YES

Prover = TRS(tech=GUIDED_UNF_TRIPLES, nb_unfoldings=unlimited, unfold_variables=false, max_nb_coefficients=12, max_nb_unfolded_rules=-1, strategy=LEFTMOST_NE)

** BEGIN proof argument **
All the DP problems were proved finite.
As all the involved DP processors are sound,
the TRS under analysis terminates.
** END proof argument **

** BEGIN proof description **
## Searching for a generalized rewrite rule
(a rule whose right-hand side contains a variable
that does not occur in the left-hand side)...
No generalized rewrite rule found!

## Applying the DP framework...
## Round 1:
  ## DP problem: 
  Dependency pairs = [+^#(_0,+(_1,_2)) -> +^#(+(_0,_1),_2), +^#(_0,+(_1,_2)) -> +^#(_0,_1), +^#(*(_0,_1),+(_0,_2)) -> +^#(_1,_2), +^#(*(_0,_1),+(*(_0,_2),_3)) -> +^#(*(_0,+(_1,_2)),_3), +^#(*(_0,_1),+(*(_0,_2),_3)) -> +^#(_1,_2)]
  TRS = {+(_0,+(_1,_2)) -> +(+(_0,_1),_2), +(*(_0,_1),+(_0,_2)) -> *(_0,+(_1,_2)), +(*(_0,_1),+(*(_0,_2),_3)) -> +(*(_0,+(_1,_2)),_3)}
    ## Trying with homeomorphic embeddings... Failed!
    ## Trying with polynomial interpretations...
      The constraints are satisfied by the polynomials:
      {+(_0,_1):[_0 * _1], *(_0,_1):[_0 * _1], +^#(_0,_1):[_0]}
      for all instantiations of the variables with values greater than or equal to mu = 2.
  This DP problem is finite.

** END proof description **

Proof stopped at iteration 0
Number of unfolded rules generated by this proof = 0
Number of unfolded rules generated by all the parallel proofs = 112