subsurface/device.c
Dirk Hohndel f12f9ae8c3 Change fake profile behavior
If no average depth is known the current fake profile behavior is rather
unintuitive (we make up an average depth).

Instead we should assume that this is a PADI style dive log and give the
user a "rectangular" profile (actually, it's a trapecoid as we at least
try to enforce a sane ascent / descent speed). If the dive is somewhat
longer or deeper (10 min / 10 m) we even add a 3m safety stop at 5m.

Added a new dives/test0b that tries to capture the typical cases to test
this.

Fixes #398

Signed-off-by: Dirk Hohndel <dirk@hohndel.org>
2014-01-08 21:54:29 +08:00

174 lines
5 KiB
C

#include <string.h>
#include "dive.h"
#include "device.h"
/*
* Good fake dive profiles are hard.
*
* "depthtime" is the integral of the dive depth over
* time ("area" of the dive profile). We want that
* area to match the average depth (avg_d*max_t).
*
* To do that, we generate a 6-point profile:
*
* (0, 0)
* (t1, max_d)
* (t2, max_d)
* (t3, d)
* (t4, d)
* (max_t, 0)
*
* with the same ascent/descent rates between the
* different depths.
*
* NOTE: avg_d, max_d and max_t are given constants.
* The rest we can/should play around with to get a
* good-looking profile.
*
* That six-point profile gives a total area of:
*
* (max_d*max_t) - (max_d*t1) - (max_d-d)*(t4-t3)
*
* And the "same ascent/descent rates" requirement
* gives us (time per depth must be same):
*
* t1 / max_d = (t3-t2) / (max_d-d)
* t1 / max_d = (max_t-t4) / d
*
* We also obviously require:
*
* 0 <= t1 <= t2 <= t3 <= t4 <= max_t
*
* Let us call 'd_frac = d / max_d', and we get:
*
* Total area must match average depth-time:
*
* (max_d*max_t) - (max_d*t1) - (max_d-d)*(t4-t3) = avg_d*max_t
* max_d*(max_t-t1-(1-d_frac)*(t4-t3)) = avg_d*max_t
* max_t-t1-(1-d_frac)*(t4-t3) = avg_d*max_t/max_d
* t1+(1-d_frac)*(t4-t3) = max_t*(1-avg_d/max_d)
*
* and descent slope must match ascent slopes:
*
* t1 / max_d = (t3-t2) / (max_d*(1-d_frac))
* t1 = (t3-t2)/(1-d_frac)
*
* and
*
* t1 / max_d = (max_t-t4) / (max_d*d_frac)
* t1 = (max_t-t4)/d_frac
*
* In general, we have more free variables than we have constraints,
* but we can aim for certain basics, like a good ascent slope.
*/
static int fill_samples(struct sample *s, int max_d, int avg_d, int max_t, double slope, double d_frac)
{
double t_frac = max_t*(1-avg_d/(double)max_d);
int t1 = max_d / slope;
int t4 = max_t - t1*d_frac;
int t3 = t4-(t_frac-t1)/(1-d_frac);
int t2 = t3-t1*(1-d_frac);
if (t1 < 0 || t1 > t2 || t2 > t3 || t3 > t4 || t4 > max_t)
return 0;
s[1].time.seconds = t1; s[1].depth.mm = max_d;
s[2].time.seconds = t2; s[2].depth.mm = max_d;
s[3].time.seconds = t3; s[3].depth.mm = max_d * d_frac;
s[4].time.seconds = t4; s[4].depth.mm = max_d * d_frac;
return 1;
}
/* we have no average depth; instead of making up a random average depth
* we should assume either a PADI recrangular profile (for short and/or
* shallow dives) or more reasonably a six point profile with a 3 minute
* safety stop at 5m */
static void fill_samples_no_avg(struct sample *s, int max_d, int max_t, double slope)
{
// shallow or short dives are just trapecoids based on the given slope
if (max_d < 10000 || max_t < 600) {
s[1].time.seconds = max_d / slope; s[1].depth.mm = max_d;
s[2].time.seconds = max_t - max_d / slope; s[2].depth.mm = max_d;
} else {
s[1].time.seconds = max_d / slope;
s[1].depth.mm = max_d;
s[2].time.seconds = max_t - max_d / slope - 180;
s[2].depth.mm = max_d;
s[3].time.seconds = max_t - 5000 / slope - 180;
s[3].depth.mm = 5000;
s[4].time.seconds = max_t - 5000 / slope;
s[4].depth.mm = 5000;
}
}
struct divecomputer* fake_dc(struct divecomputer* dc)
{
static struct sample fake[6];
static struct divecomputer fakedc;
fakedc = (*dc);
fakedc.sample = fake;
fakedc.samples = 6;
/* The dive has no samples, so create a few fake ones */
int max_t = dc->duration.seconds;
int max_d = dc->maxdepth.mm;
int avg_d = dc->meandepth.mm;
memset(fake, 0, sizeof(fake));
fake[5].time.seconds = max_t;
if (!max_t || !max_d)
return &fakedc;
/*
* We want to fake the profile so that the average
* depth ends up correct. However, in the absense of
* a reasonable average, let's just make something
* up. Note that 'avg_d == max_d' is _not_ a reasonable
* average.
* We explicitly treat avg_d == 0 differently */
if (avg_d == 0) {
/* we try for a sane slope, but bow to the insanity of
* the user supplied data */
fill_samples_no_avg(fake, max_d, max_t, MAX(2.0 * max_d / max_t, 5000.0 / 60));
if(fake[3].time.seconds == 0) { // just a 4 point profile
fakedc.samples = 4;
fake[3].time.seconds = max_t;
}
return &fakedc;
}
if (avg_d < max_d / 10 || avg_d >= max_d) {
avg_d = (max_d+10000)/3;
if (avg_d > max_d)
avg_d = max_d * 2 / 3;
}
if (!avg_d)
avg_d = 1;
/*
* Ok, first we try a basic profile with a specific ascent
* rate (5 meters per minute) and d_frac (1/3).
*/
if (fill_samples(fake, max_d, avg_d, max_t, 5000.0 / 60, 0.33))
return &fakedc;
/*
* Ok, assume that didn't work because we cannot make the
* average come out right because it was a quick deep dive
* followed by a much shallower region
*/
if (fill_samples(fake, max_d, avg_d, max_t, 10000.0 / 60, 0.10))
return &fakedc;
/*
* Uhhuh. That didn't work. We'd need to find a good combination that
* satisfies our constraints. Currently, we don't, we just give insane
* slopes.
*/
if (fill_samples(fake, max_d, avg_d, max_t, 10000.0, 0.01))
return &fakedc;
/* Even that didn't work? Give up, there's something wrong */
return &fakedc;
}