Estimates of general Mayer graphs. II. Long-range behavior of graphs with two root points occurring in the theory of ionized systems |
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Authors: | Michel Lavaud |
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Institution: | (1) Centre de recherches sur la physique des hautes temperatures, CNRS, Orleans, France |
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Abstract: | We find the asymptotic behavior of general Mayer 2-graphs (Mayer graphs with two root points), which occur in the theory of ionized systems. This problem arises when one wants to compute corrections to the Debye length for large values of the plasma parameter. For a given 2-graph (r) with Debye-Hückel linese
–
/r, we prove the inequalitiesC
m
r
–
e
–![lambda](/content/klv1889316407086/xxlarge955.gif)
![les](/content/klv1889316407086/xxlarge10877.gif) (r) (r
0)CMr3k–l
e
–![lambda](/content/klv1889316407086/xxlarge955.gif)
, for anyr r
0, and whereC
m andC
M are positive and finite constants which depend only on . These bounds are finite whenever (r) is not infinite everywhere. The integersl, k, and denote, respectively, the number of lines of the graph , its number of field points, and its local line connectivity (the maximum number of chains linking the root points, which have no line in common). From this result, we deduce that the simple irreducible 2-graphs dominant at large distances decay exponentially likee
– and have an isthmus between the root points (an isthmus is a line whose deletion separates the graph into two disjoint components, each one containing a root point). We prove also that 2-graphs that have a number of linesl > 3k+ are infinite. We exhibit simple, irreducible prototypes satisfying this condition, for anyk 6. This implies that the Abe-Meeron theory of ionized gases as applied to a classical plasma is not free from divergences. Finally, we extend the preceding results to 2-graphs with lines FL=(e
–
/r)k
L, withk
L
real positive. We prove that they still decay exponentially likee
–![lambda](/content/klv1889316407086/xxlarge955.gif)
, where is now the maximal flow in a network associated to by assigning the capacityk
L
to each lineL. |
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Keywords: | Mayer graphs Laplace integral inequalities local line connectivity max-flow min-cut theorem |
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