אירועים
אירועים והרצאות בפקולטה למדעי המחשב ע"ש הנרי ומרילין טאוב
ראגו מקה (אונ' טקסס באוסטין)
יום ראשון, 09.01.2011, 12:30
Invariance principles or limit theorems have recently found several important applications in theoretical computer
science. In this talk I'll present some recent results with the broad theme of constructing pseudorandom
generators from invariance principles. The first set of results concerns the natural question of constructing
pseudorandom generators (PRGs) for low-degree polynomial threshold functions (PTFs). We give a PRG
with seed-length log
n/eps^{O(d)}$ fooling degree d PTFs with error at most eps. Previously, no nontrivial constructions were known even for quadratic
threshold functions and constant error eps. For the class of degree 1 threshold functions or halfspaces, we construct PRGs with much better dependence on the error parameter eps and obtain a PRG with seed-length O(log n + log^2(1/eps)). The second set of results concerns "discrete central limit theorems", and fooling linear forms over 0-1 inputs in total variation distance.
Joint work with David Zuckerman; Parikshit Gopalan, Omer Reingold and David Zuckerman.