Cosmic Wild

Cosmic Wild

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Photos from Cosmic Wild's post 07/10/2026

My caffeinated joy this evening. Home made iced tea, lime juice, and sugar.

07/07/2026

Funny thing is, I was looking at the license plate of the car in front of me in the McDonald’s drive thru about 15 minutes ago and the first three letters on the plate spurred my imagination. And what did my imagination come up with you might ask? It’s elementary my dear Watson! I came up with a new class of nuclear explosives which likely greatly enhance the explosive effects in higher dimensional space time.

I am not going to disclose the details of these concepts until I have them published in the book I am currently writing.

Also I want to develop some protocols for any related future research and development programs aimed at safety and risk management so that we do not get into conflicts with beings inhabiting higher dimensions. Any physical body ETs on other planets and capable of interstellar travel would also want us to proceed with great caution.

These nuclear explosives might be great for manipulating space time and hyperspace for ultra advanced spacecraft propulsion methods.

Call Of The Cosmic Wild by James M. Essig, published by Outskirts Press 07/05/2026

Now, there are countable and uncountable infinities.

But before we go further, consider the hyper-operator notation that was designed to express huge values not otherwise expressible.

For example, Note that Hyper4(a, n) is equal to a tetrated n or a raised to the power of itself n-1 times. The latter value is symbolically written as n subscript a. For example 3 EXP 4 = 81, but 4 subscript3 is approximately equal to 10 EXP (1,000,000,000,000).
Alternatively 4 subscript 2 = 2 EXP 2 EXP 2 EXP 2 = 2 EXP [2 EXP [2 EXP 2]] = 2 EXP (2 EXP 4) = 2 EXP 16 = 65,536.

For example, Hyper5(4, 4)is equal to 4 tetrated 4 tetrated 4 tetrated 4. This value is commonly referred to as 4 pentated 4.

Hyper 6, (4,4) is 4 pentated 4 pentated 4 pentated 4 and is also referred to as 4 hexataed 4.

Hyper 7, (4,4) is 4 hexated 4 hexated 4 hexated 4 and so-on
Aleph 0 is the infinite number of integers.

Aleph 1 according to the perhaps unprovable and thus unfalsifiable Continuum Hypotheses is the number of real numbers which is greater than Aleph 0 by a multiplicative factor of infinity.

Aleph 2 is similarly greater than Aleph 1.
Aleph 3 is similarly greater than Aleph 2.
Aleph 4 is similarly greater than Aleph 3.

and so-on

In general, Aleph n = 2 EXP [Aleph (n-1)]

The number Ω is commonly stated as the least infinite positive integer or ordinal and n is any finite or infinite counting number.
Now here is a real zinger.

So we can produce the abstraction of Hyper Aleph Ω (Aleph Ω, Aleph Ω).

So, about expressions such as:

Hyper [Hyper Aleph Ω (Aleph Ω, Aleph Ω)](Hyper Aleph Ω (Aleph Ω, Aleph Ω), Hyper Aleph Ω (Aleph Ω, Aleph Ω))

and

Hyper [Hyper [Hyper Aleph Ω (Aleph Ω, Aleph Ω)](Hyper Aleph Ω (Aleph Ω, Aleph Ω), Hyper Aleph Ω (Aleph Ω, Aleph Ω))]( Hyper [Hyper Aleph Ω (Aleph Ω, Aleph Ω)](Hyper Aleph Ω (Aleph Ω, Aleph Ω), Hyper Aleph Ω (Aleph Ω, Aleph Ω)), Hyper [Hyper Aleph Ω (Aleph Ω, Aleph Ω)](Hyper Aleph Ω (Aleph Ω, Aleph Ω), Hyper Aleph Ω (Aleph Ω, Aleph Ω))).

In fact, we could fill up all possible to produce computer electronic storage media with the resources available in our cosmic light-cone to produce ever larger infinities.

Now, we consider the notation hyper Aleph Ω (Aleph Ω, Aleph Ω)↑,1.

I define the above expression iteratively nested itself number of times.

Now, we consider the notation hyper Aleph Ω (Aleph Ω, Aleph Ω)↑,2.

I define the above expression equal to Aleph Ω (Aleph Ω, Aleph Ω)↑,1 iterated itself number of times where the number of cycles of the process of iterating itself number of times is repeated Aleph Ω (Aleph Ω, Aleph Ω)↑,1 number of times.

The expression Now, we consider the notation hyper Aleph Ω (Aleph Ω, Aleph Ω)↑,3.

I define the above expression equal to Aleph Ω (Aleph Ω, Aleph Ω)↑,2 iterated itself number of times where the number of cycles of the process of iterating itself number of times is repeated Aleph Ω (Aleph Ω, Aleph Ω)↑,2 number of times.

The expression Now, we consider the notation hyper Aleph Ω (Aleph Ω, Aleph Ω)↑,4.

I define the above expression equal to Aleph Ω (Aleph Ω, Aleph Ω)↑,3 iterated itself number of times where the number of cycles of the process of iterating itself number of times is repeated Aleph Ω (Aleph Ω, Aleph Ω)↑,3 number of times.

Now, we consider the notation hyper Aleph Ω (Aleph Ω, Aleph Ω)↑,Ω.

I define the above expression equal to Aleph Ω (Aleph Ω, Aleph Ω)↑,(Ω-1) iterated itself number of times where the number of cycles of the process of iterating itself number of times is repeated Aleph Ω (Aleph Ω, Aleph Ω)↑,(Ω-1) number of times.

Now, we consider the notation hyper Aleph Ω (Aleph Ω, Aleph Ω)↑, Aleph Ω (Aleph Ω, Aleph Ω)↑,Ω.

Now, we consider the notation hyper [Aleph Ω (Aleph Ω, Aleph Ω)↑, Aleph Ω (Aleph Ω, Aleph Ω)↑,Ω]↑,[Aleph Ω (Aleph Ω, Aleph Ω)↑, Aleph Ω (Aleph Ω, Aleph Ω)↑,Ω]↑.

Now, we consider the notation hyper {[Aleph Ω (Aleph Ω, Aleph Ω)↑, Aleph Ω (Aleph Ω, Aleph Ω)↑,Ω]↑,[Aleph Ω (Aleph Ω, Aleph Ω)↑, Aleph Ω (Aleph Ω, Aleph Ω)↑,Ω]↑}↑, {[Aleph Ω (Aleph Ω, Aleph Ω)↑, Aleph Ω (Aleph Ω, Aleph Ω)↑,Ω]↑,[Aleph Ω (Aleph Ω, Aleph Ω)↑, Aleph Ω (Aleph Ω, Aleph Ω)↑,Ω]↑}.

Now, we consider the notation hyper {[Aleph Ω (Aleph Ω, Aleph Ω)↑, Aleph Ω (Aleph Ω, Aleph Ω)↑,Ω]↑,[Aleph Ω (Aleph Ω, Aleph Ω)↑, Aleph Ω (Aleph Ω, Aleph Ω)↑,Ω]↑}↑, {[Aleph Ω (Aleph Ω, Aleph Ω)↑, Aleph Ω (Aleph Ω, Aleph Ω)↑,Ω]↑,[Aleph Ω (Aleph Ω, Aleph Ω)↑, Aleph Ω (Aleph Ω, Aleph Ω)↑,Ω]↑}↑, {[Aleph Ω (Aleph Ω, Aleph Ω)↑, Aleph Ω (Aleph Ω, Aleph Ω)↑,Ω]↑,[Aleph Ω (Aleph Ω, Aleph Ω)↑, Aleph Ω (Aleph Ω, Aleph Ω)↑,Ω]↑}↑, {[Aleph Ω (Aleph Ω, Aleph Ω)↑, Aleph Ω (Aleph Ω, Aleph Ω)↑,Ω]↑,[Aleph Ω (Aleph Ω, Aleph Ω)↑, Aleph Ω (Aleph Ω, Aleph Ω)↑,Ω]↑}.

Now, we consider the notation {hyper {[Aleph Ω (Aleph Ω, Aleph Ω)↑, Aleph Ω (Aleph Ω, Aleph Ω)↑,Ω]↑,[Aleph Ω (Aleph Ω, Aleph Ω)↑, Aleph Ω (Aleph Ω, Aleph Ω)↑,Ω]↑}↑, {[Aleph Ω (Aleph Ω, Aleph Ω)↑, Aleph Ω (Aleph Ω, Aleph Ω)↑,Ω]↑,[Aleph Ω (Aleph Ω, Aleph Ω)↑, Aleph Ω (Aleph Ω, Aleph Ω)↑,Ω]↑}↑, {[Aleph Ω (Aleph Ω, Aleph Ω)↑, Aleph Ω (Aleph Ω, Aleph Ω)↑,Ω]↑,[Aleph Ω (Aleph Ω, Aleph Ω)↑, Aleph Ω (Aleph Ω, Aleph Ω)↑,Ω]↑}↑, {[Aleph Ω (Aleph Ω, Aleph Ω)↑, Aleph Ω (Aleph Ω, Aleph Ω)↑,Ω]↑,[Aleph Ω (Aleph Ω, Aleph Ω)↑, Aleph Ω (Aleph Ω, Aleph Ω)↑,Ω]↑}}↑, {hyper {[Aleph Ω (Aleph Ω, Aleph Ω)↑, Aleph Ω (Aleph Ω, Aleph Ω)↑,Ω]↑,[Aleph Ω (Aleph Ω, Aleph Ω)↑, Aleph Ω (Aleph Ω, Aleph Ω)↑,Ω]↑}↑, {[Aleph Ω (Aleph Ω, Aleph Ω)↑, Aleph Ω (Aleph Ω, Aleph Ω)↑,Ω]↑,[Aleph Ω (Aleph Ω, Aleph Ω)↑, Aleph Ω (Aleph Ω, Aleph Ω)↑,Ω]↑}↑, {[Aleph Ω (Aleph Ω, Aleph Ω)↑, Aleph Ω (Aleph Ω, Aleph Ω)↑,Ω]↑,[Aleph Ω (Aleph Ω, Aleph Ω)↑, Aleph Ω (Aleph Ω, Aleph Ω)↑,Ω]↑}↑, {[Aleph Ω (Aleph Ω, Aleph Ω)↑, Aleph Ω (Aleph Ω, Aleph Ω)↑,Ω]↑,[Aleph Ω (Aleph Ω, Aleph Ω)↑, Aleph Ω (Aleph Ω, Aleph Ω)↑,Ω]↑}}.

Now, we consider expansions of the above serial pattern a number of times equal to {hyper {[Aleph Ω (Aleph Ω, Aleph Ω)↑, Aleph Ω (Aleph Ω, Aleph Ω)↑,Ω]↑,[Aleph Ω (Aleph Ω, Aleph Ω)↑, Aleph Ω (Aleph Ω, Aleph Ω)↑,Ω]↑}↑, {[Aleph Ω (Aleph Ω, Aleph Ω)↑, Aleph Ω (Aleph Ω, Aleph Ω)↑,Ω]↑,[Aleph Ω (Aleph Ω, Aleph Ω)↑, Aleph Ω (Aleph Ω, Aleph Ω)↑,Ω]↑}↑, {[Aleph Ω (Aleph Ω, Aleph Ω)↑, Aleph Ω (Aleph Ω, Aleph Ω)↑,Ω]↑,[Aleph Ω (Aleph Ω, Aleph Ω)↑, Aleph Ω (Aleph Ω, Aleph Ω)↑,Ω]↑}↑, {[Aleph Ω (Aleph Ω, Aleph Ω)↑, Aleph Ω (Aleph Ω, Aleph Ω)↑,Ω]↑,[Aleph Ω (Aleph Ω, Aleph Ω)↑, Aleph Ω (Aleph Ω, Aleph Ω)↑,Ω]↑}}↑, {hyper {[Aleph Ω (Aleph Ω, Aleph Ω)↑, Aleph Ω (Aleph Ω, Aleph Ω)↑,Ω]↑,[Aleph Ω (Aleph Ω, Aleph Ω)↑, Aleph Ω (Aleph Ω, Aleph Ω)↑,Ω]↑}↑, {[Aleph Ω (Aleph Ω, Aleph Ω)↑, Aleph Ω (Aleph Ω, Aleph Ω)↑,Ω]↑,[Aleph Ω (Aleph Ω, Aleph Ω)↑, Aleph Ω (Aleph Ω, Aleph Ω)↑,Ω]↑}↑, {[Aleph Ω (Aleph Ω, Aleph Ω)↑, Aleph Ω (Aleph Ω, Aleph Ω)↑,Ω]↑,[Aleph Ω (Aleph Ω, Aleph Ω)↑, Aleph Ω (Aleph Ω, Aleph Ω)↑,Ω]↑}↑, {[Aleph Ω (Aleph Ω, Aleph Ω)↑, Aleph Ω (Aleph Ω, Aleph Ω)↑,Ω]↑,[Aleph Ω (Aleph Ω, Aleph Ω)↑, Aleph Ω (Aleph Ω, Aleph Ω)↑,Ω]↑}}

What an awesome number!

Now, consider spacecraft Lorentz factors of a mere huge Aleph 0. Such craft could travel Aleph 0 light-years in one year ship-time, an Aleph 0 number of years into the future in one year ship-time at an effective multiple of Aleph 0 of the speed of light.

Now, imagine a craft experiencing an Aleph 1 Lorentz factor after accelerating from a Lorentz factor of Aleph 0. The craft traveling at Lorentz factor of Aleph 1 may actually and really be traveling at [(Aleph 1)/(Aleph 0)] times the speed of light.

Now, imagine a craft accelerating from a Lorentz factor of Aleph 1 to a Lorentz factor of Aleph 2. Such a craft might really be traveling at a multiple [(Aleph 2)/(Aleph 0)] of the speed of light.

Now imagine a craft accelerating from a Lorentz factor of Aleph 2 to a Lorentz factor of Aleph 3. Such a craft might really be traveling at a multiple [(Aleph 3)/(Aleph 0)] of the speed of light.

Because cosmic evolution will so charge and mix-up the domain of space-time from where the craft originated, the super-luminal velocities of assertion might in all likelihood for the craft be the most true meaning of said super-luminal velocities because the notion of the associated distance of travel from the origin would be blended into non-existence. So, this leaves us with the only meaning left for said super-luminal travel.

Now, imagine a craft traveling at Lorentz factor of {hyper {[Aleph Ω (Aleph Ω, Aleph Ω)↑, Aleph Ω (Aleph Ω, Aleph Ω)↑,Ω]↑,[Aleph Ω (Aleph Ω, Aleph Ω)↑, Aleph Ω (Aleph Ω, Aleph Ω)↑,Ω]↑}↑, {[Aleph Ω (Aleph Ω, Aleph Ω)↑, Aleph Ω (Aleph Ω, Aleph Ω)↑,Ω]↑,[Aleph Ω (Aleph Ω, Aleph Ω)↑, Aleph Ω (Aleph Ω, Aleph Ω)↑,Ω]↑}↑, {[Aleph Ω (Aleph Ω, Aleph Ω)↑, Aleph Ω (Aleph Ω, Aleph Ω)↑,Ω]↑,[Aleph Ω (Aleph Ω, Aleph Ω)↑, Aleph Ω (Aleph Ω, Aleph Ω)↑,Ω]↑}↑, {[Aleph Ω (Aleph Ω, Aleph Ω)↑, Aleph Ω (Aleph Ω, Aleph Ω)↑,Ω]↑,[Aleph Ω (Aleph Ω, Aleph Ω)↑, Aleph Ω (Aleph Ω, Aleph Ω)↑,Ω]↑}}↑, {hyper {[Aleph Ω (Aleph Ω, Aleph Ω)↑, Aleph Ω (Aleph Ω, Aleph Ω)↑,Ω]↑,[Aleph Ω (Aleph Ω, Aleph Ω)↑, Aleph Ω (Aleph Ω, Aleph Ω)↑,Ω]↑}↑, {[Aleph Ω (Aleph Ω, Aleph Ω)↑, Aleph Ω (Aleph Ω, Aleph Ω)↑,Ω]↑,[Aleph Ω (Aleph Ω, Aleph Ω)↑, Aleph Ω (Aleph Ω, Aleph Ω)↑,Ω]↑}↑, {[Aleph Ω (Aleph Ω, Aleph Ω)↑, Aleph Ω (Aleph Ω, Aleph Ω)↑,Ω]↑,[Aleph Ω (Aleph Ω, Aleph Ω)↑, Aleph Ω (Aleph Ω, Aleph Ω)↑,Ω]↑}↑, {[Aleph Ω (Aleph Ω, Aleph Ω)↑, Aleph Ω (Aleph Ω, Aleph Ω)↑,Ω]↑,[Aleph Ω (Aleph Ω, Aleph Ω)↑, Aleph Ω (Aleph Ω, Aleph Ω)↑,Ω]↑}}

No one need be left behind. It is possible that a craft can be assembled so large such that it could contain the entire population of a cosmic light-cone radius portion of our universe which currently contains about one trillion or more galaxies and about 10 EXP 24 stars.

This is my portion of disclosure amidst the push for government transparency on what it knows about UFO’s.

More than likely, no extra-terrestrial civilization in our universe has yet to figure out how to travel at precisely light-speed in impulse travel. However, there is an account from an electrical engineering physicist regarding alleged space alien communication that the ETs typically accelerate their craft around stars until they build up velocities of around 0.9998 c or Lorentz factors of about 50.

Accordingly, the ETs have influenced the narrative of super-luminal travel capabilities so as to divert human interests from realistic and doable interstellar spaceflight. The ETs disinformation programs as such accordingly have directed humanity away from realistic near light-speed propulsion methods so that we are currently not a threat to them.

The good news is that I have reversed engineered the physics of the ETs stellar acceleration propulsion methods. I have verified the math and physics and proven such is possible. My next co-authored paper will present this technology without reference to the space alien versions.

Consider buying one or more copies of my first book, one of about close to 200 books I have written on starship propulsion.

Call Of The Cosmic Wild
Relativistic Rockets For The New Millennium
by James M. Essig
Paperback

This book explains how we can reach Lorentz factors as great as in the quadrillions. As such, the spacecraft could travel to the edge of our observable universe in ship-time scales on the order of seconds.

Product description...

HUMANITY’S COSMIC CALLING

This book includes a relatively easy mathematical and visionary treatment of the subject of interstellar travel. The methods of interstellar travel covered include mainly relativistic rockets. The subject of astrodynamic shielding and drag reduction at velocities close to the speed of light is also covered. This is the first book of several planned by the author on the subject of relativistic rockets.

Product details...

Paperback

Format: 8.25 x 11 Black & White Paperback , 431 pages
Publisher: Outskirts Press (Mar 28, 2013)
ISBN10: 1478711450
ISBN13: 9781478711452
Genre: TECHNOLOGY & ENGINEERING / Acoustics & Sound

Call Of The Cosmic Wild by James M. Essig, published by Outskirts Press This book includes a relatively easy mathematical and visionary treatment of the subject of interstellar travel. The methods of interstellar travel covered include mainly relativistic rockets. The subject of astrodynamic shielding and drag reduction at velocities close to the speed of light is also....

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