Quadratic Forms, Real Zeros and Echoes of the Spectral Action

Abstract

For a real distribution D on the interval [0,L] with D the associated even distribution on the interval [-L, L], we prove that if the associated quadratic form with Schwartz kernel D(x - y) defines a lower-bounded selfadjoint operator on L2([-L2, L2]), whose lowest spectral value λ is a simple, isolated eigenvalue with even eigenfunction , then all the zeros of the entire function (z), the Fourier transform of , lie on the real line. The proof proceeds in five steps. (1) We give a C*-algebraic proof of a corollary of Carath\'eodory-Fej\'er's 1911 structure Theorem for Toeplitz matrices: if T ∈ Mn(C) is a Hermitian, positive semidefinite Toeplitz matrix of rank n - 1, and ∈ T, then the polynomial P(z) = Σ j zj has all its zeros on the unit circle. (2) We formulate and prove a continuous analogue of this result, replacing the Toeplitz matrix with a convolution operator with continuous kernel h(x - y), and the polynomial P(z) with the Fourier transform of the eigenfunction corresponding to the largest eigenvalue. (3) We analyze finite-dimensional truncations of the quadratic forms defined by real, even distributions D on [-L, L], and observe that the resulting matrices exhibit a structure previously encountered in perturbative expansions of the spectral action. (4) We establish an analogue of Carath\'eodory-Fej\'er's corollary for matrices of this specific structure, thereby extending the zero localization result beyond the classical Toeplitz setting. (5) Finally, we apply a classical theorem of Hurwitz concerning the zeros of uniform limits of holomorphic functions to deduce the general result stated above.

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