2004
DOI: 10.1016/s0377-0427(03)00931-2
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The Kronecker product and stochastic automata networks

Abstract: This paper can be thought of as a companion paper to Van Loan's The Ubiquitous Kronecker Product paper (J. Comput. Appl. Math. 123 (2000) 85). We collect and catalog the most useful properties of the Kronecker product and present them in one place. We prove several new properties that we discovered in our search for a stochastic automata network preconditioner. We conclude by describing one application of the Kronecker product, omitted from Van Loan's list of applications, namely stochastic automata networks.

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Cited by 26 publications
(30 citation statements)
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“…The Kronecker product is also known as the tensor product or direct product, among others [15]. The Kronecker product is a useful device to generate realistic network models and analyse network properties, see [16].…”
Section: The Kronecker Productmentioning
confidence: 99%
See 2 more Smart Citations
“…The Kronecker product is also known as the tensor product or direct product, among others [15]. The Kronecker product is a useful device to generate realistic network models and analyse network properties, see [16].…”
Section: The Kronecker Productmentioning
confidence: 99%
“…The Kronecker product is a useful device to generate realistic network models and analyse network properties, see [16]. The Kronecker product is an important mechanism in the study of certain applied problems involving large scale Markov chains, see [15]. Further reading on the Kronecker product and applications of its properties can be found in [15], [16] and [19].…”
Section: The Kronecker Productmentioning
confidence: 99%
See 1 more Smart Citation
“…Convergence of (2) is assured under the condition that Ψ ⊗ I is a contraction, that is, ∥Ψ ⊗ I∥ ≤ 1. We exploit the following properties of the Kronecker product ( [26], [27]):…”
Section: Problem Formulationmentioning
confidence: 99%
“…A way of resolving these two problems has been found in the parametrization of the spatiotemporal covariance matrix through a Kronecker product (KP) (Langville and Stewart, 2004;Van Loan, 2000) of a spatial and a temporal covariance matrix, reducing its dimensionality considerably (de Munck et al, 1992Huizenga et al, 2002). The KP parametrization assumes that an arbitrary spatiotemporal correlation can be modeled as a product of a spatial and a temporal factor.…”
Section: Introductionmentioning
confidence: 99%