Add to ORKGInertia orbifolds homotopy-quotiented by rotation of geometric loops play a fundamental role not only in ordinary cyclic cohomology, but more recently in constructions of equivariant Tate-elliptic cohomology and generally of transchromatic characters on generalized cohomology theories. Nevertheless, existing discussion of such cyclified stacks has been relying on ad-hoc component presentations with intransparent and unverified stacky homotopy type. Following our previous formulation of transgression of cohomological charges ("double dimensional reduction"), we explain how cyclification of infinity-stacks is a fundamental and elementary base-change construction over moduli stacks in cohesive higher topos theory (cohesive homotopy type theo...
In this paper, we endow the family of closed oriented genus $g$ surfaces, starting with torus, with ...
In 2003, Johannes Kellendonk and Ian Putnam introduced pattern equivariant cohomology for tilings. I...
In this paper, we endow the family of closed oriented genus $g$ surfaces, starting with torus, with ...
Kitchloo and Morava give a strikingly simple picture of elliptic cohomology at the Tate curve by stu...
Equivariant elliptic cohomology and twisted equivariant K-theory are both related to the representat...
The existence of interesting multiplicative cohomology theories for orbifolds was initially suggeste...
The existence of interesting multiplicative cohomology theories for orbifolds was initially suggeste...
Topological cyclic homology is a refinement of Connes--Tsygan's cyclic homology which was introduced...
Pattern-equivariant (PE) cohomology is a well-established tool with which to interpret the Čech coho...
We define the motivic filtrations on real topological Hochschild homology and its companions. In par...
We characterize the integral cohomology and the rational homotopy type of the maximal Borel-equivari...
We exhibit the Hodge degeneration from nonabelian Hodge theory as a $2$-fold delooping of the filter...
Following ideas of Lurie, we give in this article a general construction of equivariant elliptic coh...
The technique of blow up has been used to solve several important problems in algebraic geometry and...
We introduce and study quasi-elliptic cohomology, a theory related to Tate K-theory but built over t...
In this paper, we endow the family of closed oriented genus $g$ surfaces, starting with torus, with ...
In 2003, Johannes Kellendonk and Ian Putnam introduced pattern equivariant cohomology for tilings. I...
In this paper, we endow the family of closed oriented genus $g$ surfaces, starting with torus, with ...
Kitchloo and Morava give a strikingly simple picture of elliptic cohomology at the Tate curve by stu...
Equivariant elliptic cohomology and twisted equivariant K-theory are both related to the representat...
The existence of interesting multiplicative cohomology theories for orbifolds was initially suggeste...
The existence of interesting multiplicative cohomology theories for orbifolds was initially suggeste...
Topological cyclic homology is a refinement of Connes--Tsygan's cyclic homology which was introduced...
Pattern-equivariant (PE) cohomology is a well-established tool with which to interpret the Čech coho...
We define the motivic filtrations on real topological Hochschild homology and its companions. In par...
We characterize the integral cohomology and the rational homotopy type of the maximal Borel-equivari...
We exhibit the Hodge degeneration from nonabelian Hodge theory as a $2$-fold delooping of the filter...
Following ideas of Lurie, we give in this article a general construction of equivariant elliptic coh...
The technique of blow up has been used to solve several important problems in algebraic geometry and...
We introduce and study quasi-elliptic cohomology, a theory related to Tate K-theory but built over t...
In this paper, we endow the family of closed oriented genus $g$ surfaces, starting with torus, with ...
In 2003, Johannes Kellendonk and Ian Putnam introduced pattern equivariant cohomology for tilings. I...
In this paper, we endow the family of closed oriented genus $g$ surfaces, starting with torus, with ...