Superconformal Spin/Field Theories: When Vector Spaces have same Dimensions: Part 1, Note Quote.

Superconformal Spin/Field Theories: When Vector Spaces have same Dimensions: Part 1, Note Quote.

https://altexploit.wordpress.com/2018/08/08/superconformal-spin-field-theories-when-vector-spaces-have-same-dimensions-part-1-note-quote/
— Read on altexploit.wordpress.com/2018/08/08/superconformal-spin-field-theories-when-vector-spaces-have-same-dimensions-part-1-note-quote/

Sheaves in a field?

One thought on “Superconformal Spin/Field Theories: When Vector Spaces have same Dimensions: Part 1, Note Quote.

  1. The formalism of sheaf theory for the description of complex manifolds and holomorphic bundles was applied to physics by Roger Penrose, in his development of twistor theory. In twistor theory a spacetime point is represented by a certain kind of subspace, i.e. a non-local object. The process of quantization in twistor space leads to a description in which the points of spacetime become “fuzzy”, but certain relations associated with the causal structure are preserved. A possible mathematical model of such a structure is given by a sheaf where the partial sections represent the fuzzy points, global sections giving precise points.

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