Information-Based Complexity vs Computational Complexity in Phaseless Polynomial Interpolation

Abstract

The authors of ``A note on the complexity of a phaseless polynomial interpolation'' have shown that phaseless polynomial interpolation over Q is possible with n+2 points, where n is the upper-bound on the degree of a polynomial. Nonetheless, their reconstruction algorithm and the method of adaptively choosing evaluation points are exponential time. On the other hand, they have also shown that given 2n+1 points, the polynomial can be reconstructed in a polynomial time. A conjecture have been put forward, namely that the reconstruction problem from such n+2 points is exponential time. Moreover, a question about the number of points sufficient for polynomial time reconstruction have been posed. In this paper, we answer these questions -- we show that (1) reconstruction problem from 2n-k for any constant k is polynomial time, (2) reconstruction problem from (1+c)n+2 points for any constant c ∈ [0, 1) is NP-Complete, (3) evaluation points admitting a unique solution can be chosen in polynomial time.