Spectral theory of p-adic Hermite operator
Abstract
We give the definition of p-adic Hermite operator and set up the p-adic spectral measure. We compare the Archimedean case with non-Archimedean case. The structure of Hermite conjugate in C*-Algebra corresponds to three canonical structures of p-adic ultrametric Banach algebra: 1. mod p reduction 2. Frobenius map 3. Teichm\"uller lift. There is a nature connection between Galois theory and Hermite operator spectral decomposition. The Galois group Gal(Fp|Fp) generate the p-adic spectral measure. We point out some relationships with p-adic quantum mechanics: 1. creation operator and annihilation operator 2. p-adic uncertainty principle.
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