Invariant integral: The earliest works and most recent application
- Authors: Cherepanov G.P.1
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Affiliations:
- The New York Academy of Sciences
- Issue: Vol 20, No 2 (2017)
- Pages: 115-124
- Section: Article
- URL: https://journals.rcsi.science/1029-9599/article/view/191449
- DOI: https://doi.org/10.1134/S1029959917020011
- ID: 191449
Cite item
Abstract
The present paper embraces mainly the three-year period of 1966 to 1968 when the invariant integral of fracture mechanics appeared and became popular, and the last two years of 2015 to 2016 when the neoclassic cosmology based on the invariant integral came up. A mention is given to the previous works of Euler, Cauchy, Maxwell, Nother, Gunther and Eshelby who dealt with invariant integrals in mathematics, hydrodynamics, electrodynamics, and the theory of dislocations. A brief review is given of the creation of the invariant integral of fracture mechanics under static and dynamic conditions for a solid continuum including elastic, plastic and viscoelastic materials, as well as of some of its most important applications, ramifications and generalizations for other physical fields. The initial phase of the expansion and revolution of the large-scale universe is studied in the framework of the neoclassic approach, including the Big Bang and the Dark Energy; it is shown that the spheroidal shape of the universe assumed at the Big Bang retains its eccentricity constant in the initial phase. The assumption of a superphoton as a primordial universe was analyzed.
About the authors
G. P. Cherepanov
The New York Academy of Sciences
Author for correspondence.
Email: genacherepanov@hotmail.com
United States, New York, 10007-2157