Existence of a zero-free strip for the Riemann zeta function
Abstract
In a recent article a breakthrough was made in quantum computer science which established the existence of a phenomenon commonly known as MIP = RE. We show that the existence of this phenomenon implies that the supremum of the real parts of the zeroes of the Riemann zeta function is less than one. Our main tool is an assertion about the representation theory of the rank two free group that we refer to as the charged mean ergodic theorem. Our method also involves the construction of novel modular functions we refer to as complete electromagnetic functions.
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