User:Dmitrii Kouznetsov/Analytic Tetration: Difference between revisions
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by Dmitrii Kouznetsov. | by Dmitrii Kouznetsov. | ||
{{under construction}} | {{under construction}} | ||
==Abstract== | |||
'''Analytic tetration''' is defined as [[mathematical function]] that coincives witht the [[tetration]] at integer value of the argument and is analytic outside the negative part of the real axis. Existence of such a function is '''postulated'''. Arguments in favor of uniqueness of such a funciton are considered. The algorithm of evaluation is suggested. Examples of evaluation, pictures and tables are supplied. The application and the generalization is discussed. | |||
==Preface== | |||
The colleagues indicated so many misprints in my papers about tetration, posted at my homepage | |||
<ref name="homepage">Publications (Those about tetrations are at the top) http://www.ils.uec.ac.jp/~dima/PAPERS</ref>, | |||
that I want to give them opportunity to correct them in real time. | |||
I consider the topic very important and urgent. The analytic tetration should be investigated and discussed right now; overvice, | |||
the non-analycic extension may become an ugly standard in mathematics of computation; such a standard will make difficult implementation of arithmetic operations with huge numbers and cause a lot of other incompatibilities. | |||
This is my apology for posting this research now, while the rigorous proof of existence and uniqueness of the analytic tetration is | |||
not yet found. My believe is based on the numerical check of the hypothesis of the existence and uniqueness, on smallness of the residual at the substitution of the function to the tetration equation and beauty of the resulting pictures. I cannot imagine that in many sets of simulations, the agreement with 14 decimal digits occurs again and again just by occasion without deep mathematical meaning. | |||
I hope that the scientific society excise me for postulating the statements which are supposed to be prooven by the rigorous mathematical deduction. | |||
==Introduction== | ==Introduction== | ||
==Asymptotic== | ==Asymptotic== | ||
===Eigenvalues of logarithm=== | |||
[[Image:TetrationAsymptoticParameters00.jpg|700px|right|thumb|parameters of asymptotic of tetration versus logarithm of the base]] | [[Image:TetrationAsymptoticParameters00.jpg|700px|right|thumb|parameters of asymptotic of tetration versus logarithm of the base]] | ||
==Approximation== | ==Approximation== | ||
Revision as of 01:29, 20 May 2008
Analytic tetration
by Dmitrii Kouznetsov.
Abstract
Analytic tetration is defined as mathematical function that coincives witht the tetration at integer value of the argument and is analytic outside the negative part of the real axis. Existence of such a function is postulated. Arguments in favor of uniqueness of such a funciton are considered. The algorithm of evaluation is suggested. Examples of evaluation, pictures and tables are supplied. The application and the generalization is discussed.
Preface
The colleagues indicated so many misprints in my papers about tetration, posted at my homepage [1], that I want to give them opportunity to correct them in real time.
I consider the topic very important and urgent. The analytic tetration should be investigated and discussed right now; overvice, the non-analycic extension may become an ugly standard in mathematics of computation; such a standard will make difficult implementation of arithmetic operations with huge numbers and cause a lot of other incompatibilities.
This is my apology for posting this research now, while the rigorous proof of existence and uniqueness of the analytic tetration is not yet found. My believe is based on the numerical check of the hypothesis of the existence and uniqueness, on smallness of the residual at the substitution of the function to the tetration equation and beauty of the resulting pictures. I cannot imagine that in many sets of simulations, the agreement with 14 decimal digits occurs again and again just by occasion without deep mathematical meaning.
I hope that the scientific society excise me for postulating the statements which are supposed to be prooven by the rigorous mathematical deduction.
Introduction
Asymptotic
Eigenvalues of logarithm
Approximation
references
</references/>
- ↑ Publications (Those about tetrations are at the top) http://www.ils.uec.ac.jp/~dima/PAPERS