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Appears in collection : Mikhael Gromov - Probability, symmetry, linearity

I plan six lectures on possible directions of modification/generalization of the probability theory, both concerning mathematical foundations and applications within and without pure mathematics. Specifically, I will address two issues. 1. Enhancement of stochastic symmetry by linearization and Hilbertization of set-theoretic categories. 2. Non-symmetric probability theory in heterogeneous environments of molecular biology and of linguistics.

I will start with a category theoretic view on probability and entropy. This includes representation of Lebesgue spaces as covariant functors from the category WF of weighted finite sets F into the category of set; definition of the Boltzmann-Shannon entropy of an F as an image of F in the topological Grothendieck semigroup of WF. (Much of this can be found in my article In a Search for a Structure, Part 1: On Entropy).

Next I will present several linearized measure-like structures, and associated entropies, such as the homology measures and their appearance in many particle systems. (Some of it is presented in Singularities, expanders and topology of map. Part 2: From combinatorics to topology via algebraic isoperimetry. GAFA, Geom. func. anal., 20 (2010), 416-526, and in Geometry, Topology and Spectra of Non-Linear Spaces of Maps - Wolfgang Pauli Lectures, May 25, 2009.)

Also I say something about the von Neumann entropy.

Finally I will dicuss possible concepts of probability for heterogeneous systems, such as natural languages and their applications to automatic signals/texts analysis in the spirit of my article Ergostructures, Ergodic and the Universal Learning Problem: Chapters 1, 2. The above mentioned papers can be found on my web page : https://www.ihes.fr/~gromov/

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