Suppose we are given an integer monic polynomial *f* (*x*) *∈* Z[*x*] of degree *n ≥* 2 which, over C, is “weakly supermorse,” meaning that it has *n* distinct roots in C, its derivative *f* ′ (*x*) has *n –* 1 distinct roots (the critical points) *α _{i} ∈* C, and the

Choose a prime, ℓ and a field isomorphism *ι* : Q* ≅* C. For each *p* ≠ which is good for *f*, form ...

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