rank-1 lattice targeted sampling
Fast Rank-1 Lattice Targeted Sampling for Black-box Optimization Anonymous Author(s) Affiliation Address email
Black-box optimization has gained great attention for its success in recent ap-1 plications. However, scaling up to high-dimensional problems with good query2 efficiency remains challenging. This paper proposes a novel Rank-1 Lattice Tar-3 geted Sampling (RLTS) technique to address this issue. Our RLTS benefits from4 random rank-1 lattice Quasi-Monte Carlo, which enables us to perform fast local5 exact Gaussian processes (GP) training and inference with O(nlogn)complexity6 w.r.t.
Fast Rank-1 Lattice Targeted Sampling for Black-box Optimization
Black-box optimization has gained great attention for its success in recent applications. However, scaling up to high-dimensional problems with good query efficiency remains challenging. This paper proposes a novel Rank-1 Lattice Targeted Sampling (RLTS) technique to address this issue. Our RLTS benefits from random rank-1 lattice Quasi-Monte Carlo, which enables us to perform fast local exact Gaussian processes (GP) training and inference with $O(n \log n)$ complexity w.r.t.
Fast Rank-1 Lattice Targeted Sampling for Black-box Optimization
Black-box optimization has gained great attention for its success in recent applications. However, scaling up to high-dimensional problems with good query efficiency remains challenging. This paper proposes a novel Rank-1 Lattice Targeted Sampling (RLTS) technique to address this issue. Our RLTS benefits from random rank-1 lattice Quasi-Monte Carlo, which enables us to perform fast local exact Gaussian processes (GP) training and inference with O(n \log n) complexity w.r.t. Furthermore, we developed a fast coordinate searching method with O(n \log n) time complexity for fast targeted sampling. The fast computation enables us to plug our RLTS into the sampling phase of stochastic optimization methods.