We prove the intermediate
claim Li4:
OSNo i4.
We prove the intermediate
claim Li1:
OSNo i1.
We prove the intermediate
claim Li2:
OSNo i2.
We prove the intermediate
claim Li4i1:
OSNo (i4 ⨯ i1).
An
exact proof term for the current goal is
OSNo_mul_OSNo i4 i1 ?? ??.
rewrite the current goal using
OSNo_p0_j (from left to right).
rewrite the current goal using
mul_OSNo_proj0 i4 i1 ?? ?? (from left to right).
rewrite the current goal using
OSNo_p0_k (from left to right).
rewrite the current goal using
OSNo_p1_k (from left to right).
rewrite the current goal using
OSNo_p0_i (from left to right).
rewrite the current goal using
OSNo_p1_i (from left to right).
We will
prove k * i + - (0 ' * 0) = j.
rewrite the current goal using conj_HSNo_id_SNo 0 SNo_0 (from left to right).
rewrite the current goal using mul_HSNo_0R 0 HSNo_0 (from left to right).
rewrite the current goal using minus_HSNo_0 (from left to right).
rewrite the current goal using
add_HSNo_0R (k * i) (HSNo_mul_HSNo k i HSNo_Quaternion_k HSNo_Complex_i) (from left to right).
An exact proof term for the current goal is Quaternion_k_i.
rewrite the current goal using
OSNo_p1_j (from left to right).
rewrite the current goal using
mul_OSNo_proj1 i4 i1 ?? ?? (from left to right).
rewrite the current goal using
OSNo_p0_k (from left to right).
rewrite the current goal using
OSNo_p1_k (from left to right).
rewrite the current goal using
OSNo_p0_i (from left to right).
rewrite the current goal using
OSNo_p1_i (from left to right).
We will
prove 0 * k + 0 * i ' = 0.
rewrite the current goal using
mul_HSNo_0L (i ') (HSNo_conj_HSNo i HSNo_Complex_i) (from left to right).
rewrite the current goal using mul_HSNo_0L k HSNo_Quaternion_k (from left to right).
An exact proof term for the current goal is add_HSNo_0L 0 HSNo_0.