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Geometrical aspects of isoscaling

✍ Scribed by A. Dávila; C.R. Escudero; J.A. López; C.O. Dorso

Publisher
Elsevier Science
Year
2007
Tongue
English
Weight
230 KB
Volume
374
Category
Article
ISSN
0378-4371

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✦ Synopsis

The property of isoscaling in nuclear fragmentation is studied using a simple bond percolation model with ''isospin'' added as an extra degree of freedom. It is shown, first, that with the assumption of fair sampling and with homogeneous probabilities it is possible to solve the problem analytically. Second, numerical percolations of hundreds of thousands of grids of different sizes and with different N to Z ratios confirm this prediction with remarkable agreement. It is thus concluded that isoscaling emerges even in the simple case of a classical non-interacting system such as two-species percolation under the assumption of fair sampling; if put in the nomenclature of the minimum information theory, isoscaling in percolation appears to require nothing more than the existence of equiprobable configurations in maximum entropy states.

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The equation (Schlesinger's equation) for the isomonodromic deformations of an SL(2, @) connection with four simple poles on the projective line is shown to describe a holomorphic projective structure on a surface. The space of geodesics of this structure is, by a primitive version of twistor theory