B. Eckmann’s scientific contributions

... The combinatorial and group theory properties of the number 6 are described in considerable detail in Shaw (1994), along with a tie-up with the properties of the Klein quadric in the space IPB 6 , B 6 = 2 V 4 . Other references include Janusz & Rotman (1982), Cameron & Van Lint (1991) and Tits (1991). ...

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Finite Geometry, Dirac Groups and the Table of Real Clifford Algebras

... The proof of (2) is a direct application of Theorem 2.1 and Proposition 3.5, and the fact that the functor * V ⊗ B −⊗ B U * is also exact. Namely, by [31,Theorem V.4.1], the bimodules * V and U * are projective as B-modules. ...

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Separable equivalences, finitely generated cohomology and finite tensor categories

... The inequality (6) has been extracted from the book [13], pg 10, where the author refer to the paper of Fel'dman [5]. ...

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\Omega$-bounds for the partial sums of some modified Dirichlet characters II

... Understanding non-equilibrium physics remains a central challenge in statistical physics, with exact solutions providing invaluable insights into the underlying mechanisms. Classical stochastic processes, such as the Symmetric Simple Exclusion Process (SSEP) [1][2][3], have served as paradigmatic models, allowing for the derivation of exact large deviation functions through sophisticated combinatorial and algebraic techniques, see e.g. [4][5][6][7][8]. ...

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Large deviations of density fluctuations in the boundary driven Quantum Symmetric Simple Inclusion Process

... The models of opinion formation and dynamics [5][6][7] may be divided into two main groups with respect to the spectrum of opinions: with continuous or discrete opinions available in an artificial society. Among the latter, the models most studied are: voter model [8][9][10][11], majority-rule model [12], Sznajd model [13] or models based on social impact [14]. ...

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Fine structure of phase diagram for social impact theory