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I have created an entry modular equivariant elliptic cohomology.
The subject barely exists, for the moment the entry is to serve two purposes:
first, to highlight that by results of Mahowald-Rezk, Lawson-Naumann, Hill-Lawson this exists as a rather compelling generalization of KR-theory;
second, that the close the relation of KR-theory to type II string theory on orientifolds has previously been conjectured to correspond in the lift of the latter to F-theory to a modular equivariant universal elliptic cohomology.
So while the subject hasn’t been studied yet (it seems), both its construction and plenty of motivation for it already exists. And now also an Lab entry for it does. :-)
added a section Definition extracting the main statement, theorem 9.1, from (Hill-Lawson 13)
I have expanded a bit more:
added more details to the statement of the Hill-Lawson construction of the modular-equivariant -spectrum;
added a paragraph on plausibility checks from physics that indeed in F-theory one might expect a “genuine equivariant” cohomology version of S-duality, acting both on spacetime and on the worldsheet. Here I am still looking for more, currently I have
which discusses in detail how target space S-duality is accompanied by a conformal transformation on the worldsheet. So this is qualitatively exactly what the equivariant-spectrum story suggests, but I haven’t tried to check that it is also quantitatively (i.e.in actual detail) the same.
added pointer to:
added publication data to:
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