Let x be given.
Assume HxS: SNo x.
Apply (xm (0 x)) to the current goal.
Assume H0le: 0 x.
rewrite the current goal using (nonneg_abs_SNo x H0le) (from left to right).
An exact proof term for the current goal is H0le.
Assume Hn0le: ¬ (0 x).
rewrite the current goal using (not_nonneg_abs_SNo x Hn0le) (from left to right).
We prove the intermediate claim Hxlt0: x < 0.
Apply (SNoLt_trichotomy_or_impred x 0 HxS SNo_0 (x < 0)) to the current goal.
Assume H: x < 0.
An exact proof term for the current goal is H.
Assume Hx0: x = 0.
We prove the intermediate claim H0le0: 0 x.
rewrite the current goal using Hx0 (from left to right).
An exact proof term for the current goal is (SNoLe_ref 0).
We will prove x < 0.
An exact proof term for the current goal is (FalseE (Hn0le H0le0) (x < 0)).
Assume H0ltx: 0 < x.
We prove the intermediate claim H0lex: 0 x.
An exact proof term for the current goal is (SNoLtLe 0 x H0ltx).
We will prove x < 0.
An exact proof term for the current goal is (FalseE (Hn0le H0lex) (x < 0)).
We prove the intermediate claim Hxle0: x 0.
An exact proof term for the current goal is (SNoLtLe x 0 Hxlt0).
We prove the intermediate claim Hneg0le: minus_SNo 0 minus_SNo x.
An exact proof term for the current goal is (minus_SNo_Le_contra x 0 HxS SNo_0 Hxle0).
rewrite the current goal using minus_SNo_0 (from right to left) at position 1.
An exact proof term for the current goal is Hneg0le.