Momentum-space Daubechies wavelets enable a Hamiltonian truncation for 1+1D phi^4 theory that captures the strong-coupling phase transition with converging critical coupling.
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Provides a detailed introduction to Grassmann tensor operations and their use in standard tensor-network algorithms, with validation on models in particle and condensed-matter physics.
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Hamiltonian formulation of the $1+1$-dimensional $\phi^4$ theory in a momentum-space Daubechies wavelet basis
Momentum-space Daubechies wavelets enable a Hamiltonian truncation for 1+1D phi^4 theory that captures the strong-coupling phase transition with converging critical coupling.
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Grassmann tensor networks
Provides a detailed introduction to Grassmann tensor operations and their use in standard tensor-network algorithms, with validation on models in particle and condensed-matter physics.