599 research outputs found
SQ Lower Bounds for Learning Bounded Covariance GMMs
We study the complexity of learning mixtures of separated Gaussians with
common unknown bounded covariance matrix. Specifically, we focus on learning
Gaussian mixture models (GMMs) on of the form , where and for some . Known learning
algorithms for this family of GMMs have complexity . In
this work, we prove that any Statistical Query (SQ) algorithm for this problem
requires complexity at least . In the special case
where the separation is on the order of , we additionally obtain
fine-grained SQ lower bounds with the correct exponent. Our SQ lower bounds
imply similar lower bounds for low-degree polynomial tests. Conceptually, our
results provide evidence that known algorithms for this problem are nearly best
possible
- …