(1) QTRSRRRProof (EQUIVALENT transformation)

Used ordering:
Lexicographic path order with status [LPO].
Precedence:

0 > pair₂ > fst₁
0 > nil > fst₁
tail₁ > activate₁ > natsFrom₁ > cons₂ > fst₁
tail₁ > activate₁ > natsFrom₁ > n_natsFrom1 > fst₁
tail₁ > activate₁ > natsFrom₁ > s₁ > fst₁
sel₂ > head₁ > fst₁
sel₂ > afterNth₂ > snd₁ > fst₁
sel₂ > afterNth₂ > splitAt₂ > u₄ > pair₂ > fst₁
sel₂ > afterNth₂ > splitAt₂ > u₄ > activate₁ > natsFrom₁ > cons₂ > fst₁
sel₂ > afterNth₂ > splitAt₂ > u₄ > activate₁ > natsFrom₁ > n_natsFrom1 > fst₁
sel₂ > afterNth₂ > splitAt₂ > u₄ > activate₁ > natsFrom₁ > s₁ > fst₁
take₂ > splitAt₂ > u₄ > pair₂ > fst₁
take₂ > splitAt₂ > u₄ > activate₁ > natsFrom₁ > cons₂ > fst₁
take₂ > splitAt₂ > u₄ > activate₁ > natsFrom₁ > n_natsFrom1 > fst₁
take₂ > splitAt₂ > u₄ > activate₁ > natsFrom₁ > s₁ > fst₁

Status:

sel₂: [1,2]
tail₁: [1]
afterNth₂: [1,2]
snd₁: [1]
head₁: [1]
n_natsFrom1: [1]
activate₁: [1]
take₂: [1,2]
splitAt₂: [1,2]
0: []
cons₂: [1,2]
u₄: [1,2,3,4]
fst₁: [1]
pair₂: [2,1]
s₁: [1]
natsFrom₁: [1]
nil: []

With this ordering the following rules can be removed by the rule removal processor [LPAR04] because they are oriented strictly:

natsFrom(N) → cons(N, n__natsFrom(s(N)))
fst(pair(XS, YS)) → XS
snd(pair(XS, YS)) → YS
splitAt(0, XS) → pair(nil, XS)
splitAt(s(N), cons(X, XS)) → u(splitAt(N, activate(XS)), N, X, activate(XS))
u(pair(YS, ZS), N, X, XS) → pair(cons(activate(X), YS), ZS)
head(cons(N, XS)) → N
tail(cons(N, XS)) → activate(XS)
sel(N, XS) → head(afterNth(N, XS))
take(N, XS) → fst(splitAt(N, XS))
afterNth(N, XS) → snd(splitAt(N, XS))
natsFrom(X) → n__natsFrom(X)
activate(n__natsFrom(X)) → natsFrom(X)
activate(X) → X

(3) RisEmptyProof (EQUIVALENT transformation)

The TRS R is empty. Hence, termination is trivially proven.