Graph Spectral Embedding for Parsimonious Transmission of Multivariate Time Series
We propose a graph spectral representation of time series data that 1) is parsimoniously encoded to user-demanded resolution; 2) is unsupervised and performant in data-constrained scenarios; 3) captures event and event-transition structure within the time series; and 4) has near-linear computational...
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Zusammenfassung: | We propose a graph spectral representation of time series data that 1) is
parsimoniously encoded to user-demanded resolution; 2) is unsupervised and
performant in data-constrained scenarios; 3) captures event and
event-transition structure within the time series; and 4) has near-linear
computational complexity in both signal length and ambient dimension. This
representation, which we call Laplacian Events Signal Segmentation (LESS), can
be computed on time series of arbitrary dimension and originating from sensors
of arbitrary type. Hence, time series originating from sensors of heterogeneous
type can be compressed to levels demanded by constrained-communication
environments, before being fused at a common center.
Temporal dynamics of the data is summarized without explicit partitioning or
probabilistic modeling. As a proof-of-principle, we apply this technique on
high dimensional wavelet coefficients computed from the Free Spoken Digit
Dataset to generate a memory efficient representation that is interpretable.
Due to its unsupervised and non-parametric nature, LESS representations remain
performant in the digit classification task despite the absence of labels and
limited data. |
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DOI: | 10.48550/arxiv.1910.04689 |