You are given a string s
of even length consisting of
digits from 0
to 9
, and two integers a
and b
.
You can apply either of the following two operations any number of times and in any
order on s
:
a
to all odd indices of s
(0-indexed). Digits post 9
are cycled back to
0
. For example, if s = "3456"
and a = 5
,
s
becomes "3951"
.
s
to the right by b
positions. For example, if
s = "3456"
and b = 1
, s
becomes "6345"
.
Return the lexicographically smallest string you can obtain by
applying the above operations any number of times on s
.
A string a
is lexicographically smaller than a string b
(of
the same length) if in the first position where a
and b
differ, string a
has a letter that appears earlier in the alphabet than
the corresponding letter in b
. For example, "0158"
is
lexicographically smaller than "0190"
because the first position they
differ is at the third letter, and '5'
comes before '9'
.
Example 1:
Input: s = "5525", a = 9, b = 2 Output: "2050" Explanation: We can apply the following operations: Start: "5525" Rotate: "2555" Add: "2454" Add: "2353" Rotate: "5323" Add: "5222" Add: "5121" Rotate: "2151" Add: "2050" There is no way to obtain a string that is lexicographically smaller then "2050".
Example 2:
Input: s = "74", a = 5, b = 1 Output: "24" Explanation: We can apply the following operations: Start: "74" Rotate: "47" Add: "42" Rotate: "24" There is no way to obtain a string that is lexicographically smaller then "24".
Example 3:
Input: s = "0011", a = 4, b = 2 Output: "0011" Explanation: There are no sequence of operations that will give us a lexicographically smaller string than "0011".
Example 4:
Input: s = "43987654", a = 7, b = 3 Output: "00553311"
Constraints:
2 <= s.length <= 100
s.length
is even.s
consists of digits from 0
to 9
only.
1 <= a <= 9
1 <= b <= s.length - 1