Numbers That Count

Time Limit: 1000MS		Memory Limit: 10000K
Total Submissions: 20396		Accepted: 6817

"Kronecker's Knumbers" is a little company that manufactures plastic digits for use in signs (theater marquees, gas station price displays, and so on). The owner and sole employee, Klyde Kronecker, keeps track of how many digits of each type he has used by maintaining an inventory book. For instance, if he has just made a sign containing the telephone number "5553141", he'll write down the number "5553141" in one column of his book, and in the next column he'll list how many of each digit he used: two 1s, one 3, one 4, and three 5s. (Digits that don't get used don't appear in the inventory.) He writes the inventory in condensed form, like this: "21131435".

The other day, Klyde filled an order for the number 31123314 and was
amazed to discover that the inventory of this number is the same as the
number---it has three 1s, one 2, three 3s, and one 4! He calls this an
example of a "self-inventorying number", and now he wants to find out
which numbers are self-inventorying, or lead to a self-inventorying
number through iterated application of the inventorying operation
described below. You have been hired to help him in his investigations.

Given any non-negative integer n, its inventory is another integer
consisting of a concatenation of integers c1 d1 c2 d2 ... ck dk , where
each ci and di is an unsigned integer, every ci is positive, the di
satisfy 0<=d1<d2<...<dk<=9, and, for each digit d that
appears anywhere in n, d equals di for some i and d occurs exactly ci
times in the decimal representation of n. For instance, to compute the
inventory of 5553141 we set c1 = 2, d1 = 1, c2 = 1, d2 = 3, etc., giving
21131435. The number 1000000000000 has inventory 12011 ("twelve 0s, one
1").

An integer n is called self-inventorying if n equals its inventory.
It is called self-inventorying after j steps (j>=1) if j is the
smallest number such that the value of the j-th iterative application of
the inventory function is self-inventorying. For instance, 21221314 is
self-inventorying after 2 steps, since the inventory of 21221314 is
31321314, the inventory of 31321314 is 31123314, and 31123314 is
self-inventorying.

Finally, n enters an inventory loop of length k (k>=2) if k is
the smallest number such that for some integer j (j>=0), the value of
the j-th iterative application of the inventory function is the same as
the value of the (j + k)-th iterative application. For instance,
314213241519 enters an inventory loop of length 2, since the inventory
of 314213241519 is 412223241519 and the inventory of 412223241519 is
314213241519, the original number (we have j = 0 in this case).

Write a program that will read a sequence of non-negative integers
and, for each input value, state whether it is self-inventorying,
self-inventorying after j steps, enters an inventory loop of length k,
or has none of these properties after 15 iterative applications of the
inventory function.

A
sequence of non-negative integers, each having at most 80 digits,
followed by the terminating value -1. There are no extra leading zeros.

For
each non-negative input value n, output the appropriate choice from
among the following messages (where n is the input value, j is a
positive integer, and k is a positive integer greater than 1):

n is self-inventorying

n is self-inventorying after j steps

n enters an inventory loop of length k

n can not be classified after 15 iterations

22

31123314

314213241519

21221314

111222234459

-1

22 is self-inventorying

31123314 is self-inventorying

314213241519 enters an inventory loop of length 2

21221314 is self-inventorying after 2 steps

111222234459 enters an inventory loop of length 2 

题意：

水题题意太繁就不写了吧。

代码：