אירועים
אירועים והרצאות בפקולטה למדעי המחשב ע"ש הנרי ומרילין טאוב
אלי בן-ששון (מדעי המחשב, הטכניון)
יום רביעי, 13.05.2009, 15:00
חדר 337, בניין טאוב למדעי המחשב
An affine disperser over a field F for sources of dimension d is a
function f: F^n -> F that is nonconstant (i.e., takes more than one
value) on inputs coming from a d-dimensional affine subspace of F^n.
Affine dispersers have been considered in the context of deterministic
extraction of randomness from structured sources of imperfect
randomness, and in particular, generalize the notion of dispersers for
bit-fixing sources. Previously, explicit constructions of affine
dispersers were known for every d=\Omega(n), due to [Barak, Kindler,
Shaltiel, Sudakov and Wigderson] and [Bourgain]. (The latter in fact
gives stronger objects called affine extractors).
In this work we give the first explicit affine dispersers for sublinear
dimension. Specifically, our dispersers work even when d> n^{4/5}.
The main novelty in our construction lies in the method of proof, which
relies on elementary properties of subspace polynomials. In contrast,
the previous works mentioned above relied on sum-product theorems for
finite fields.
Joint work with Swastik Kopparty.