Extensions of the Papoulis-Gerchberg Algorithm for Analytic Functions

## Abstract In magnetic resonance imaging, low frequency components can be allowed to saturate the analog to digital converter to reduce the quantization noise. These components can be estimated using least squares error estimation based low frequency restoration methods or the iterative Gerchberg‐

to continue the result to the real axis. Numerical analytic continuation, however, is notoriously difficult, and most The need to calculate the spectral properties of a Hermitian operator H frequently arises in the technical sciences. A common ap-techniques developed thus far are useful only for sp

The range of Fourier methods can be significantly increased by extending a nonperiodic function f (x) to a periodic function f on a larger interval. When f (x) is analytically known on the extended interval, the extension is straightforward. When f (x) is unknown outside the physical interval, there

## Abstract It is shown that the following conditions are equivalent for the generalized Schur class functions at a boundary point __t__~0~ ∈ 𝕋: 1) Carathéodory–Julia type condition of order __n__; 2) agreeing of asymptotics of the original function from inside and of its continuation by reflection

We characterize in this paper the epigraph of the value function of a discounted infinite horizon optimal control problem as the viability kernel of an auxiliary differential inclusion. Then the viability kernel algorithm applied to this problem provides the value function of the discretized optimal