I would like to plot a set of points using pyplot in matplotlib but have none of the points be on the edge of my axes. The autoscale (or something) sets the `xlim`

and `ylim`

such that often the first and last points lie at `x = xmin`

or `xmax`

making it difficult to read in some situations.

This is more often problematic with `loglog()`

or `semilog()`

plots because the autoscale would like `xmin`

and `xmax`

to be exact powers of ten, but if my data contains only three points, e.g. at `xdata = [10**2,10**3,10**4]`

then the first and last points will lie on the border of the plot.

## Attempted Workaround

This is my solution to add a 10% buffer to either side of the graph. But is there a way to do this more elegantly or automatically?

```
from numpy import array, log10
from matplotlib.pyplot import *
xdata = array([10**2,10**3,10**4])
ydata = xdata**2
figure()
loglog(xdata,ydata,'.')
xmin,xmax = xlim()
xbuff = 0.1*log10(xmax/xmin)
xlim(xmin*10**(-xbuff),xmax*10**(xbuff))
```

I am hoping for a one- or two-line solution that I can easily use whenever I make a plot like this.

## Linear Plot

To make clear what I'm doing in my workaround, I should add an example in linear space (instead of log space):

```
plot(xdata,ydata)
xmin,xmax = xlim()
xbuff = 0.1*(xmax-xmin)
xlim(xmin-xbuff,xmax+xbuff))
```

which is identical to the previous example but for a linear axis.

## Limits too large

A related problem is that sometimes the limits are too large. Say my data is something like `ydata = xdata**0.25`

so that the variance in the range is much less than a decade but ends at exactly `10**1`

. Then, the autoscale `ylim`

are `10**0`

to `10**1`

though the data are only in the top portion of the plot. Using my workaround above, I can increase `ymax`

so that the third point is fully within the limits but I don't know how to *increase* `ymin`

so that there is less whitespace at the lower portion of my plot. i.e., the point is that I don't always want to spread my limits apart but would just like to have some constant (or proportional) buffer around all my points.