gen-vectors      # Generate RTL test vectors
    python3 ldpc_sim.py --sweep-snr        # SNR sweep for BER curve
"""

import numpy as np
import argparse
import json
import os

# =============================================================================
# Code parameters
# =============================================================================
N_BASE = 8       # base matrix columns
M_BASE = 7       # base matrix rows
Z = 32           # lifting factor
N = N_BASE * Z   # 256 codeword bits
K = Z            # 32 info bits (rate 1/8)
M = M_BASE * Z   # 224 parity checks
Q_BITS = 6       # quantization bits (signed)
Q_MAX = 2**(Q_BITS-1) - 1   # +31
Q_MIN = -(2**(Q_BITS-1))    # -32
OFFSET = 1       # min-sum offset (integer)

# Base matrix: H_BASE[row][col] = cyclic shift, -1 = no connection
# This must match the RTL exactly!
#
# Structure: IRA (Irregular Repeat-Accumulate) with staircase parity
#   Column 0: information bits, connected to ALL 7 rows (dv=7, high protection)
#   Columns 1-7: parity bits with lower-triangular staircase (dv=2, except col7=1)
#
# Encoding: purely sequential (lower triangular parity submatrix)
#   Row 0 → solve p1; Row 1 → solve p2 (using p1); ... Row 6 → solve p7
#
# VN degree distribution: col0=7, cols1-6=2, col7=1
# Average VN degree = (7*32 + 2*192 + 1*32) / 256 = 2.5
H_BASE = np.array([
    [ 0,  5, -1, -1, -1, -1, -1, -1],  # row 0: info(0) + p1(5)
    [11,  3,  0, -1, -1, -1, -1, -1],  # row 1: info(11) + p1(3) + p2(0)
    [17, -1,  7,  0, -1, -1, -1, -1],  # row 2: info(17) + p2(7) + p3(0)
    [23, -1, -1, 13,  0, -1, -1, -1],  # row 3: info(23) + p3(13) + p4(0)
    [29, -1, -1, -1, 19,  0, -1, -1],  # row 4: info(29) + p4(19) + p5(0)
    [ 3, -1, -1, -1, -1, 25,  0, -1],  # row 5: info(3) + p5(25) + p6(0)
    [ 9, -1, -1, -1, -1, -1, 31,  0],  # row 6: info(9) + p6(31) + p7(0)
], dtype=np.int16)


def build_full_h_matrix():
    """Expand QC base matrix to full binary parity-check matrix H (M x N)."""
    H = np.zeros((M, N), dtype=np.int8)
    for r in range(M_BASE):
        for c in range(N_BASE):
            shift = int(H_BASE[r, c])
            if shift < 0:
                continue  # null sub-matrix
            # Cyclic permutation matrix of size Z with shift
            for z in range(Z):
                col_idx = int(c * Z + (z + shift) % Z)
                H[r * Z + z, col_idx] = 1
    return H


def cyclic_shift(vec, shift):
    """Cyclic right-shift a Z-length vector by 'shift' positions."""
    s = int(shift) % len(vec)
    if s == 0:
        return vec.copy()
    return np.concatenate([vec[-s:], vec[:-s]])


def ldpc_encode(info_bits, H):
    """
    Sequential encoding exploiting the IRA staircase structure.

    QC-LDPC convention: H_BASE[r][c] = s means sub-block is circulant P_s
    where P_s applied to vector x gives: result[i] = x[(i+s) % Z]  (left shift by s).

    Lower-triangular parity submatrix allows top-to-bottom sequential solve:
      Row 0: P_{h00}*info + P_{h01}*p1 = 0  -> p1 = P_{h01}^-1 * P_{h00} * info
      Row r: P_{hr0}*info + P_{hrr}*p[r] + P_{hr,r+1}*p[r+1] = 0
        -> p[r+1] = P_{hr,r+1}^-1 * (P_{hr0}*info + P_{hrr}*p[r])

    P_s * x  = np.roll(x, -s)   (left circular shift)
    P_s^-1*y = np.roll(y, +s)   (right circular shift)
    """
    assert len(info_bits) == K

    def apply_p(x, s):
        """Apply circulant P_s: result[i] = x[(i+s)%Z]."""
        return np.roll(x, -int(s))

    def inv_p(y, s):
        """Apply P_s inverse: P_{-s}."""
        return np.roll(y, int(s))

    # Parity blocks: p[c] is a Z-length binary vector for base column c (1..7)
    p = [np.zeros(Z, dtype=np.int8) for _ in range(N_BASE)]

    # Step 1: Solve row 0 for p[1]
    # P_{H[0][0]} * info + P_{H[0][1]} * p1 = 0
    # p1 = P_{H[0][1]}^-1 * P_{H[0][0]} * info
    accum = apply_p(info_bits, H_BASE[0, 0])
    p[1] = inv_p(accum, H_BASE[0, 1])

    # Step 2: Solve rows 1-6 sequentially for p[2]..p[7]
    for r in range(1, M_BASE):
        # P_{H[r][0]}*info + P_{H[r][r]}*p[r] + P_{H[r][r+1]}*p[r+1] = 0
        accum = apply_p(info_bits, H_BASE[r, 0])
        accum = (accum + apply_p(p[r], H_BASE[r, r])) % 2
        p[r + 1] = inv_p(accum, H_BASE[r, r + 1])

    # Assemble codeword: [info | p1 | p2 | ... | p7]
    codeword = np.concatenate([info_bits] + [p[c] for c in range(1, N_BASE)])

    # Verify
    check = H @ codeword % 2
    assert np.all(check == 0), f"Encoding failed: syndrome weight = {check.sum()}"

    return codeword


def poisson_channel(codeword, lam_s, lam_b):
    """
    Simulate photon-counting optical channel.

    For each bit:
      bit=1: transmit pulse -> expected photons = lam_s + lam_b
      bit=0: no pulse -> expected photons = lam_b (background only)

    Receiver counts photons (Poisson distributed).
    Output: LLR = log(P(y|1) / P(y|0)) for each received symbol.

    For binary (click/no-click) detector:
      P(click|1) = 1 - exp(-(lam_s + lam_b))
      P(click|0) = 1 - exp(-lam_b)
    """
    n = len(codeword)

    # Expected photon counts
    lam = np.where(codeword == 1, lam_s + lam_b, lam_b)

    # Poisson photon counts
    photon_counts = np.random.poisson(lam)

    # Compute exact LLR for each observation
    # P(y|1) = (lam_s+lam_b)^y * exp(-(lam_s+lam_b)) / y!
    # P(y|0) = lam_b^y * exp(-lam_b) / y!
    #
    # Convention: LLR = log(P(y|0) / P(y|1))  (positive = bit 0 more likely)
    # This matches decoder: positive belief -> hard decision 0, negative -> 1
    #
    # LLR = lam_s - y * log((lam_s + lam_b) / lam_b)
    llr = np.zeros(n, dtype=np.float64)
    for i in range(n):
        y = photon_counts[i]
        if lam_b > 0:
            llr[i] = lam_s - y * np.log((lam_s + lam_b) / lam_b)
        else:
            # No background: click = definitely bit 1, no click = definitely bit 0
            if y > 0:
                llr[i] = -100.0  # strong negative (bit=1 likely)
            else:
                llr[i] = lam_s   # no photons, likely bit=0

    return llr, photon_counts


def quantize_llr(llr_float, q_bits=Q_BITS):
    """Quantize floating-point LLR to signed integer."""
    q_max = 2**(q_bits-1) - 1
    q_min = -(2**(q_bits-1))
    # Scale: map typical LLR range to integer range
    # For photon channel, LLRs are typically in [-5, +5] range
    scale = q_max / 5.0
    llr_scaled = np.round(llr_float * scale).astype(np.int32)
    return np.clip(llr_scaled, q_min, q_max).astype(np.int8)


def sat_add_q(a, b):
    """Saturating add in Q-bit signed arithmetic."""
    s = int(a) + int(b)
    return max(Q_MIN, min(Q_MAX, s))


def sat_sub_q(a, b):
    """Saturating subtract in Q-bit signed arithmetic."""
    return sat_add_q(a, -b)


def min_sum_cn_update(msgs_in, offset=OFFSET):
    """
    Offset min-sum check node update.

    For each output j:
      sign = XOR of all other input signs
      magnitude = min of all other magnitudes - offset (clamp to 0)

    Args:
        msgs_in: list of DC signed integers (Q-bit)
        offset: offset correction value

    Returns:
        msgs_out: list of DC signed integers (Q-bit)
    """
    dc = len(msgs_in)
    signs = [1 if m < 0 else 0 for m in msgs_in]
    mags = [abs(m) for m in msgs_in]
    sign_xor = sum(signs) % 2

    # Find min1, min2, and index of min1
    min1 = Q_MAX
    min2 = Q_MAX
    min1_idx = 0
    for i in range(dc):
        if mags[i] < min1:
            min2 = min1
            min1 = mags[i]
            min1_idx = i
        elif mags[i] < min2:
            min2 = mags[i]

    msgs_out = []
    for j in range(dc):
        mag = min2 if j == min1_idx else min1
        mag = max(0, mag - offset)  # offset correction
        sgn = sign_xor ^ signs[j]   # extrinsic sign
        val = -mag if sgn else mag
        msgs_out.append(val)

    return msgs_out


def decode_layered_min_sum(llr_q, max_iter=30, early_term=True):
    """
    Layered offset min-sum LDPC decoder (bit-exact reference for RTL).

    Args:
        llr_q: quantized channel LLRs (N-length array of signed Q-bit integers)
        max_iter: maximum iterations
        early_term: stop when syndrome is zero

    Returns:
        decoded_bits: hard decisions (N-length binary array)
        converged: True if syndrome == 0
        iterations: number of iterations performed
        syndrome_weight: final syndrome weight
    """
    # Initialize beliefs from channel LLRs
    beliefs = [int(x) for x in llr_q]

    # Initialize CN->VN messages to zero
    # msg[row][col][z] = message from CN (row*Z+z) to VN at shifted position
    msg = [[[0 for _ in range(Z)] for _ in range(N_BASE)] for _ in range(M_BASE)]

    for iteration in range(max_iter):
        # Process each base matrix row (layer)
        for row in range(M_BASE):
            # Find which columns are connected in this row
            connected_cols = [c for c in range(N_BASE) if H_BASE[row, c] >= 0]
            dc = len(connected_cols)

            # Step 1: Compute VN->CN messages by subtracting old CN->VN
            # vn_to_cn[col_pos][z] where col_pos indexes into connected_cols
            vn_to_cn = [[0]*Z for _ in range(dc)]
            for ci, col in enumerate(connected_cols):
                shift = int(H_BASE[row, col])
                for z in range(Z):
                    shifted_z = (z + shift) % Z
                    bit_idx = col * Z + shifted_z
                    old_msg = msg[row][col][z]
                    vn_to_cn[ci][z] = sat_sub_q(beliefs[bit_idx], old_msg)

            # Step 2: CN min-sum update (only over connected columns)
            cn_to_vn = [[0]*Z for _ in range(dc)]
            for z in range(Z):
                cn_inputs = [vn_to_cn[ci][z] for ci in range(dc)]
                cn_outputs = min_sum_cn_update(cn_inputs)
                for ci in range(dc):
                    cn_to_vn[ci][z] = cn_outputs[ci]

            # Step 3: Update beliefs and store new messages
            for ci, col in enumerate(connected_cols):
                shift = int(H_BASE[row, col])
                for z in range(Z):
                    shifted_z = (z + shift) % Z
                    bit_idx = col * Z + shifted_z
                    new_msg = cn_to_vn[ci][z]
                    extrinsic = vn_to_cn[ci][z]
                    beliefs[bit_idx] = sat_add_q(extrinsic, new_msg)
                    msg[row][col][z] = new_msg

        # Syndrome check
        hard = [1 if b < 0 else 0 for b in beliefs]
        syndrome_weight = compute_syndrome_weight(hard)

        if early_term and syndrome_weight == 0:
            return np.array(hard[:K]), True, iteration + 1, 0

    hard = [1 if b < 0 else 0 for b in beliefs]
    syndrome_weight = compute_syndrome_weight(hard)
    return np.array(hard[:K]), syndrome_weight == 0, max_iter, syndrome_weight


def compute_syndrome_weight(hard_bits):
    """Compute syndrome weight = number of unsatisfied parity checks."""
    weight = 0
    for r in range(M_BASE):
        for z in range(Z):
            parity = 0
            for c in range(N_BASE):
                shift = int(H_BASE[r, c])
                if shift < 0:
                    continue
                shifted_z = (z + shift) % Z
                bit_idx = c * Z + shifted_z
                parity ^= hard_bits[bit_idx]
            if parity:
                weight += 1
    return weight


def run_ber_simulation(lam_s_db_range, lam_b=0.1, n_frames=1000, max_iter=30):
    """
    Run BER simulation over a range of signal photon counts.

    Args:
        lam_s_db_range: signal photons/slot in dB (10*log10(lam_s))
        lam_b: background photon rate
        n_frames: number of codewords per SNR point
        max_iter: decoder iterations
    """
    H = build_full_h_matrix()
    print(f"H matrix: {H.shape}, rank = {np.linalg.matrix_rank(H.astype(float))}")
    print(f"Code: ({N},{K}) rate {K/N:.3f}, Z={Z}")
    print(f"Background photons: {lam_b}")
    print(f"{'lam_s_dB':>10s} {'lam_s':>8s} {'BER':>10s} {'FER':>10s} {'avg_iter':>10s}")
    print("-" * 55)

    results = []
    for lam_s_db in lam_s_db_range:
        lam_s = 10**(lam_s_db / 10)
        bit_errors = 0
        frame_errors = 0
        total_bits = 0
        total_iter = 0

        for frame in range(n_frames):
            # Random info bits
            info = np.random.randint(0, 2, K)

            # Encode
            codeword = ldpc_encode(info, H)

            # Channel
            llr_float, _ = poisson_channel(codeword, lam_s, lam_b)
            llr_q = quantize_llr(llr_float)

            # Decode
            decoded, converged, iters, _ = decode_layered_min_sum(llr_q, max_iter)
            total_iter += iters

            # Count errors
            errs = np.sum(decoded != info)
            bit_errors += errs
            total_bits += K
            if errs > 0:
                frame_errors += 1

        ber = bit_errors / total_bits if total_bits > 0 else 0
        fer = frame_errors / n_frames
        avg_iter = total_iter / n_frames

        print(f"{lam_s_db:10.1f} {lam_s:8.3f} {ber:10.6f} {fer:10.4f} {avg_iter:10.1f}")
        results.append({
            'lam_s_db': lam_s_db, 'lam_s': lam_s,
            'ber': ber, 'fer': fer, 'avg_iter': avg_iter
        })

    return results


def generate_test_vectors(n_vectors=10, lam_s=2.0, lam_b=0.1, max_iter=30):
    """Generate test vectors for RTL verification."""
    H = build_full_h_matrix()
    vectors = []

    for i in range(n_vectors):
        info = np.random.randint(0, 2, K)
        codeword = ldpc_encode(info, H)
        llr_float, photons = poisson_channel(codeword, lam_s, lam_b)
        llr_q = quantize_llr(llr_float)
        decoded, converged, iters, syn_wt = decode_layered_min_sum(llr_q, max_iter)

        vec = {
            'index': i,
            'info_bits': info.tolist(),
            'codeword': codeword.tolist(),
            'photon_counts': photons.tolist(),
            'llr_float': llr_float.tolist(),
            'llr_quantized': llr_q.tolist(),
            'decoded_bits': decoded.tolist(),
            'converged': bool(converged),
            'iterations': iters,
            'syndrome_weight': syn_wt,
            'bit_errors': int(np.sum(decoded != info)),
        }
        vectors.append(vec)
        status = "PASS" if np.array_equal(decoded, info) else f"FAIL ({vec['bit_errors']} errs)"
        print(f"  Vector {i}: {status} (iter={iters}, converged={converged})")

    return vectors


def main():
    parser = argparse.ArgumentParser(description='LDPC Decoder Behavioral Model')
    parser.add_argument('--gen-vectors', action='store_true',
                        help='Generate RTL test vectors')
    parser.add_argument('--sweep-snr', action='store_true',
                        help='Run BER vs SNR sweep')
    parser.add_argument('--n-frames', type=int, default=1000,
                        help='Frames per SNR point (default: 1000)')
    parser.add_argument('--max-iter', type=int, default=30,
                        help='Max decoder iterations (default: 30)')
    parser.add_argument('--lam-s', type=float, default=2.0,
                        help='Signal photons/slot for test vectors (default: 2.0)')
    parser.add_argument('--lam-b', type=float, default=0.1,
                        help='Background photons/slot (default: 0.1)')
    parser.add_argument('--seed', type=int, default=42,
                        help='Random seed (default: 42)')
    args = parser.parse_args()

    np.random.seed(args.seed)

    if args.gen_vectors:
        print(f"Generating test vectors (lam_s={args.lam_s}, lam_b={args.lam_b})...")
        vectors = generate_test_vectors(
            n_vectors=20, lam_s=args.lam_s, lam_b=args.lam_b,
            max_iter=args.max_iter
        )
        out_path = os.path.join(os.path.dirname(__file__), '..', 'data', 'test_vectors.json')
        with open(out_path, 'w') as f:
            json.dump(vectors, f, indent=2)
        print(f"\nWrote {len(vectors)} vectors to {out_path}")

    elif args.sweep_snr:
        print("BER Sweep: Poisson photon-counting channel, rate-1/8 QC-LDPC")
        lam_s_db_range = np.arange(-6, 10, 1.0)  # -6 to +9 dB
        results = run_ber_simulation(
            lam_s_db_range, lam_b=args.lam_b,
            n_frames=args.n_frames, max_iter=args.max_iter
        )
        out_path = os.path.join(os.path.dirname(__file__), '..', 'data', 'ber_results.json')
        with open(out_path, 'w') as f:
            json.dump(results, f, indent=2)
        print(f"\nWrote results to {out_path}")

    else:
        # Quick demo
        print("=== LDPC Rate-1/8 Decoder Demo ===")
        print(f"Code: ({N},{K}), rate {K/N:.3f}, Z={Z}")

        H = build_full_h_matrix()
        print(f"H matrix: {H.shape}, density: {H.sum()/(H.shape[0]*H.shape[1]):.4f}")

        info = np.random.randint(0, 2, K)
        print(f"\nInfo bits ({K}): {info}")

        codeword = ldpc_encode(info, H)
        print(f"Codeword ({N} bits), weight: {codeword.sum()}")

        # Simulate at a few photon levels
        for lam_s in [0.5, 1.0, 2.0, 5.0]:
            np.random.seed(args.seed)
            llr_float, photons = poisson_channel(codeword, lam_s, args.lam_b)
            llr_q = quantize_llr(llr_float)
            decoded, converged, iters, syn_wt = decode_layered_min_sum(llr_q)
            errors = np.sum(decoded != info)
            print(f"  lam_s={lam_s:.1f}: decoded in {iters} iter, "
                  f"converged={converged}, errors={errors}")


if __name__ == '__main__':
    main()