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I've trying to mix together 2 16bit linear PCM audio streams and I can't seem to overcome the noise issues. I think they are coming from overflow when mixing samples together.

I have following function ...

short int mix_sample(short int sample1, short int sample2)
{
    return #mixing_algorithm#;
}

... and here's what I have tried as #mixing_algorithm#

sample1/2 + sample2/2
2*(sample1 + sample2) - 2*(sample1*sample2) - 65535
(sample1 + sample2) - sample1*sample2
(sample1 + sample2) - sample1*sample2 - 65535
(sample1 + sample2) - ((sample1*sample2) >> 0x10) // same as divide by 65535

Some of them have produced better results than others but even the best result contained quite a lot of noise.

Any ideas how to solve it?

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can you write the full algorithm,I can't see any assignments!! –  perilbrain Aug 23 '12 at 10:37
    
When you divide sample1 and sample2 by 2, you get error range of 1. –  huseyin tugrul buyukisik Aug 23 '12 at 10:38

4 Answers 4

up vote 4 down vote accepted

here's a descriptive implementation:

short int mix_sample(short int sample1, short int sample2) {
    const int32_t result(static_cast<int32_t>(sample1) + static_cast<int32_t>(sample2));
    typedef std::numeric_limits<short int> Range;
    if (Range::max() < result)
        return Range::max();
    else if (Range::min() > result)
        return Range::min();
    else
        return result;
}

to mix, it's just add and clip!

to avoid clipping artifacts, you will want to use saturation or a limiter. ideally, you will have a small int32_t buffer with a small amount of lookahead. this will introduce latency.

more common than limiting everywhere, is to leave a few bits' worth of 'headroom' in your signal.

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This solution worked well. Thank You! –  Ragnar Aug 23 '12 at 18:14
    
@Ragnar great - you're welcome :) –  justin Aug 23 '12 at 18:17
    
The only "correct" way to avoid clipping is to divide by two. There is some illustrative code here in the "Distortion and Noise" Section: blog.bjornroche.com/2013/05/… –  Bjorn Roche Aug 23 '13 at 12:40

I think they should be functions mapping [MIN_SHORT, MAX_SHORT] -> [MIN_SHORT, MAX_SHORT] and they are clearly not (besides first one), so overflows occurs.

If unwind's proposition won't work you can also try:

((long int)(sample1) + sample2) / 2
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While adding the signals is correct; with simple normalisation to maintain range, one signal will affect the other undesirably. For example if sample1 is always zero (silent), you would want only sample2, but you get sample2 / 2 - i.e. the output is quieter. –  Clifford Aug 3 at 8:01

Since you are in time domain the frequency info is in the difference between successive samples, when you divide by two you damage that information. That's why adding and clipping works better. Clipping will of course add very high frequency noise which is probably filtered out.

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I expect the noise the OP is hearing is caused by the values wrapping, rather than anything as subtle as a single bit of lost resolution –  Will Jun 3 at 12:42

The best solution I have found is given by Viktor Toth. He provides a solution for 8-bit unsigned PCM, and changing that for 16-bit signed PCM, produces this:

int a = 111; // first sample (-32768..32767)
int b = 222; // second sample
int m; // mixed result will go here

// Make both samples unsigned (0..65535)
a += 32768;
b += 32768;

// Pick the equation
if ((a < 32768) || (b < 32768)) {
    // Viktor's first equation when both sources are "quiet"
    // (i.e. less than middle of the dynamic range)
    m = a * b / 32768;
} else {
    // Viktor's second equation when one or both sources are loud
    m = 2 * (a + b) - (a * b) / 32768 - 65536;
}

// Output is unsigned (0..65536) so convert back to signed (-32768..32767)
if (m == 65536) m = 65535;
m -= 32768;

Using this algorithm means there is almost no need to clip the output as it is only one value short of being within range. Unlike straight averaging, the volume of one source is not reduced even when the other source is silent.

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What do you mean by "quiet"? - that would normally be mean low magnitude (near the middle), but here you appear to mean negative (below the middle), whereas the "loud" equation is executed when one or both are positive (before shifting - i.e. adding a DC bias)). Apart from that volume is a perception of the signal, not an individual sample - a "loud" sound will have samples across the entire range. –  Clifford Aug 3 at 7:28
    
@Clifford: Middle being the middle of the available range, so if the values are between 0 and 65535, then the middle is 32767. It is better explained at the link to Viktor Toth's page. –  Malvineous Aug 3 at 7:30
    
I realise that - my question was rhetorical - the terms "quiet" and "loud" are inaccurate and misleading in this context. –  Clifford Aug 3 at 7:32
    
Which is exactly why I put "quiet" in scare quotes, to hint that the meaning is a little different to what you might expect :-) Plus I then followed it with an explanation of what I meant... –  Malvineous Aug 3 at 7:36
    
In the original explanation it is about relationship to the mid-point; the term "quiet" is used differently and correctly there to mean "close to the midpoint". Although this is the best answer IMO (hence the up-vote), the comments are a misrepresentation of Victor Toth's explanation. –  Clifford Aug 3 at 7:57

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