Inspired by this challenge, I have a similar, with stricter rules.
Find a word that can be decomposed into several other words (more than one). Those words are not allowed to be proper substrings of the starting word. Entries are scored by the length of the shortest word.
Despite the stricter rules, my entry there would be just as valid here.
Here's my word (again) with a score of 5.
TrIeNnIaLlY.
Made up of the words TINILY and renal with alternating letters. And neither word is a proper substring of the original.
EDIT:
Inspired from pacoverflow's answer to the original challenge, here's a word of score 11 with a small tweak of mine.
REinstitutionALIZATIONs
Made up of the words REALIZATION and institutions, with simply the pluralizing 's' at the end for the word institutions, thereby making this fit the new tougher rules.
The highest-scoring word in the Wolfram dictionary is:
interrelatedness
Which consists of:
INTERRElateDness
and
interreLATEdNESS
Found using:
n = 8;
wl = ToLowerCase@DictionaryLookup[Repeated[_, {n}]];
wl2 = ToLowerCase@DictionaryLookup[Repeated[_, {2 n}]];
subwords =
Cases[Table[
w -> Select[wl,
LongestCommonSequence[w, #] == # &&
LongestCommonSubsequence[w, #] != # &], {w, wl2}],
Pattern[p, _ -> {_, __}]];
Cases[subwords, (w_ -> {___, a_, ___, b_, ___}) /; (Sort[
Characters[w]] == Sort[Characters[a]~Join~Characters[b]]) :> {w,
a, b}]
