Intrinsic semistable reduction loci for the iterations of non-archimedean quadratic rational functions
Abstract
We introduce the intrinsic reduction of a non-archimedean rational function at each non-classical point in the Berkovich projective line, which can extend the potential GIT-semistable reduction notion at each type II point to the whole non-classical points reasonably, and compute the intrinsic semistable reduction loci for the iterations of a quadratic rational function using a reduction theoretic slope formula for the hyperbolic resultant function (so for Rumely's resultant one) associated to those iterated quadratic polynomials.
In particular, we establish a precise stationarity of the intrinsic semistable reduction loci for iterated quadratic rational functions, which is similar to that in the case of non-archimedean polynomial dynamics.
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