100 atcoder#ABC165C. [ABC165C] Many Requirements

[ABC165C] Many Requirements

Score : 300300 points

Problem Statement

Given are positive integers NN, MM, QQ, and QQ quadruples of integers ( aia_i , bib_i , cic_i , did_i ).

Consider a sequence AA satisfying the following conditions:

  • AA is a sequence of NN positive integers.
  • 1A1A2ANM1 \leq A_1 \leq A_2 \le \cdots \leq A_N \leq M.

Let us define a score of this sequence as follows:

  • The score is the sum of did_i over all indices ii such that AbiAai=ciA_{b_i} - A_{a_i} = c_i. (If there is no such ii, the score is 00.)

Find the maximum possible score of AA.

Constraints

  • All values in input are integers.
  • 2N102 \leq N \leq 10
  • 1M101 \leq M \leq 10
  • 1Q501 \leq Q \leq 50
  • 1ai<biN1 \leq a_i < b_i \leq N ( i=1,2,...,Qi = 1, 2, ..., Q )
  • 0ciM10 \leq c_i \leq M - 1 ( i=1,2,...,Qi = 1, 2, ..., Q )
  • (ai,bi,ci)(aj,bj,cj)(a_i, b_i, c_i) \neq (a_j, b_j, c_j) (where iji \neq j)
  • 1di1051 \leq d_i \leq 10^5 ( i=1,2,...,Qi = 1, 2, ..., Q )

Input

Input is given from Standard Input in the following format:

NN MM QQ

a1a_1 b1b_1 c1c_1 d1d_1

::

aQa_Q bQb_Q cQc_Q dQd_Q

Output

Print the maximum possible score of AA.

3 4 3
1 3 3 100
1 2 2 10
2 3 2 10
110

When A={1,3,4}A = \{1, 3, 4\}, its score is 110110. Under these conditions, no sequence has a score greater than 110110, so the answer is 110110.

4 6 10
2 4 1 86568
1 4 0 90629
2 3 0 90310
3 4 1 29211
3 4 3 78537
3 4 2 8580
1 2 1 96263
1 4 2 2156
1 2 0 94325
1 4 3 94328
357500
10 10 1
1 10 9 1
1