Maximum term method

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Maximum term method is a consequence of the large numbers encountered in stastistical mechanics. It states that under appropriate conditions the logarithm of a summation is essentially equal to the logarithm of the maximum term in the summation.

Proof

Consider the sum

${\displaystyle S=\sum _{N=1}^{M}T_{N}}$

where ${\displaystyle T_{N}}$>0 for all N. Since all the terms are positive, the value of S must be greater than the value of the largest term, ${\displaystyle T_{max}}$, and less than the product of the number of terms and the value of the largest term. So we have

${\displaystyle T_{max}<=S<=MT_{max}}$

Taking logarithm gives

${\displaystyle \ln T_{max}<=\ln S<=\ln T_{max}+\ln M}$

This is almost always the case in statistical mechanics that ${\displaystyle T_{max}}$ will be ${\displaystyle O(e^{M})}$ ^{[dubious – discuss]}.

Here we have

${\displaystyle O(M)<=\ln S<=O(M)+\ln M}$

For large M, ln M is negligible with respect to M itself, and so we can see that ln S is bounded from above and below by ${\displaystyle \ln T_{max}}$, and so

${\displaystyle \ln S=\ln T_{max}}$

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