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New Bounds on Quotient Polynomials with Applications to Exact Divisibility and Divisibility Testing of Sparse Polynomials
A sparse polynomial (also called a lacunary polynomial) is a polynomial that
has relatively few terms compared to its degree. The sparse-representation of a
polynomial represents the polynomial as a list of its non-zero terms
(coefficient-degree pairs). In particular, the degree of a sparse polynomial
can be exponential in the sparse-representation size.
We prove that for monic polynomials such that
divides , the -norm of the quotient polynomial is bounded by
. This improves upon the exponential (in
) bounds for general polynomials and implies that the trivial
long division algorithm runs in time quasi-linear in the input size and number
of terms of the quotient polynomial , thus solving a long-standing problem
on exact divisibility of sparse polynomials.
We also study the problem of bounding the number of terms of in some
special cases. When and is a cyclotomic-free
(i.e., it has no cyclotomic factors) trinomial, we prove that
. When is a binomial with , we
prove that the sparsity is at most . Both upper bounds
are polynomial in the input-size. We leverage these results and give a
polynomial time algorithm for deciding whether a cyclotomic-free trinomial
divides a sparse polynomial over the integers.
As our last result, we present a polynomial time algorithm for testing
divisibility by pentanomials over small finite fields when