The size of arboreal images, I: exponential lower bounds for PCF and unicritical polynomials

Abstract: Let f be a polynomial over a global field K. For each α in K and N in Z ≥0 denote by K N (f, α) the arboreal field K(f −N (α)) and by D N (f, α) its degree over K.It is conjectured that D N (f, α) should grow as a double exponential function of N , unless f is post-critically finite (PCF), in which case there are examples like D N (x 2 , α) ≤ 4 N . There is evidence conditionally on Vojta's conjecture. However, before the present work, no unconditional non-trivial lower bound was known for post-critically infi… Show more