Gaussian logarithm

Script error: No such module "Unsubst". In mathematics, addition and subtraction logarithms or Gaussian logarithms can be utilized to find the logarithms of the sum and difference of a pair of values whose logarithms are known, without knowing the values themselves.^[1]

Their mathematical foundations trace back to Zecchini Leonelli^[2][3] and Carl Friedrich Gauss^[4][1][5] in the early 1800s.^{[2][3][4][1][5]}

The operations of addition and subtraction can be calculated by the formulas

${\displaystyle {\log }_b(|X|+|Y|)=x+s_b(y-x),}$

${\displaystyle {\log }_b\left(\right||X|-|Y|\left|\right)=x+d_b(y-x),}$

where ${\displaystyle x={\log }_b|X|}$, ${\displaystyle y={\log }_b|Y|}$, the "sum" function is defined by ${\displaystyle s_b(z)={\log }_b(1+b^z)}$, and the "difference" function by ${\displaystyle d_b(z)={\log }_b|1-b^z|}$. The functions ${\displaystyle s_b(z)}$ and ${\displaystyle d_b(z)}$ are also known as Gaussian logarithms.

For natural logarithms with ${\displaystyle b=e}$ the following identities with hyperbolic functions exist:

${\displaystyle s_e(z)=\ln 2+\frac{z}{2}+\ln (\cosh \frac{z}{2}).}$

${\displaystyle d_e(z)=\ln 2+\frac{z}{2}+\ln |\sinh \frac{z}{2}|.}$

This shows that ${\displaystyle s_e}$ has a Taylor expansion where all but the first term are rational and all odd terms except the linear term are zero.

The simplification of multiplication, division, roots, and powers is counterbalanced by the cost of evaluating these functions for addition and subtraction.

See also

• Softplus operation in neural networks
• Zech's logarithm
• Logarithm table
• Logarithmic number system (LNS)

References

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Further reading

• Script error: No such module "citation/CS1". (NB. Contains a table of Gaussian logarithms lg(1+10^−x).)
• Script error: No such module "citation/CS1". [1][2]
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