И. В. Волович scite author profile

The hypothesis of the possible p-adic structure of spacetime is considered. The p-adic Veneziano amplitude is proposed and the main properties of the p-adic string theory are discussed. The analogous questions on the Galois field are also discussed. In this case the Jacobi sum plays the role of the Veneziano amplitude which can be expressed by means of the l-adic cohomology of the Fermat curves. The corresponding vertex operator is given.

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The universality of vacuum Einstein equations with cosmological constant

Ferraris

Francaviglia

Волович

1994

Class. Quantum Grav.

170

187

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It is shown that for a wide class of analytic Lagrangians which depend only on the scalar curvature of a metric and a connection, the application of the so-called "Palatini formalism", i.e., treating the metric and the connection as independent variables, leads to "universal" equations. If the dimension n of space-time is greater than two these universal equations are Einstein equations for a generic Lagrangian and are suitably replaced by other universal equations at bifurcation points. We show that bifurcations take place in particular for conformally invariant Lagrangians L = R n/2 √ g and prove that their solutions are conformally equivalent to solutions of Einstein equations. For 2-dimensional space-time we find instead that the universal equation is always the equation of constant scalar curvature; the connection in this case is a Weyl connection, containing the Levi-Civita connection of the metric and an additional vectorfield ensuing from conformal invariance. As an example, we investigate in detail some polynomial Lagrangians and discuss their bifurcations.

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И. В. Волович

p-Adic Analysis and Mathematical Physics

Theory of defects in solids and three-dimensional gravity

Quantum Theory and Its Stochastic Limit

p-adic string

The universality of vacuum Einstein equations with cosmological constant

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