Kazan (Volga region) Federal University, KFU
KAZAN
FEDERAL UNIVERSITY
 
QUID OF THE STATUS OF THE TIME FOR CREATIVE MANAGEMENT? A THEORETICAL APPROACH THROUGH ZETA RIEMANN FUNCTION
Form of presentationArticles in international journals and collections
Year of publication2023
Языканглийский
  • Tayurskiy Dmitriy Albertovich, author
  • Gavrilut Alina , author
  • Le Mehaute Alain , author
  • Riot Philippe , author
  • Bibliographic description in the original language Alain Le MÉHAUTÉ Quid of the status of the time for creative management? A theoretical approach through zeta Riemann function// Alain Le MÉHAUTÉ, Philippe RIOT, Alina GAVRILUT, Dmitriii Tayurskii// Hyperion International Journal of Econophysics & New Economy. - 2022. - v.17. - N. 1. - P. 7-48.
    Annotation Our own works confirm the importance of the selinks by introducing how they operate through zeta Riemann function and foliation of dynamical fractional sites. Analysis of fractional Fourier spectra highlights the deficiencies of the usual notion of time and the need for its replacement by sheaves parametrization above dual dynamical Grothendieck's topos. This conclusion is based on the partition of this topos into a couple of tensorial monads whose Cantor's metrics are« <1 » and « 1–<1 » (non-integer dimension and co- dimension of fractal geometries folding «spectral geodesics«). The vicinity analysis of each possible state leads a pointed torus topology associated to dynamical multi-connectivity. The authors analyze the existence of the stacking of the universal spectra as origin of Riemann zeta function. This stacking accounts for arithmetic scaling that, depending on  value can play or not a role analogous to a Newtonian time. The authors show that, with the exception of cases  =1 and  =1/2 (Riemann hypothesis), the stacking parameter used to calibrate the proper time of the system, is different of the zeta complex parameter and then equipped by an“ arrow of time« related to a constraint of order at infinity.
    Keywords fractional calculus; fractional derivative; Riemann function; entropy; category
    The name of the journal Hyperion International Journal of Econophysics & New Economy
    Please use this ID to quote from or refer to the card https://repository.kpfu.ru/eng/?p_id=278248&p_lang=2
    Resource files 
    File name Size (MB) Format  
    _yperion2022.pdf 1,94 pdf show / download

    Full metadata record