Add to ORKGThere are (at least) two different approaches to define an equivariant analogue of the Euler characteristic for a space with a finite group action. The first one defines it as an element of the Burnside ring of the group. The second approach emerged from physics and includes the orbifold Euler characteristic and its higher order versions. Here we give a way to merge the two approaches together defining (in a certain setting) higher order Euler characteristics with values in the Burnside ring of a group. We give Macdonald type equations for these invariants. We also offer generalized (“motivic”) versions of these invariants and formulate Macdonald type equations for them as well
We prove an equivariant Grothendieck-Ogg-Shafarevich formula. This formula may be viewed as an étale...
AbstractWe compute the Γ-sectors and Γ-Euler–Satake characteristic of a closed, effective 2-dimensio...
We introduce a variant of the birational symbols group of Kontsevich, Pestun and the second author, ...
The notion of the orbifold Euler characteristic came from physics at the end of the 1980s. Coinciden...
We define a Grothendieck ring of varieties with finite groups actions and show that the orbifold Eul...
We generalize the notions of the orbifold Euler characteristic and of the higher-order orbifold Eule...
For a finitely presented discrete group $\Gamma$, we introduce two generalizations of the orbifold E...
AbstractWe describe an equivariant version of the Euler characteristic in order to extend to the equ...
AbstractWe describe an equivariant version of the Euler characteristic in order to extend to the equ...
We use the theory of cubic structures to give a fixed point Riemann-Roch formula for the equivariant...
Let G be a countable discrete group and let M be a smooth proper cocompact G-manifold without bounda...
AbstractLet G be a finite, complex reflection group acting on a complex vector space V, and δ its di...
The equivariant with respect to a finite group action Poincaré series of a collection of r valuation...
Suppose that M is a finite module under the Galois group of a local or global field. Ever since Tate...
We introduce the universal Euler characteristic of an orbit space definable groupoid, a class of gro...
We prove an equivariant Grothendieck-Ogg-Shafarevich formula. This formula may be viewed as an étale...
AbstractWe compute the Γ-sectors and Γ-Euler–Satake characteristic of a closed, effective 2-dimensio...
We introduce a variant of the birational symbols group of Kontsevich, Pestun and the second author, ...
The notion of the orbifold Euler characteristic came from physics at the end of the 1980s. Coinciden...
We define a Grothendieck ring of varieties with finite groups actions and show that the orbifold Eul...
We generalize the notions of the orbifold Euler characteristic and of the higher-order orbifold Eule...
For a finitely presented discrete group $\Gamma$, we introduce two generalizations of the orbifold E...
AbstractWe describe an equivariant version of the Euler characteristic in order to extend to the equ...
AbstractWe describe an equivariant version of the Euler characteristic in order to extend to the equ...
We use the theory of cubic structures to give a fixed point Riemann-Roch formula for the equivariant...
Let G be a countable discrete group and let M be a smooth proper cocompact G-manifold without bounda...
AbstractLet G be a finite, complex reflection group acting on a complex vector space V, and δ its di...
The equivariant with respect to a finite group action Poincaré series of a collection of r valuation...
Suppose that M is a finite module under the Galois group of a local or global field. Ever since Tate...
We introduce the universal Euler characteristic of an orbit space definable groupoid, a class of gro...
We prove an equivariant Grothendieck-Ogg-Shafarevich formula. This formula may be viewed as an étale...
AbstractWe compute the Γ-sectors and Γ-Euler–Satake characteristic of a closed, effective 2-dimensio...
We introduce a variant of the birational symbols group of Kontsevich, Pestun and the second author, ...