Multivariate trace estimation using quantum state space linear algebra
arxiv(2024)
摘要
In this paper, we present a quantum algorithm for approximating multivariate
traces, i.e. the traces of matrix products. Our research is motivated by the
extensive utility of multivariate traces in elucidating spectral
characteristics of matrices, as well as by recent advancements in leveraging
quantum computing for faster numerical linear algebra. Central to our approach
is a direct translation of a multivariate trace formula into a quantum circuit,
achieved through a sequence of low-level circuit construction operations. To
facilitate this translation, we introduce quantum Matrix States Linear
Algebra (qMSLA), a framework tailored for the efficient generation of state
preparation circuits via primitive matrix algebra operations. Our algorithm
relies on sets of state preparation circuits for input matrices as its primary
inputs and yields two state preparation circuits encoding the multivariate
trace as output. These circuits are constructed utilizing qMSLA operations,
which enact the aforementioned multivariate trace formula. We emphasize that
our algorithm's inputs consist solely of state preparation circuits, eschewing
harder to synthesize constructs such as Block Encodings. Furthermore, our
approach operates independently of the availability of specialized hardware
like QRAM, underscoring its versatility and practicality.
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