Temporal string theory

here is some high end theoretical math my stuff is underneath the stuff from Alexander.

String Mathematicsby Hyphenated @ 2008-11-21 - 13:13:38 The universe consists of particles / objects, strings and frames. Each object or particle has a string attached to it which we may call a tail, trail, or highway as well as anything else. Most strings do not have a location unless you state a formula such as ( y = 2 ) or ( y = ½ ). A string is a total of the object’s digits. For instance 97 has a string total of ( 9 + 7 = 16 ) or ( 9 + 7 = 16, 1 + 6 = 7 ). Therefore, as an example, 97 has two strings which are 16 and 7. The formula ( y = 2 ) has a string value of 2 and a particle / object value of 2. Here’s the solution to Riemann’s Hypothesis using string mathematics. Riemann said that all the zeros of his zeta function lie on the line ( y = ½ ) as the result of summing. In the formula ( y = 2 ), the string holds an infinity of numbers providing their sum doesn’t exceed 2. These numbers can be created by adding zeros to a number ( 101, 1001, etc. ). The string can also hold the number 2 and 11 since ( 1 + 1 = 2 ). Here’s a condensed version of the Riemann Hypothesis proof based on string mathematics and the conversion of ( y = 2 ) to ( y = ½ ):1. Write down the number 2 which represents both the string length of number 2 and number 2 itself.2. Write down the number 11 since ( 1 + 1 = 2 ) and the string length of number 2 is still intact.3. Put a series of zeros between the two 1’s creating numbers 101, 1001, 10001, ----- 100000001. ( the string length of number 2 is still intact ).4. Write the fractions ½, 1/11, 1/101, 1/1001, 1/1001, ------ 1/100000001.5. Raise each fraction to the power of 2 ( this is the value of the string / tail and not the number 2 ).6. Sum the fractions to the power of string / tail value 2.7. Depending on the power of your calculator / spreadsheet / perseverance, the limit or convergence will be around (0.258363501).So what??? When you were doing your calculation involving the zeros between the "1" digits ( 101, 1001, etc. ) you were actually using the string / tail values in the string which was attached to the mathematical value of 2 which was on the line ( y = 2 ). When you wrote the fractions, you were converting the line ( y = 2 ) to the line ( y = ½ ). The summation of the fractions ( ½, 1/11, 1/ 101, etc. ) produced the limit of (0.258363501). The zeros never left the string / tail when the line was converted and therefore the Riemann Hypothesis is proved using string mathematics. The same principle applies to any other equation converted to its’ reciprocal. The zeros can be placed anywhere to make a number in the string .
Range spectrum field theory
by valpetridis @ 2008-11-22 - 15:46:53
Range spectrum field theory
To explain the mathematics to spectrum range string theory that I was inspired to explain due to my friend Alexander. If one imagines strings trailing off from fixed points at natural graduations of reflective increments, y=73 is 4 as 7-3= 4 as well as simultaneously 3-7=-4 yet to signify this as one equation one must imagine each path reintegrating as r=the crossing of each string and thus 7-3+3-7 to the i0.99999 infinity. Thus R varies .0000 infinity 1, thus strings of 11, 101, 1001 are fixed in a field of temporal reality whose increments fluctuate based on tens that influence only the first(s) digits as compared to the second half of the string.So Y= 73 is 0 to.0001 infinity 1 ( 0.000000infity one which is the same as zero) , which is its fixed point, recall 0 can be positive or negative and while also 8 as its opposite reflection 7-3,+7-3(-0.99 infinity)r to its variance as five multiple integrations, 0.0000 infinity 1, -0.000001 infinity 1As well as -0.0000001 infinity -1 as well 0.999999 and -0.99999Thus from The Riemann Hypothesis string totals integrated into non fixed spectrums that lead to the whole string is 11, 1001 as well as -11, -101. 101 to r11 is (1+!) 2, (1-1) 0 while 101 is 2 well as (10 + 1)11 and 0( 1-1) and 9 (10-1) , The + places each pointed into a range of unfixed regularity based on five r values and this string can be all five and according to string core patching 0 if the string variance in existence is either -0 or +0.The five r values can be noted as RThe string spectrum contains both its ½ , its and its reflection and in convergance at conversion of, to its 1/-1 . As in Alexander’s example this means y=2 converges at y = ½ while 2(0.99999) 2(0. 000 infinity 1) converge at ½ (0.000 infinity -1) and ½ (-0.9999) and in its reflective paths that illuminate the spectrum at -2 (- 0.00000 infinity 1) -2 (0.0000 infinity -1) and (-0.9999999)The positive incrimination is an exponent 2 and its reflection of -2 leads back to 2 converging at ½ while r= r or R and r is any of the variance values up to R.
R can have 5 extended ranges that include -0. 0, +0, 1 and -1
R with in the variant ranges consists of two string sets within the fixed string point of linear mathematic existence or ranges.
Thus numbers lie within time on a fixed linear progression when r is either 0.99 infinity or -0.99 infinity
The other three ranges are zero within time and at base one outside of time reflecting the termination of temporal mathematics at 0.999 to 0.000 infinity 1.
Thus 0.00 infinity 1 becomes fixed as unfixed outside of linear time progression.
The range index 0.00 infinity a
Where a is a variable represents a string set that varies outside of finite infinity
Thus 0.00 infinity 2 is 0 in finite infinitude and 2 at base one in atemporal infinite infinity.
Thus the range of the spectrum of a string exists both inside a fixed temporal point and as interwoven infinite variable ranges both inside and outside of time, where convergence seems fixed at 01 or a binary base existence in this reality or temporal field and unfixed in the converges unfixed by the variance of the R values which are reflective of these ranges in slight changes depended on the perspective relative to the coding of the base r as whole numbers, 1 or 0 with a deviation of or 0.9999 infinity or 0.00 infinity 1, with the possibility of infinity indexes outside of time not congruent to the base binary derivation of the variance be it negative or positive.


Till next time blogger crowd,