The work characterizes open continuous homomorphisms of locally compact groups such that pushforwards of compactly supported distribution symbols of L^p-L^q Fourier multipliers remain symbols of the same type.
Combinatorial Ricci curvature on cell-complex and Gauss-Bonnet the- orem
2 Pith papers cite this work. Polarity classification is still indexing.
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The authors extend Forman's combinatorial differential forms with operators for scalar variables to enable intrinsic, dimension-dependent modeling of diffusion in discrete complexes.
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On a theorem of M. Jodeit Jr. on pushforwards of Fourier multipliers
The work characterizes open continuous homomorphisms of locally compact groups such that pushforwards of compactly supported distribution symbols of L^p-L^q Fourier multipliers remain symbols of the same type.
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Diffusion in multi-dimensional solids using Forman's combinatorial differential forms
The authors extend Forman's combinatorial differential forms with operators for scalar variables to enable intrinsic, dimension-dependent modeling of diffusion in discrete complexes.