Noncommutative Geometry and Motives: the Thermodynamics of Endomotives

Noncommutative geometry and motives (a quoi servent les endomotifs?)

This paper gives a short and historical survey on the theory of pure motives in algebraic geometry and reviews some of the recent developments of this theory in noncommutative geometry. The second part of the paper outlines the new theory of endomotives and some of its relevant applications in number-theory.

The Fourth Annual Spring Institute on Noncommutative Geometry and Operator Algebras

We will give an introduction to Rota-Baxter algebras which started with a probability study of Spitzer in 1950s and found interesting applications in the work of Connes and Kreimer on renormalization of QFT. We will discuss their basic properties, the constructions of the free objects and applications to multiple zeta values by renormalization method. Some other applications will be given in Ku...

Cyclotomy and Endomotives

We compare two different models of noncommutative geometry of the cyclotomic tower, both based on an arithmetic algebra of functions of roots of unity and an action by endomorphisms, the first based on the Bost-Connes (BC) quantum statistical mechanical system and the second on the Habiro ring, where the Habiro functions have, in addition to evaluations at roots of unity, also full Taylor expan...

Noncommutative Geometry, Quantum Fields and Motives

Thermodynamics on Noncommutative Geometry in Coherent State Formalism

The thermodynamics of ideal gas on the noncommutative geometry in the coherent state formalism is investigated. We first evaluate the statistical interparticle potential and see that there are residual “attraction (repulsion) potential” between boson (fermion) in the high temperature limit. The characters could be traced to the fact that, the particle with mass m in noncommutative thermal geome...