Why not just shuffle the bits around in a specific order before converting to the base 26 value? For example, bit 0 becomes bit 5, bit 1 becomes bit 2, etc. To decode, just do the reverse.

Here's an example in Python. (Edited now to include converting the base too.)

```
import random
# generate a random bit order
# you'll need to save this mapping permanently, perhaps just hardcode it
# map how ever many bits you need to represent your integer space
mapping = range(28)
mapping.reverse()
#random.shuffle(mapping)
# alphabet for changing from base 10
chars = 'abcdefghijklmnopqrstuvwxyz'
# shuffle the bits
def encode(n):
result = 0
for i, b in enumerate(mapping):
b1 = 1 << i
b2 = 1 << mapping[i]
if n & b1:
result |= b2
return result
# unshuffle the bits
def decode(n):
result = 0
for i, b in enumerate(mapping):
b1 = 1 << i
b2 = 1 << mapping[i]
if n & b2:
result |= b1
return result
# change the base
def enbase(x):
n = len(chars)
if x < n:
return chars[x]
return enbase(x/n) + chars[x%n]
# go back to base 10
def debase(x):
n = len(chars)
result = 0
for i, c in enumerate(reversed(x)):
result += chars.index(c) * (n**i)
return result
# test it out
for a in range(200):
b = encode(a)
c = enbase(b)
d = debase(c)
e = decode(d)
while len(c) < 7:
c = ' ' + c
print '%6d %6d %s %6d %6d' % (a, b, c, d, e)
```

The output of this script, showing the encoding and decoding process:

```
0 0 a 0 0
1 134217728 lhskyi 134217728 1
2 67108864 fqwfme 67108864 2
3 201326592 qyoqkm 201326592 3
4 33554432 cvlctc 33554432 4
5 167772160 oddnrk 167772160 5
6 100663296 imhifg 100663296 6
7 234881024 ttztdo 234881024 7
8 16777216 bksojo 16777216 8
9 150994944 mskzhw 150994944 9
10 83886080 hbotvs 83886080 10
11 218103808 sjheua 218103808 11
12 50331648 egdrcq 50331648 12
13 184549376 pnwcay 184549376 13
14 117440512 jwzwou 117440512 14
15 251658240 veshnc 251658240 15
16 8388608 sjheu 8388608 16
17 142606336 mabsdc 142606336 17
18 75497472 gjfmqy 75497472 18
19 209715200 rqxxpg 209715200 19
```

Note that zero maps to zero, but you can just skip that number.

This is simple, efficient and should be good enough for your purposes. If you really needed something secure I obviously would not recommend this. It's basically a naive block cipher. There won't be any collisions.

Probably best to make sure that bit N doesn't ever map to bit N (no change) and probably best if some low bits in the input get mapped to higher bits in the output, in general. In other words, you may want to generate the mapping by hand. In fact, a decent mapping would be simply reversing the bit order. (That's what I did for the sample output above.)