The Links-Gould polynomial distinguishes every Allen-Swenberg link AS(n) from the causally unrelated unlink, where the Alexander-Conway polynomial fails.
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3 Pith papers cite this work, alongside 407 external citations. Polarity classification is still indexing.
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The paper solves the affine-invariant Minkowski problem for convex domains invariant under specific discrete affine subgroups by establishing a local Steiner formula and applying a variational method based on covolume convexity.
A new complete gauge fixing at initial data via Hodge decomposition on complete Riemannian manifolds enables existence proofs for Hadamard states in the quantization of Maxwell theory on globally hyperbolic Lorentzian manifolds.
citing papers explorer
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Detecting Causality with the Links--Gould Polynomial
The Links-Gould polynomial distinguishes every Allen-Swenberg link AS(n) from the causally unrelated unlink, where the Alexander-Conway polynomial fails.
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An Affine Invariant Minkowski Problem
The paper solves the affine-invariant Minkowski problem for convex domains invariant under specific discrete affine subgroups by establishing a local Steiner formula and applying a variational method based on covolume convexity.
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On the Quantisation of Linear Gauge Theories on Lorentzian Manifolds: Maxwell's Theory via Complete Gauge Fixing
A new complete gauge fixing at initial data via Hodge decomposition on complete Riemannian manifolds enables existence proofs for Hadamard states in the quantization of Maxwell theory on globally hyperbolic Lorentzian manifolds.