I'm trying to define the predecessor function for binary natural numbers (lists of bits). I want to restrict the input of my function to numbers that are trimmed (don't have leading zeros) and that are positive (so I don't have to worry about the predecessor of zero).
Program Fixpoint pred (nat1: Nat) (H1: is_trim nat1 = True) (H2: is_pos nat1 H1 = True): Nat := match nat1 with | Empt => _ | Fill Zer nat2 => Fill One (pred nat2 H1 H2) | Fill One nat2 => Fill Zer nat2 end.
My first obligation is
nat1: Nat H1: is_trim nat1 = True H2: is_pos nat1 H1 = True H3: Empt = nat1 ______________________________________(1/1) Nat
but I don't know how to solve it. The contradiction is in H2, but because it depends on H1 I can't just rewrite nat1 with Empt and then (is_pos Empt H1) with False.
How do I prove this?