WSJT-X/jt9.txt
Joe Taylor d9df62b9e9 Now can see signal on both waterfall plots. (Far from correct, though!)
git-svn-id: svn+ssh://svn.code.sf.net/p/wsjt/wsjt/branches/wsjtx@2608 ab8295b8-cf94-4d9e-aec4-7959e3be5d79
2012-09-28 23:59:50 +00:00

64 lines
3.2 KiB
Plaintext

JT9 is a mode designed for amateur QSOs and beacon-like transmissions
at MF and LF. The mode uses the same 72-bit user messages as JT65.
Convolutional error-control coding (ECC) uses constraint length K=32,
rate r=1/2, and a zero tail, which leads to an encoded message length
of (72+31)*2 = 206 bits. Modulation is 9-FSK: 8 tones for data, one
for synchronization. Sixteen symbol intervals are used for
synchronization, so a transmission requires a total of 207/3 + 16 = 85
channel symbols. Symbol durations tsym are approximately
(TRperiod-10)/85, where TRperiod is the T/R sequence length in
seconds. Exact symbol lengths are chosen so that nsps, the number of
samples per symbol (at 12000 samples per second) is a number with no
prime factor greater than 7. This choice makes for efficient FFTs.
Tone spacing of the 9-FSK modulation is df=1/tsym=12000/nsps, the same
as the keying rate. The total occupied bandwidth is 9*df.
Parameters of five JT9 sub-modes are summarized in the following
table, along with S/N thresholds measured by simulation on an AWGN
(additive white Gaussian noise) channel.
-------------------------------------------------------------------------
Mode nsps nsps2 df tsym BW S/N* Tdec Tfree Factors
12000 750 (Hz) (s) (Hz) (dB) (s) (s) of nsps
-------------------------------------------------------------------------
JT9-1 6912 432 1.736 0.58 15.6 -26.9 52.5 7.5 2^8 3^3
JT9-2 15360 960 0.781 1.28 7.0 -30.2 112.3 7.7 2^10 3 5
JT9-5 40960 2560 0.293 3.41 2.6 -34.4 293.6 6.4 2^13 5
JT9-10 82944 5184 0.145 6.91 1.3 -37.5 591.0 9.0 2^10 3^4
JT9-30 250880 15750 0.048 20.91 0.4 -42.3 1788.5 11.5 2^5 3^2 5^3 7
-------------------------------------------------------------------------
* Noise power measured in a 2500 Hz bandwidth.
Transmitting
------------
1. Source encode the structured message to 72 bits
2. Apply convolutional ECC (K=32, r=1/2) to yield (72+31)*2 = 206 bits
3. Interleave to scramble the bit order
4. Assemble 3-bit groups to make (206+1)/3 = 69 symbols
5. Gray-code the symbol values
6. Insert 16 sync symbols ==> 69+15=81 channel symbols, values 0-8
Receiving
---------
1. Apply noise blanking with the timf2 method
2. Filter to 500 Hz bandwidth and downsample (1/16) to 750 Hz (FIR
filter with 61 taps). Complex data to array c0 (max 1.35M)
3. Compute symbol-length spectra at half-symbol steps. Use for
waterfall display s(15750) and save in ss(184,15750) and
savg(15750) for detecting sync vectors.
4. At time Tdec, find sync vectors in ss(); get estimates of DF, DT
5. Do full-length FFT, NFFT1=96*nsps2, zero-pad as required.
6. For each candidate signal, do inverse FFT of length 1536. This
yields 16 complex samples per symbol, and sync tone should be
close to zero frequency.
7. Use afc65b method to get improved values of DF, DT.
8. Tweak freq and time offset to 0.
9. Compute 8-bin spectra of 69 data symbols: s2(8,69). Re-order bins
by removing Gray code.
10. Compute soft symbols for 206 bits.
11. Remove interleaving
12. Pack bits into bytes, send to Fano decoder
13. If Fano succeeds, remove source encoding and display user message.