SeQuant introduces a graph-theoretic tensor network canonicalizer for efficient symbolic manipulation and numerical evaluation of tensors over commutative and non-commutative rings, with support for noncovariant and nested tensors.
Congruent Graphs and the Connectivity of Graphs.Amer
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Introduces clique graphs on graphs with unique ω-clique edge covers and derives spectral bounds, strongly regular classifications, and applications to existence questions.
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SeQuant Framework for Symbolic and Numerical Tensor Algebra. I. Core Capabilities
SeQuant introduces a graph-theoretic tensor network canonicalizer for efficient symbolic manipulation and numerical evaluation of tensors over commutative and non-commutative rings, with support for noncovariant and nested tensors.
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A Comprehensive Study of Clique Graphs and Clique Regular Graphs
Introduces clique graphs on graphs with unique ω-clique edge covers and derives spectral bounds, strongly regular classifications, and applications to existence questions.