Sebadodo Math Conjecture - Part 1

SEBADODO’S CONJECTURE 

This is one of the weirdest yet most reasonable conjectures ever posed by Sebadodo. It states that ‘the shape of standard mathematical space is modular’. 

A stronger form of the conjecture states that ‘At an infinite distance from zero in both the positive and negative directions, there exists a number X and a number -X which satisfy the equation 𝑋= −𝑋.’ 

This is arrived at with analytical continuation:  

If infinity is a number that has the property, for any finite number n,  

𝑛∞=𝑛+1∞$$\frac{n}{\infty }=\frac{n+1}{\infty }$$

 

Since any finite number a, for any finite number n satisfies the property 

𝑛𝑎<𝑛+1𝑎$$\frac{n}{a}<\frac{n+1}{a}$$

 

I assume a number further than the set of infinite numbers in the ‘direction of largeness’ should satisfy the property  

𝑛𝑎>𝑛+1𝑎$$\frac{n}{a}>\frac{n+1}{a}$$

 

 

This forms the core of Sebadodo’s Conjecture, and stronger forms of it also exist, such as the aforementioned conjecture: ‘At an infinite distance from zero in both the positive and negative directions, there exists a number X and a number -X which satisfy the equation X = -X.'

The implications of this conjecture are not obvious but are profound. An extension of Sebadodo’s Conjecture, the 1/0 Mist Conjecture, states:  

‘The previously undefined number 1/0 has value that is distributed evenly among all numbers on the number line.’  

According to the Sebadodo Conjecture, this previously undefined result is a ‘4D linear variable number’.  

To understand this better, think of any ordinary number as a point on the number line with opacity 100%. Then, if it were 2 points, it would be a 50% chance. (see paradox numbers). 

However, as the number 1/0 is equal to ‘as many zeroes as fit in a one’, that would be more than infinite. Visualizing an operation as a function that picks up the number operated on and transports it in the direction of the final result, if the function picked up 1 and started transporting it, it would be transported in the direction of largeness (I know, I cannot communicate) forever. And since Sebadodo’s Conjecture states that standard numerical space is modular, it would be transported forever along the infinite ‘number ring’. Hence, only two conclusions can be drawn. 

0

A), the number 1/0 has no end result, as the number is forever being carried. This is the ‘1/0 Nonexistence Conjecture’ 

B), the end result is interspersed among all real numbers. This is the 1/0 Mist Conjecture. 

Personally, I think the Nonexistence Conjecture is more likely to be true, but who knows? 

Now, I have a new update. This can be visualized as a ‘circle’ as shown:  

 

 

 

 

 

 

 

Hence, the definition of largeness is based on how close a number is to infinity.  

Or, we could adopt a new standard for how large a number is purely based on the direction of largeness, ie, from zero to the positives, then to the negatives, then back to zero. Then, we get the bizarre conclusion that how large a number is in relation to another number switches polarity after omega. 

However, I have another theory. It is that of numbers that are distinct but have similar properties, such as whales have fins or fin-like paddles like fish but are not fish, or that Hitler and Stalin both had silly moustaches, which can be generalized as a similar property. Maybe infinity is a cousin of negative numbers, or a divergent value?  

 

I have also noticed an uncanny similarity to the spheres in quantum computing, like the Block sphere will think about that later