2016年10月24日月曜日

From the story of zero to becoming a Math hero!

From the story of zero to becoming a Math hero!

Discovery of zero

He is very important. Without him, we wouldn’t have had arithmetic calculations, calculus or accounting. He plays an important role in today’s world of computers. He is known as zero. How sad that we use his name to belittle people!
The Sumerians, Babylonians, Greeks and the Egyptians did initiate counting systems in their own way, but credit for discovering zero goes to Indians.
Around 650 AD, there lived a great mathematician called Brahmagupta. He was the first to formalise arithmetic operations using zero. He used dots below numbers to indicate a zero. These dots were referred to as Sunya (empty) or Kha (place). Though Brahmagupta was able to formalise rules for getting zero as an answer through addition and subtraction, he was not able to do the same with division by zero.
After many years, the concept of zero reached Baghdad. It was around 773 AD that Arab mathematicians worked on zero and developed their numbers based on the Indian system. A number of mathematicians too worked on zero and various important aspects of Maths thus evolved. In the 1600, Newton and Leibniz worked with numbers as they approached zero and from this was born calculus which in turn was the basis for physics, engineering, economics and finance. The discovery and understanding of zero was certainly one of the greatest human accomplishments.
Discovery of Pi

It all started with a circle. There was a constant ratio between the circumference of a circle and its diameter, but it took too long for humans to become aware of it. Both Babylonians and Egyptians had knowledge of Pi, but they were not accurate.
While the Babylonians estimated pi to be 25/8 (3.125), the Egyptians zeroed in on 256/81 (3.16). Archimedes of Syracuse calculated the near accurate estimation of pi. He did this by finding the area of two polygons. While one polygon was inscribed inside a circle, the other had a circle circumscribed. Can you believe that he used 96-sided polygons to come up with a value which was between 3.1408 and 3.14285? Chinese mathematician Zhu Chongzhi approximated Pi using a 12,288-sided polygon.
Welsh mathematician William Jones was the first to use the Greek letter Pi to denote the constant. The most accurate approximation of Pi was done by D.F. Ferguson. He calculated Pi to 620 digits. Shigeru Kondu developed it further by using a supercomputer.
Tracing Pythagoras theorem

We have had knowledge of the relationship between the sides of the right-angled triangle long before Greek mathematician Pythagoras worked on it. He has been credited for the theorem as he was the first to prove it.
The Babylonians seem to have had rules to generate Pythagorean triples, understood the relationship between the sides of a right-angled triangle, nearly 1,000 years before Pythagoras worked on them.
Ancient clay tablets are proof enough of the Babylonians’ knowledge in this sphere as early as second millennium B.C. In the ancient text of Indians — Sulbasutras — the Pythagorean Theorem has been discussed. This is proof enough that Indian mathematicians also knew about this long before Pythagoras, though it was mainly for religious purposes. Ancient Mayas have also used variations of the Pythagorean triples in their Long Count calendar.
Pythagoras did not allow his teachings to be recorded in writing so we do not know for sure how he proved his theorem.
The beginning of Roman numerals
Roman numerals are now used to denote subdivisions on a question paper or sometimes on a clock. There is hardly any other use of the numerals now, but it was once the usual way of writing numbers throughout Europe. As the name suggests, it originated in ancient Rome. Numbers in this system were written using the Latin alphabet. From 14th century onwards, Roman numerals were replaced by Hindu-Arabic numerals.
There is no clear explanation regarding the origin of Roman numerals. Some historians believe that they were derived from notches on tally sticks. Italian and Dalmatian shepherds continued to use them well into the 19th century. Mathematician and author Alfred Hooper believed that Roman numerals were related to hand gestures for counting. A third hypothesis states that the basic ciphers were 1,X,C and and and the other ones were derived by taking half of these.
Discovery of Abacus
Counting was essential for man to maintain inventories. Early man counted by matching one set of objects with another. They used beans or stones to count. Gradually this calculating tool was constructed as a bamboo frame with beads sliding on wires. The origin of the word Abacus can be traced to the Greek word abax which means calculating board. The Chinese must be credited for developing the abacus about 5,000 years ago (3000 BC). Built out of woods and beads, it was portable and easy to handle. Abacus helped people keep track of numbers as they did the calculations. It was such a hit among the Chinese that slowly the knowledge and use of abacus spread to other countries. Around 500 BC, the Greeks and Romans used counting devices based on the same principles as abacus which came to be known as the first personal calculator. The concept of positional notation was also used in abacus around this time. Abacus is used by many even today. People who are good at using an abacus can often do calculations as quickly as a person using the calculator.





Pythagoras was also a philosopher who was the first to represent musical harmonies as simple ratios. His followers had a great devotion for him and they followed a strict moral and ethical code. It is widely believed that he lived between 569 B.C. and 500 B.C.


 


DID YOU KNOW?


The Great Pyramid at Giza which was built between 2550 and 2500 BC has a perimeter of 1760 cubits and a height of 280 cubits. This is approximately 2 times Pi.
\documentclass[12pt]{article}
\usepackage{latexsym,amsmath,amssymb,amsfonts,amstext,amsthm}
\numberwithin{equation}{section}
\begin{document}
\title{\bf  Announcement 326:   The division by zero z/0=0 - its impact to human beings through education and research\\
(2016.10.17)}
\author{{\it Institute of Reproducing Kernels}\\
Kawauchi-cho, 5-1648-16,\\
Kiryu 376-0041, Japan\\
 }
\date{\today}
\maketitle
{\bf Abstract: } In this announcement, for its importance we would like to state the
situation on the division by zero and propose basic new challenges to education and research on our wrong world history.

\bigskip
\section{Introduction}
%\label{sect1}
By a {\bf natural extension} of the fractions
\begin{equation}
\frac{b}{a}
\end{equation}
for any complex numbers $a$ and $b$, we found the simple and beautiful result, for any complex number $b$
\begin{equation}
\frac{b}{0}=0,
\end{equation}
incidentally in \cite{s} by the Tikhonov regularization for the Hadamard product inversions for matrices and we discussed their properties and gave several physical interpretations on the general fractions in \cite{kmsy} for the  case of real numbers.

 The division by zero has a long and mysterious story over the world (see, for example, Google site with the division by zero) with its physical viewpoints since the document of zero in India on AD 628,  however,
  Sin-Ei Takahasi (\cite{kmsy}) established a simple and decisive interpretation (1.2) by analyzing the extensions of fractions and by showing the complete characterization for the property (1.2):

 \bigskip

 {\bf  Proposition 1. }{\it Let F be a function from  ${\bf C }\times {\bf C }$  to ${\bf C }$ satisfying
$$
F (b, a)F (c, d)= F (bc, ad)
$$
for all
$$
a, b, c, d  \in {\bf C }
$$
and
$$
F (b, a) = \frac {b}{a },  \quad   a, b  \in  {\bf C }, a \ne 0.
$$
Then, we obtain, for any $b \in {\bf C } $
$$
F (b, 0) = 0.
$$
}

 Note that the complete proof of this proposition is simply given by  2 or 3 lines.
We should define $F(b,0)= b/0 =0$, in general.

\medskip
We thus should consider, for any complex number $b$, as  (1.2);
that is, for the mapping
\begin{equation}
W = \frac{1}{z},
\end{equation}
the image of $z=0$ is $W=0$ ({\bf should be defined}). This fact seems to be a curious one in connection with our well-established popular image for the  point at infinity on the Riemann sphere. Therefore, the division by zero will give great impact to complex analysis and to our ideas for the space and universe.

However, the division by zero (1.2) is now clear, indeed, for the introduction of (1.2), we have several independent approaches as in:

\medskip
1) by the generalization of the fractions by the Tikhonov regularization and by the Moore-Penrose generalized inverse,

\medskip
2) by the intuitive meaning of the fractions (division) by H. Michiwaki - repeated subtraction method,

\medskip
3) by the unique extension of the fractions by S. Takahasi,   as in the above,

\medskip
4) by the extension of the fundamental function $W = 1/z$ from ${\bf C} \setminus \{0\}$ into ${\bf C}$ such that $W =1/z$ is a one to one and onto mapping from $ {\bf C} \setminus \{0\} $ onto ${\bf C} \setminus \{0\}$ and the division by zero $1/0=0$ is a one to one and onto mapping extension of the function $W =1/z $ from  ${\bf C}$ onto ${\bf C}$,

\medskip
and

\medskip

5) by considering the values of functions with the mean values of functions.
\medskip

Furthermore, in (\cite{msy}) we gave the results in order to show the reality of the division by zero in our world:

\medskip

\medskip
A) a field structure  containing the division by zero --- the Yamada field ${\bf Y}$,

\medskip
B)  by the gradient of the $y$ axis on the $(x,y)$ plane --- $\tan \frac{\pi}{2} =0$,
\medskip

C) by the reflection $W =1/\overline{z}$ of $W= z$ with respect to the unit circle with center at the origin on the complex $z$ plane --- the reflection point of zero is zero, not the point at infinity.
\medskip

and
\medskip

D) by considering rotation of a right circular cone having some very interesting
phenomenon  from some practical and physical problem.

\medskip

In (\cite{mos}),  many division by zero results in Euclidean spaces are given and  the basic idea at the point at infinity should be changed. In (\cite{ms}), we gave beautiful geometrical interpretations of determinants from the viewpoint of the division by zero. The results show that the division by zero is our basic and elementary mathematics in our world.

\medskip

See  J. A. Bergstra, Y. Hirshfeld and J. V. Tucker \cite{bht} for the relationship between fields and the division by zero, and the importance of the division by zero for computer science. It seems that the relationship of the division by zero and field structures are abstract in their paper.

Meanwhile,  J. P.  Barukcic and I.  Barukcic (\cite{bb}) discussed recently the relation between the divisions $0/0$, $1/0$ and special relative theory of Einstein. However, their logic seems to be curious and their results contradict with ours.

 Furthermore,  T. S. Reis and J.A.D.W. Anderson (\cite{ra,ra2}) extend the system of the real numbers by introducing an ideal number for the division by zero $0/0$.

 Meanwhile, we should refer to up-to-date information:

{\it Riemann Hypothesis Addendum - Breakthrough

Kurt Arbenz
https://www.researchgate.net/publication/272022137 Riemann Hypothesis Addendum -   Breakthrough.}

\medskip

Here, we recall Albert Einstein's words on mathematics:
Blackholes are where God divided by zero.
I don't believe in mathematics.
George Gamow (1904-1968) Russian-born American nuclear physicist and cosmologist remarked that "it is well known to students of high school algebra" that division by zero is not valid; and Einstein admitted it as {\bf the biggest blunder of his life} [1]:
1. Gamow, G., My World Line (Viking, New York). p 44, 1970.

 Apparently, the division by zero is a great missing in our mathematics and the result (1.2) is definitely determined as our basic mathematics, as we see from Proposition 1.  Note  its very general assumptions and  many fundamental evidences in our world in (\cite{kmsy,msy,mos}). The results will give great impact  on Euclidean spaces, analytic geometry, calculus, differential equations, complex analysis and  physical problems.

The mysterious history of the division by zero over one thousand years is a great shame of  mathematicians and human race on the world history, like the Ptolemaic system (geocentric theory). The division by zero will become a typical  symbol of foolish human race with long and unceasing struggles. Future people will realize this fact as a definite common sense.

We should check and fill our mathematics, globally and beautifully, from the viewpoint of the division by zero. Our mathematics will be more perfect and beautiful,  and will give great impact to our basic ideas on the universe.

 For our ideas on the division by zero, see the survey style announcements.

\section{Basic Materials of Mathematics}

  (1): First, we should declare that the divison by zero is possible in the natural and uniquley determined sense and its importance.

  (2): In the elementary school, we should introduce the concept of division by the idea of repeated subtraction method by H. Michiwaki whoes method is applied in computer algorithmu and in old days for calculation of division. This method will give a simple and clear method for calculation of division and students will be happy to apply this simple method at the first stage. At this time, they will be able to understand that the division by zero is clear and trivial as $a/0=0$ for any $a$. Note that Michiwaki knows how to apply his method to the complex number field.

  (3): For the introduction of the elemetary function $y= 1/x$, we should give the definition of the function at the origin $x=0$ as $y = 0$ by the division by zero idea and we should apply this definition for the occasions of its appearences, step by step, following the curriculum and the results of the division by zero.

  (4): For the idea of the Euclidean space (plane), we should introduce, at the first stage, the concept of steleographic projection and the concept of the point at infinity  -
   one point compactification. Then, we will be able to see the whole Euclidean plane, however, by the division by zero, the point at infinity is represented by zero. We can teach  the very important fact with many geometric and analytic geometry methods. These topics will give great pleasant feelings to many students.
  Interesting topics are: parallel lines, what is a line? - a line contains the origin as an isolated
point for the case that the native line does not through the origin. All the lines pass the origin, our space is not the Eulcildean space and is not Aristoteles for the strong discontinuity at the point at infinity (at the origin). - Here note that an orthogonal coordinates should be fixed first for our all arguments.

(5): The inversion of the origin with respect to a circle with center the origin is the origin itself, not the point at infinity - the very classical result is wrong. We can also prove this elementary result by many elementary ways.

(6): We should change the concept of gradients; on the usual orthogonal coordinates $(x,y)$,
 the gradient of the $y$ axis is zero; this is given and proved by the fundamental result
 $\tan (\pi/2) =0$. The result is trivial in the definition of the Yamada field. This result is derived also from  the {\bf division by zero calculus}:
\medskip

 For any formal Laurent expansion around $z=a$,
\begin{equation}
f(z) = \sum_{n=-\infty}^{\infty} C_n (z - a)^n,
\end{equation}

we obtain the identity, by the division by zero

\begin{equation}
f(a) =  C_0.
\end{equation}
\medskip

This fundamental result leads to the important new definition:
From the viewpoint of the division by zero, when there exists the limit, at $ x$
 \begin{equation}
 f^\prime(x) = \lim_{h\to 0} \frac{f(x + h) - f(x)}{h}  =\infty
 \end{equation}
 or
 \begin{equation}
 f^\prime(x) =  -\infty,
 \end{equation}
 both cases, we can write them as follows:
 \begin{equation}
  f^\prime(x) =  0.
 \end{equation}
 \medskip

 For the elementary ordinary differential equation
 \begin{equation}
 y^\prime = \frac{dy}{dx} =\frac{1}{x}, \quad x > 0,
 \end{equation}
 how will be the case at the point $x = 0$? From its general solution, with a general constant $C$
 \begin{equation}
 y = \log x + C,
 \end{equation}
 we see that, by the division by zero,
 \begin{equation}
 y^\prime (0)= \left[ \frac{1}{x}\right]_{x=0} = 0,
 \end{equation}
 that will mean that the division by zero (1.2) is very natural.

 In addition, note that the function $y = \log x$ has infinite order derivatives and all the values are zero at the origin, in the sense of the division by zero.

 However, for the derivative of the function $y = \log x$, we have to fix the sense at the origin, clearly, because the function is not differentiable, but it has a singularity at the origin. For $x >0$, there is no problem for (2.6) and (2.7). At  $x = 0$, we  see that we can not consider the limit in the sense (2.3).  However,  for $x >0$ we have (2.6) and
 \begin{equation}
 \lim_{x \to +0} \left(\log x \right)^\prime = +\infty.
 \end{equation}
 In the usual sense, the limit is $+\infty$,  but in the present case, in the sense of the division by zero, we have:
 \begin{equation}
 \left[ \left(\log x \right)^\prime \right]_{x=0}= 0
 \end{equation}
  and we will be able to understand its sense graphycally.

 By the new interpretation for the derivative, we can arrange many formulas for derivatives, by the division by zero. We can modify many formulas and statements in calculus and we can apply our concept to the differential equation theory and the universe in connetion with derivatives.

(7): We shall introduce the typical division by zero calculus.

  For the integral
\begin{equation}
\int x(x^{2}+1)^{a}dx=\frac{(x^{2}+1)^{a+1}}{2(a+1)}\quad(a\ne-1),
\end{equation}
we obtain, by the division by zero,
\begin{equation}
\int x(x^{2}+1)^{-1}dx=\frac{\log(x^{2}+1)}{2}.
\end{equation}

We will consider the fundamental ordinary differential equations

\begin{equation}
x^{\prime \prime}(t) =g -kx^{\prime}(t)
\end{equation}
with the initial conditions
\begin{equation}
x(0)  = -h, x^{\prime}(0) =0.
\end{equation}
Then we have the solution
\begin{equation}
x(t) = \frac{g}{k}t + \frac{g(e^{-kt}- 1)}{k^2} - h.
\end{equation}
Then, for $k=0$, we obtain, immediately, by the division by zero
\begin{equation}
x(t) = \frac{1}{2}g t^2 -h.
\end{equation}

In those examples, we were able to give valuable functions for denominator zero cases. The division by zero calculus may be applied to many cases as a new fundamental calculus over l'Hôpital's rule.

(8):  When we apply the division by zero to functions, we can consider, in general, many ways.  For example,
for the function $z/(z-1)$, when we insert $z=1$  in numerator and denominator, we have
\begin{equation}
\left[\frac{z}{z-1}\right]_{z = 1} = \frac{1}{0} =0.
\end{equation}
However,
from the identity --
 the Laurent expansion around $z=1$,
\begin{equation}
\frac{z}{z-1} = \frac{1}{z-1} + 1,
\end{equation}
we have
\begin{equation}
 \left[\frac{z}{z-1}\right]_{z = 1} = 1.
 \end{equation}
 For analytic functions we can give uniquely determined values at isolated singular points by the values by means of the Laurent expansions as the division by zero calculus, however, the values by means of the Laurent expansions are not always reasonable. We will need to consider many interpretations for reasonable values. In many formulas in mathematics and physics, however, we can see that the division by zero calculus is reasonably valid. See \cite{kmsy,msy}.

\section{Albert Einstein's biggest blunder}
The division by zero is directly related to the Einstein's theory and various
physical problems
containing the division by zero.  Now we should check the theory and the problems by the concept of the RIGHT and DEFINITE division by zero. Now is the best time since 100 years from Albert Einstein. It seems that the background knowledge is timely fruitful.

Note that the Big Bang also may be related to the division by zero like the blackholes.

\section{Computer systems}
The above Professors listed are wishing the contributions in order to avoid the division by zero trouble in computers. Now,  we should arrange  new computer systems in order not to meet the division by zero trouble in computer systems.

 By the division by zero calculus, we will be able to overcome troubles in Maple for specialization problems.

\section{General  ideas on the universe}
The division by zero may be related to religion,  philosophy and the ideas on the universe, and it will creat a new world. Look the new world introduced.

\bigskip

We are standing on a new  generation and in front of the new world, as in the discovery of the Americas.  Should we push the research and education on the division by zero?

 \bigskip

\bibliographystyle{plain}
\begin{thebibliography}{10}

\bibitem{bb}
J. P.  Barukcic and I.  Barukcic, Anti Aristotle—The Division of Zero by Zero. Journal of Applied Mathematics and Physics,  {\bf 4}(2016), 749-761.
doi: 10.4236/jamp.2016.44085.

\bibitem{bht}
J. A. Bergstra, Y. Hirshfeld and J. V. Tucker,
Meadows and the equational specification of division (arXiv:0901.0823v1[math.RA] 7 Jan 2009).

\bibitem{cs}
L. P.  Castro and S. Saitoh,  Fractional functions and their representations,  Complex Anal. Oper. Theory {\bf7} (2013), no. 4, 1049-1063.

\bibitem{kmsy}
M. Kuroda, H. Michiwaki, S. Saitoh, and M. Yamane,
New meanings of the division by zero and interpretations on $100/0=0$ and on $0/0=0$,
Int. J. Appl. Math.  {\bf 27} (2014), no 2, pp. 191-198,  DOI: 10.12732/ijam.v27i2.9.

\bibitem{ms}
T. Matsuura and S. Saitoh,
Matrices and division by zero $z/0=0$, Advances in Linear Algebra
\& Matrix Theory, 6, 51-58. http://dx.doi.org/10.4236/alamt.2016.62007 http://www.scirp.org/journal/alamt 

\bibitem{msy}
H. Michiwaki, S. Saitoh,  and  M.Yamada,
Reality of the division by zero $z/0=0$.  IJAPM  International J. of Applied Physics and Math. {\bf 6}(2015), 1--8. http://www.ijapm.org/show-63-504-1.html

\bibitem{mos}
H.  Michiwaki, H. Okumura, and S. Saitoh,
Division by Zero $z/0 = 0$ in Euclidean Spaces.
 International Journal of Mathematics and Computation
 (in press).

\bibitem{ra}
T. S. Reis and J.A.D.W. Anderson,
Transdifferential and Transintegral Calculus,
Proceedings of the World Congress on Engineering and Computer Science 2014 Vol I
WCECS 2014, 22-24 October, 2014, San Francisco, USA

\bibitem{ra2}
T. S. Reis and J.A.D.W. Anderson,
Transreal Calculus,
IAENG  International J. of Applied Math., {\bf 45}(2015):  IJAM 45 1 06.

\bibitem{s}
S. Saitoh, Generalized inversions of Hadamard and tensor products for matrices,  Advances in Linear Algebra \& Matrix Theory.  {\bf 4}  (2014), no. 2,  87--95. http://www.scirp.org/journal/ALAMT/

\bibitem{ttk}
S.-E. Takahasi, M. Tsukada and Y. Kobayashi,  Classification of continuous fractional binary operations on the real and complex fields,  Tokyo Journal of Mathematics,   {\bf 38}(2015), no. 2, 369-380.

\bibitem{ann179}
Announcement 179 (2014.8.30): Division by zero is clear as z/0=0 and it is fundamental in mathematics.

\bibitem{ann185}
Announcement 185 (2014.10.22): The importance of the division by zero $z/0=0$.

\bibitem{ann237}
Announcement 237 (2015.6.18):  A reality of the division by zero $z/0=0$ by  geometrical optics.

\bibitem{ann246}
Announcement 246 (2015.9.17): An interpretation of the division by zero $1/0=0$ by the gradients of lines.

\bibitem{ann247}
Announcement 247 (2015.9.22): The gradient of y-axis is zero and $\tan (\pi/2) =0$ by the division by zero $1/0=0$.

\bibitem{ann250}
Announcement 250 (2015.10.20): What are numbers? -  the Yamada field containing the division by zero $z/0=0$.

\bibitem{ann252}
Announcement 252 (2015.11.1): Circles and
curvature - an interpretation by Mr.
Hiroshi Michiwaki of the division by
zero $r/0 = 0$.

\bibitem{ann281}
Announcement 281 (2016.2.1): The importance of the division by zero $z/0=0$.

\bibitem{ann282}
Announcement 282 (2016.2.2): The Division by Zero $z/0=0$ on the Second Birthday.

\bibitem{ann293}
Announcement 293 (2016.3.27):  Parallel lines on the Euclidean plane from the viewpoint of division by zero 1/0=0.

\bibitem{ann300}
Announcement 300 (2016.05.22): New challenges on the division by zero z/0=0.


\end{thebibliography}

\end{document}

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