Proves UV finiteness and dimension-dependent vanishing of anomaly obstructions for topological-holomorphic field theories on R^{d'} × C^d, allowing consistent quantization via factorization algebras.
Cambridge University Press, Cambridge, 2017, pp
3 Pith papers cite this work. Polarity classification is still indexing.
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UNVERDICTED 3representative citing papers
Weighted topologies on Ran(M) interpolate Hausdorff and final topologies, equip the latter with a complete uniformity, and are conically stratified when M is Riemannian.
Proposes a scheme-invariant stratified factorization algebra framework that derives the DIS convolution formula independently of collinear scheme or operator basis choices.
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On the renormalization and quantization of topological-holomorphic field theories
Proves UV finiteness and dimension-dependent vanishing of anomaly obstructions for topological-holomorphic field theories on R^{d'} × C^d, allowing consistent quantization via factorization algebras.
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Old and new structures on Ran spaces: Length structures, completeness, and conicality
Weighted topologies on Ran(M) interpolate Hausdorff and final topologies, equip the latter with a complete uniformity, and are conically stratified when M is Riemannian.
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Scheme-invariant stratified factorization algebras for inclusive deep inelastic scattering
Proposes a scheme-invariant stratified factorization algebra framework that derives the DIS convolution formula independently of collinear scheme or operator basis choices.