A Degree-Four Lemniscate Path Theorem
Abstract
We prove the degree-four case of a path problem of Erdős, Herzog, and Piranian. If f is monic of degree four and all zeros of f, counted with multiplicity, lie in the open unit disk, then two zeros from this list can be joined inside \z:|f(z)|<1\ by a possibly degenerate polygonal path of length less than 2.
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