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Finding Extraterrestrial Earths A Quantum Probability Vision
`The probabilistic principles of Quantum mechanics applies to an observer who has some previous knowledge about the observed system.` `In my experiment, I've started knowing the existence of the living Earth, and, knowing nothing about extrasolar planets supporting life, I've started giving to its existence the minimal possible probability, which I assumed to be related to the Planck fundamental dimension. That's clear to me, assuming the quantum wave function has some real physical existence.` `I will use here also the concept of parallel Universes. Consider a hypothetical minimal Universe composed only by the planet Earth(E).` `I will call it the universe U(0), for which the probability of having an extraterrestrial planet supporting life in it would be zero.` `According to the Heisenberg's uncertainty principle, U(0) would be too much determined and so probably not defined. Now, consequently, we define U(1) as the next hypothetical universe, containing the planet Earth(E) and only one more extraterrestrial body (X1).` `Then,` `U(1)=E+X(1)` `I define the fundamental minimal probability @ as the probability of having in U(1) an extraterrestrial planet capable of supporting life.` `By definition, @ has a dimension similar to the dimension of the fundamental Planck length:` `@=k(10E-34), where` `k= the fundamental minimal probability function. (k>1)` `I think that the a.m. term k(10E-34) is not a constant but some kind of quantum imaginary function, depending on fundamental time, mathematical constants, fundamental quantities and Planck constant. It is not my objective here to show mathematical or physics expertise, but just to shake some ideas and try to play with the concepts of "real" quantum waves, fundamental quantum probability packages, and so on.` `Now let's assemble the table:` `U(0)=E U(1)=E+X(1) U(2)=E+X(1)+X(2) U(3)=E+X(1)+X(2)+X(3) U(n)=E+X(1)+X(2)+X(3)+...+X(n)` `And, for our actual Universe:` `U(10E24)=E+X(1)+X(2)+X(3)+...+X(10E24)` `The a.m. number 10E24 is the assumed number of celestial bodies of the 4D (four dimensional) Universe:` `One hundred billion galaxies per Universe;` `One hundred billion star systems per galaxy;` `One hundred celestial bodies (Planets, moons, planetoids) per star system, say:` `10E11 * 10E11 * 10E2 = 10E24 planets, moons, planetoids.` `And the corresponding probabilities P of existing extraterrestrial (or extrasolar) planets with life would be:` `For U(0), P(0)=0 For U(1), P(1)=1@=1k(10E-34) For U(2), P(2)=2@=2k(10E-34) For U(3), P(3)=3@=3k(10E-34) For U(n), P(n)=n@=nk(10E-34) For a=U(10E24), P(a)=10E24@=10E24k(10E-34) Now we need that some crazy guy to calculate the nature and eventually the values of k and consequently P(a).` `Notes:` `a)The k formula would be such that, for an infinite number of universes, P=1!` `b) Conservatively, I assume that life on one planet do not affect life on any other planet (otherwise, P would be even higher!). So I think that Quantum mechanics waves do have a real physical existence. They are capable of traveling at superluminal speeds, transport information thorough extra dimensions, and I say they are composed of packets of minimum probability the same way light is made of packets named photons. Some day we would be able to detect probability particles!` `Maybe these waves connect different multiverses! Quantum waves are related to our conscience, conecting it to other multiverses like the level 4 mathematical multiverse. That's why we have the hability to anticipate events with our mind when we integrate the platonic vision with some colapsed information (experience) from our “real” 4D world.` `This is my symbolic game. It is neither wrong, neither right. It is just a set of symbols, a set of abstract ideas!`
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Finding Extraterrestrial Earths

A Quantum Probability Vision

The probabilistic principles of Quantum mechanics applies to an observer who has some previous knowledge about the observed system.

In my experiment, I've started knowing the existence of the living Earth, and, knowing nothing about extrasolar planets supporting life, I've started giving to its existence the minimal possible probability, which I assumed to be related to the Planck fundamental dimension. That's clear to me, assuming the quantum wave function has some real physical existence.

I will use here also the concept of parallel Universes. Consider a hypothetical minimal Universe composed only by the planet Earth(E).

I will call it the universe U(0), for which the probability of having an extraterrestrial planet supporting life in it would be zero.

According to the Heisenberg's uncertainty principle, U(0) would be too much determined and so probably not defined. Now, consequently, we define U(1) as the next hypothetical universe, containing the planet Earth(E) and only one more extraterrestrial body (X1).

Then,

U(1)=E+X(1)

I define the fundamental minimal probability @ as the probability of having in U(1) an extraterrestrial planet capable of supporting life.

By definition, @ has a dimension similar to the dimension of the fundamental Planck length:

@=k(10E-34), where

k= the fundamental minimal probability function. (k>1)

I think that the a.m. term k(10E-34) is not a constant but some kind of quantum imaginary function, depending on fundamental time, mathematical constants, fundamental quantities and Planck constant. It is not my objective here to show mathematical or physics expertise, but just to shake some ideas and try to play with the concepts of "real" quantum waves, fundamental quantum probability packages, and so on.

Now let's assemble the table:

U(0)=E U(1)=E+X(1) U(2)=E+X(1)+X(2) U(3)=E+X(1)+X(2)+X(3) U(n)=E+X(1)+X(2)+X(3)+...+X(n)

And, for our actual Universe:

U(10E24)=E+X(1)+X(2)+X(3)+...+X(10E24)

The a.m. number 10E24 is the assumed number of celestial bodies of the 4D (four dimensional) Universe:

One hundred billion galaxies per Universe;

One hundred billion star systems per galaxy;

One hundred celestial bodies (Planets, moons, planetoids) per star system, say:

10E11 * 10E11 * 10E2 = 10E24 planets, moons, planetoids.

And the corresponding probabilities P of existing extraterrestrial (or extrasolar) planets with life would be:

For U(0), P(0)=0 For U(1), P(1)=1@=1k(10E-34) For U(2), P(2)=2@=2k(10E-34) For U(3), P(3)=3@=3k(10E-34) For U(n), P(n)=n@=nk(10E-34) For a=U(10E24), P(a)=10E24@=10E24k(10E-34) Now we need that some crazy guy to calculate the nature and eventually the values of k and consequently P(a).

Notes:

a)The k formula would be such that, for an infinite number of universes, P=1!

b) Conservatively, I assume that life on one planet do not affect life on any other planet (otherwise, P would be even higher!). So I think that Quantum mechanics waves do have a real physical existence. They are capable of traveling at superluminal speeds, transport information thorough extra dimensions, and I say they are composed of packets of minimum probability the same way light is made of packets named photons. Some day we would be able to detect probability particles!

Maybe these waves connect different multiverses! Quantum waves are related to our conscience, conecting it to other multiverses like the level 4 mathematical multiverse. That's why we have the hability to anticipate events with our mind when we integrate the platonic vision with some colapsed information (experience) from our “real” 4D world.

This is my symbolic game. It is neither wrong, neither right. It is just a set of symbols, a set of abstract ideas!

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