Hypertranscendental number: Difference between revisions

A complex number is said to be hypertranscendental if it is not the value at an algebraic point of a function which is the solution of an algebraic differential equation with coefficients in ${\displaystyle \mathbb{Z}[r]}$ and with algebraic initial conditions.

The term was introduced by D. D. Morduhai-Boltovskoi in "Hypertranscendental numbers and hypertranscendental functions" (1949).^[1]

The term is related to transcendental numbers, which are numbers which are not a solution of a non-zero polynomial equation with rational coefficients. The number ${\displaystyle e}$ is transcendental but not hypertranscendental, as it can be generated from the solution to the differential equation ${\displaystyle y^{\prime }=y}$.

Any hypertranscendental number is also a transcendental number.

• Hypertranscendental function

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• Hiroshi Umemura, "On a class of numbers generated by differential equations related with algebraic groups", Nagoya Math. Journal. Volume 133 (1994), 1-55. (Downloadable from ProjectEuclid)

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