Euler function

In mathematics, the Euler function is given by Named after Leonhard Euler, it is a model example of a q-series and provides the prototypical example of a relation between combinatorics and complex analysis.

in the formal power series expansion for

gives the number of partitions of k. That is, where

is the partition function.

The Euler identity, also known as the Pentagonal number theorem, is

is a pentagonal number.

The Euler function is related to the Dedekind eta function as The Euler function may be expressed as a q-Pochhammer symbol: The logarithm of the Euler function is the sum of the logarithms in the product expression, each of which may be expanded about q = 0, yielding which is a Lambert series with coefficients -1/n.

The logarithm of the Euler function may therefore be expressed as where

-[1/1, 3/2, 4/3, 7/4, 6/5, 12/6, 8/7, 15/8, 13/9, 18/10, ...] (see OEIS A000203) On account of the identity

σ ( n ) =

is the sum-of-divisors function, this may also be written as Also if

, then[1] The next identities come from Ramanujan's Notebooks:[2] Using the Pentagonal number theorem, exchanging sum and integral, and then invoking complex-analytic methods, one derives[3]