e-space
Manchester Metropolitan University's Research Repository

    A computationally efficient symmetric diagonally dominant matrix projection-based Gaussian process approach

    Wang, Peng ORCID logoORCID: https://orcid.org/0000-0001-9895-394X, Mihaylova, Lyudmila, Munir, Said, Chakraborty, Rohit, Wang, Jikai, Mayfield, Martin, Alam, Khan, Khokhar, Muhammad Fahim and Coca, Daniel (2021) A computationally efficient symmetric diagonally dominant matrix projection-based Gaussian process approach. Signal Processing, 183. 108034. ISSN 0165-1684

    [img]
    Preview
    Accepted Version
    Available under License Creative Commons Attribution Non-commercial No Derivatives.

    Download (4MB) | Preview

    Abstract

    Although kernel approximation methods have been widely applied to mitigate the O(n3) cost of the n×n kernel matrix inverse in Gaussian process methods, they still face computational challenges. The ‘residual’ matrix between the covariance matrix and the approximating component is often discarded as it prevents the computational cost reduction. In this paper, we propose a computationally efficient Gaussian process approach that achieves better computational efficiency, O(mn2), compared with standard Gaussian process methods, when using m≪n data. The proposed approach incorporates the ‘residual’ matrix in its symmetric diagonally dominant form which can be further approximated by the Neumann series. We have validated and compared the approach with full Gaussian process approaches and kernel approximation based Gaussian process variants, both on synthetic and real air quality data.

    Impact and Reach

    Statistics

    Activity Overview
    6 month trend
    108Downloads
    6 month trend
    24Hits

    Additional statistics for this dataset are available via IRStats2.

    Altmetric

    Repository staff only

    Edit record Edit record