In the end, this is the best I could come up with with the help of other answers here and elsewere is this:

On the left, x and y vary over only a part of an order of magnitude, with labels working out fairly well. On the left, x varies between 1 and 2 orders of magnitude. It works okay, but the method is reaching it's limit. The y values vary many orders of magnitude and the standard labels are used automatically.

```
from matplotlib import ticker
from numpy import linspace, logspace, log10, floor
from warnings import warn
def round_to_n(x, n):
''' http://stackoverflow.com/questions/3410976/how-to-round-a-number-to-significant-figures-in-python '''
return round(x, -int(floor(log10(abs(x)))) + (n - 1))
def ticks_log_format(value, index):
''' http://stackoverflow.com/questions/19239297/matplotlib-bad-ticks-labels-for-loglog-twin-axis '''
pwr = floor(log10(value))
base = value / (10 ** pwr)
if pwr == 0 or pwr == 1:
return '${0:d}$'.format(int(value))
if -3 <= pwr < 0:
return '${0:.3g}$'.format(value)
if 0 < pwr <= 3:
return '${0:d}$'.format(int(value))
else:
return '${0:d}\\times10^{{{1:d}}}$'.format(int(base), int(pwr))
def calc_ticks(domain, tick_count, equidistant):
if equidistant:
ticks = logspace(log10(domain[0]), log10(domain[1]), num = tick_count, base = 10)
else:
ticks = linspace(domain[0], domain[1], num = tick_count)
for n in range(1, 6):
if len(set(round_to_n(tick, n) for tick in ticks)) == tick_count:
break
return list(round_to_n(tick, n) for tick in ticks)
''' small domain log ticks '''
def sdlt_x(ax, domain, tick_count = 4, equidistant = True):
''' http://stackoverflow.com/questions/3410976/how-to-round-a-number-to-significant-figures-in-python '''
if min(domain) <= 0:
warn('domain %g-%g contains values lower than 0' % (domain[0], domain[1]))
domain = [max(value, 0.) for value in domain]
ax.set_xscale('log')
ax.set_xlim(domain)
ax.xaxis.set_major_formatter(ticker.FuncFormatter(ticks_log_format))
if log10(max(domain) / min(domain)) > 1.7:
return
ticks = calc_ticks(domain, tick_count = tick_count, equidistant = equidistant)
ax.set_xticks(ticks)
''' any way to prevent this code duplication? '''
def sdlt_y(ax, domain, tick_count = 5, equidistant = True):
''' http://stackoverflow.com/questions/3410976/how-to-round-a-number-to-significant-figures-in-python '''
if min(domain) <= 0:
warn('domain %g-%g contains values lower than 0' % (domain[0], domain[1]))
domain = [max(value, 1e-8) for value in domain]
ax.set_yscale('log')
ax.set_ylim(domain)
ax.yaxis.set_major_formatter(ticker.FuncFormatter(ticks_log_format))
if log10(max(domain) / min(domain)) > 1.7:
return
ticks = calc_ticks(domain, tick_count = tick_count, equidistant = equidistant)
ax.set_yticks(ticks)
''' demo '''
fig, (ax1, ax2,) = plt.subplots(1, 2)
for mi, ma, ax in ((100, 130, ax1,), (10, 400, ax2,), ):
x = np.linspace(mi, ma, 50)
y = 1 / ((x + random(50) * 0.1 * (ma - mi)) ** 4)
ax.scatter(x, y)
sdlt_x(ax, (mi, ma, ))
sdlt_y(ax, (min(y), max(y), ))
show()
```

**EDIT**: updated with an option to make labels equidistant (so the values are logarithmic, but the visible positions are equidistant).

`twinx`

and`twiny`

to get the eV and angstrom axes, but never plot anything to them. You need to explicitly set their limits to match the limits on your other axes (properly converted). – tcaswell Oct 8 '13 at 5:03