Oh man, Stephen Wolfram and Jürgen Schmidthuber are probably fuming at the fact that this is called a "new" mathematical framework. It's all very old, and quite conventional, even popular -- not exactly the road not taken.
What the author did was use the Physical Church-Turing thesis, and Kleene's second recursion theorem, to show that: (1) If a universe’s dynamics are computable (PCT), and (2) the universe can implement universal computation (RPCT), then (3) the universe can simulate itself, including the computer doing the simulating.
That's basically all. And thus "there would be two identical instances of us, both equally 'real'." (Two numerically distinct processes are empirically identical if they are indistinguishable. You might remember this sort of thing from late 20th c. philosophy coursework.)
He also uses Rice’s theorem (old) to show that there is no uniform measure over the set of "possible universes."
It's all very interesting, but it's more a review article than a "new mathematical framework." The notion of a mathematical/simulated universe is as old as Pythagoras (~550 BC), and Rice, Church-Turing, and Kleene are all approaching the 100-year mark.
I'm no mathematician, but doesn't this come up against Gödel's incompleteness theorem? My brain has that roughly as "If you have a system and a model of that system, but the model is also part of the same system, something something, impossible"
Isn't GIT you can have a statement that is valid in a system, but can't be proven this way or that given the systems' axioms? And this is true for all such axiom systems? In other words the axioms are an incomplete description of the system.
Maybe the problem is axiomative deduction, we need a new inference-ology?
Godel's incompleteness theorem is about the limits of proof / mathematical knowledge. Algebra is still useful and true, even though the proof shows it must be incomplete.
It’s also a little silly for the same reasons discussions of theoretical computability often are: time and space requirements. In practice the Universe, even if computable, is so complex that simulating it would require far more compute than physical particles and far more time than remaining until heat death.
Hehe yeah.. For me, its just inverted search for the God. There must be somethink behind it, if its not God, then it must be simulation! Kinda sad, I would expect more from scientist.
The big riddle of Universe is, how all that matter loves to organize itself, from basic particles to Atoms, basic molecues, structured molecues, things and finally live.. Probably unsolvable, but that doesnt mean we shouldnt research and ask questions...
Yes, is that (obvious) point being addressed in the paper? At first skimming, it just says that a "sufficiently souped up laptop" could, in principle, compute the future of the universe (i.e. Laplace's daemon), but I haven't seen anything about the subsequent questions of time scales.
The real universe might be different and far more complex than our simulated reality. Maybe a species that can freely move within 4 or 5 dimensions is simulating our 3D + uni directional time reality just like we „simulate“ reality with Sim City and Sims.
You're predicating on particles, heat death, etc as you understand it being applicable to any potential universe. Such rules are only known to apply in this universe.
A universe is simply a function, and a function can be called multiple times with the same/different arguments, and there can be different functions taking the same or different arguments.
The issue with that in terms of the simulation argument, is that the simulation argument doesn't require a complete simulation in either space or time.
> He also uses Rice’s theorem (old) to show that there is no uniform measure over the set of "possible universes."
I assume a finite uniform measure? Presumably |set| is a uniform measure over the set of "possible universes".
Anyway if I understood that correctly, than this is not that surprising? There isn't a finite uniform measure over the real line. If you only consider the possible universes of two particles at any distance from eachother, this models the real line and therefore has no finite uniform measure.
Okay, here's the thing: this is creating revenue, this is fascinating literature for a huge class of armchair scientists that want to believe, want to play with these mental toys, and are willing to pay for the ability to fantasize with ideas they are incapable of developing on their own. This is ordinary capitalism, spinning revenues out of sellable stories.
The simulation hypothesis takes something reasonable, that reality is "virtual," and runs it into absurdity.
If the universe isn't "real" in the materialist sense, that does not imply that there's a "real" universe outside of the one we perceive, nor does it imply that we're being "simulated" by other intelligences.
The path of minimal assumptions from reality not being "real" is idealism. We're not simulated, we're manifesting.
Exactly, it's paradoxical; how would you define the universe as a simulation, without being on the same substrate! The title should have focused more on the computability of the universe, as we know it.
I think the underlying assumption is that we are “real”, meaning our existence is grounded in some undisputed “reality”. So if what we perceive as the universe isn’t real, then there has to be some other real universe that is simulating it in some way.
Sorry, I don't understand what you are saying. What do you mean by "something reasonable, that reality is virtual"? In many ways, by definition, reality is what is real not virtual. I have other questions, but this is a good start :)
When I say that reality isn't "real" (which is awkward for sure) what I'm referring to is that we have a perception of space and time which is absolute and inviolable, when it's likely space and time (as we understand them) are artifacts of our perceptual lens, and "reality" is based on something more akin to consensus than immutable laws. From this perspective you could view physics more as a communication/consistency protocol for consciousness than the raw nature of the universe.
Yep, might as well go straight to the Mathematical Universe Hypothesis:
> Tegmark's MUH is the hypothesis that our external physical reality is a mathematical structure. That is, the physical universe is not merely described by mathematics, but is mathematics — specifically, a mathematical structure. Mathematical existence equals physical existence, and all structures that exist mathematically exist physically as well. Observers, including humans, are "self-aware substructures (SASs)". In any mathematical structure complex enough to contain such substructures, they "will subjectively perceive themselves as existing in a physically 'real' world".
Konrad Zuse was a German pioneer in computing, best known for building the Z3 in 1941—the world's first functional programmable digital computer. Later in his career, he explored profound philosophical and theoretical ideas about the nature of the universe.
Rechnender Raum (literally "Computing Space" or "Calculating Space") is the title of his groundbreaking 1969 book (published in the series Schriften zur Datenverarbeitung). In it, Zuse proposed that the entire universe operates as a vast discrete computational process, akin to a giant cellular automaton. He argued that physical laws and reality itself emerge from digital, step-by-step computations on a grid of discrete "cells" in space, rather than from continuous analog processes as traditionally assumed in physics.
This idea challenged the prevailing view of continuous physical laws and laid the foundation for what we now call digital physics, pancomputationalism, or the simulation hypothesis (the notion that reality might be a computation, possibly running on some underlying "computer"). Zuse's work is widely regarded as the first formal proposal of digital physics, predating similar ideas by others like Edward Fredkin or Stephen Wolfram.
I always feel like these frameworks rely on a semantic sleight of hand that sounds plausible on the surface, but when you drill down a bit they render words like 'simulation' 'reality' or 'truth' as either unintelligible or trite, depending on how you define them.
They're defined relative to the axioms. In this case he is using the standard arithmetic & set theoretic constructions to define the terms & functions he's talking about. It's logically sound, whether it makes physical sense or not is another matter.
The problem of computers is the problem of time : How to obtain a consistent causal chain !
The classical naive way of obtaining a consistent causal chain, is to put the links one after the other following the order defined by the simulation time.
The funnier question is : can it be done another way ? With the advance of generative AI, and things like diffusion model it's proven that it's possible theoretically (universal distribution approximation). It's not so much simulating a timeline, but more sampling the whole timeline while enforcing its physics-law self-consistency from both directions of the causal graph.
In toy models like game of life, we can even have recursivity of simulation : https://news.ycombinator.com/item?id=33978978 unlike section 7.3 of this paper where the computers of the lower simulations are started in ordered-time
In other toy model you can diffusion-model learn and map the chaotic distribution of all possible three-body problem trajectories.
Although sampling can be simulated, the efficient way of doing it necessitate to explore all the possible universes simultaneously like in QM (which we can do by only exploring a finite number of them while bounding the neighbor universe region according to the question we are trying to answer using the Lipschitz continuity property).
Sampling allows you to bound maximal computational usage and be sure to reach your end-time target, but at the risk of not being perfectly physically consistent. Whereas simulating present the risk of the lower simulations siphoning the computational resources and preventing the simulation time to reach its end-time target, but what you could compute is guaranteed consistent.
Sampled bottled universe are ideal for answering question like how many years must a universe have before life can emerge, while simulated bottled universe are like a box of chocolate, you never know what you are going to get.
The question being can you tell which bottle you are currently in, and which bottle would you rather get.
The whole “simulation hypothesis” thing has always irked me. To me, the question of whether our universe was [“intentionally” “created” by some other “being(s)”] vs [“naturally” happened] is meaningless. Whatever it was on the other side is way too insanely unfathomable to be classified into those 2 human-created ideas. Ugh the whole thing is so self-centered.
It appeals to sophomoric modern atheists who can't comprehend that infinity and nothing exists at the same time. People seek a reason "why" not realizing the question is the answer. The universe exists because 'why not?' because Infinity seeks to prevail over nothing. Nothing strikes at the heel of infinity. The truth is not in these lines or that theory but betwixt here and there and once "you" realize it, it realizes "you." Because it is you and you are it for it is itself. This may sound like my mumbo jumbo woo but once you know it knows you know it knows you know.
“ Wolpert shows that this isn’t required by the mathematics: simulations do not have to degrade, and infinite chains of simulated universes remain fully consistent within the theory.”
How is this consistent with the second law of thermodynamics? If there is one universe containing an infinite number of simulations (some of which simulate the base universe) wouldn’t there be a limit to how much computation could be contained? By its very nature a chain of simulations would grow exponentially with time, rapidly accelerating heat death. That may not require the simulations to degrade but it puts a hard limit on how many could be created.
Standard theory of computation is not concerned about entropy or physical realizability. It's just arithmetic & lookup tables defined w/ set theoretic axioms.
Trying to read the paper... I guess if you ignore the difference between finite and infinite tape Turing machine, and if all physical constraints are outside the scope of the paper, then it is easy to prove the universe can simulate itself.
Hope folks involved in this type of exploration have it clear in mind that what they are reasoning about it’s strictly the model of the real world only. It’s far from obvious that nature follows anything remotely computational.
> The simulation hypothesis — the idea that our universe might be an artificial construct running on some advanced alien computer — has long captured the public imagination.
Right; that's the feeble public imagination. What captures my imagination is the idea that the existence of the rules alone is enough to obtain the universe; no simulator is required.
We can make an analogy to a constant like pi. No division has to take place of a circumference by a diameter in order to prop up the existence of pi.
The requirement for a simulator just punts the rock down the road: in what universe is that simulator, and what simulates that? It's an infinite regress. If there is no simulator, that goes away.
If certain equations dictate that you exist and have experiences, then you exist and have experiences in the same way that pi exists.
Here is one thing I don't understand about these kind of approaches. Doesn't a computational simulation imply that time is discrete? If so, doesn't this have consequences for our currently best physical theories? I understand that the discreteness of time would be far below what can be measured right now but AFAIK it would still makes a difference for physical theories whether time is discrete or not. Or am I mistaken about that? There are similar concerns about space.
By the way, on a related note, I once stumbled across a paper that argued that if real numbers where physically realizable in some finite space, then that would violate the laws of thermodynamics. It sounded convincing but I also lacked the physical knowledge to evaluate that thesis.
Time and space aren't well defined, but current models indeed put a discrete limit on both: Planck-Length and Planck-Time (~1.9×10^−43s and ~5.7×10^−35m respectively).
Below these limits, physical descriptions of the world lose meaning, i.e. shorter time spans or distances don't result in measurable changes and our models break down. That doesn't mean these limits are "real" in the sense that space and time are indeed quantised, but experiments and observations end at these limits.
These models get things backwards. The universe is a wave function in logic space. It appears discrete and quantized because integers composed of primes are logically stable information entropy minimal nodes. In other words the universe is the way it is because it depends on math. Math does not depend on the universe. Logic is its own "simulation." Math does not illuminate physics, rather physics illuminates math. This can be shown by the construction of a filter that cleanly sorts prime numbers from composites without trial division but by analysis of the entropic harmonics of integers. In other words what we consider integers are not fundamental but rather emergent properties of the minimal subjunctive of superposition of zero (non existence) and infinity (anything that is possible). By ringing an integer like a bell according to the template provided by the zeta function we can find primes and factor from spectral analysis without division. Just as integers emerge from the wave as stable nodes so do quanta in the physical isomorphism. In other words both integers and quanta are emergent from the underlying wave that is information in tension between the polarity of nonexistence and existence. So what appears discrete or simulated is actually an emergent phenomenon of the subjunctive potential of information constrained by the two poles of possibility.
We can prove that the "defects" we see emerge naturally from the entropic optimization of information subject to the superposition of being and not being. Between nothing and everything the universe exists in an entropic gradient.
Simulating a/the universe, and simulating the universe at-or-above realtime are also two separate things.
A non-realtime simulation would allow you certain solutions (such as perfectly recreating a past state of the current universe), but might not allow you to practically see a future state.
"Example 1. ... After this you physically isolate isolate your laptop, from the rest of the Universe, and start running it..."
However there is no way "you can physically isolate isolate your laptop, from the rest of the Universe" so doesn't that refute this example (at least?)
It's starting with the assumption that the simulation would reproduce the universe perfectly; this eliminates a lot of possibilities.
Many would expect that the parent universe would be more sophisticated, potentially with more dimensions, that we can only glimpse through artifacts of the simulation.
I've always wondered how you'd be able to rigorously distinguish breaking out of the simulation from just discovering novel things about your current universe.
Is a black hole a bug or a feature? If you find a way to instantly observe or manipulate things at Alpha Centauri by patterning memory in a computer on Earth a special way, is that an exploit or is it just a new law of nature?
Science is a descriptive endeavor.
I guess that some extreme cases would be obvious - if a god-admin shows up and says "cut that out or we'll shut your universe down", that's a better indication of simulation than the examples I gave. But even so, it could be a power bluff, someone pretending to be a god. Or it could be comparable to aliens visiting Earth rather than gods revealing themselves - i.e. some entity of a larger system visiting another entity of the same system, not someone outside it poking inside.
Also that Universe could use entities similar to hard and soft links (quantum entanglement), memory deduplication and so on.
How many people did we met in the world with similar face appearances and even personalities, almost like you are finding copycats everywhere? Also, it happens as if some kind of face/shape would just have a single personality with minimal differences spread over thousands of lookalikes...
I wonder if there’s a concept akin to Shannon Entropy that dictates the level of detail a simulation can provide given a ratio of bits to something. Although presumably any level of bits could be simulated given more time.
An explanation of the observer effect may be that the universe is lazily evaluated at the moment of observation. Outside of that experienced reality, it might as well be all a cloud of latent possibilities, rough outlines and low-res details, enough for a plausible simulation.
A universe is a function. It only makes sense that a function can call other functions, including itself, ad infinitum. And a function may be called in the same or a different thread.
Once again, discussion around the simulation hypothesis that for some reason assumes the simulating universe has the exact same laws of physics / reality as the simulated universe. Assuming that the simulated universe can use their mathematics to describe/constrain the simulator universe. It makes no sense to me.
Funny people still call that "simulation hypothesis". At some point they should try to do some Past lives regressions or Out of body experience (astral projection). Then they'll know for sure what this reality is about.
I would consider this if someone was able to demonstrate a way to distinguish these phenomena from altered states of mind (i.e. hallucinations). We know and can demonstrate that the human psyche can easily be manipulated in various ways (psychological manipulation, drugs, magnetic fields, sleep depravation, stress, etc.) to cause such experiences.
Some actual evidence for for "past life regressions" and "astral projection" would be nice...
PLR is real, read the works of Michael newton and others. Over 8000 PRL from people of all kind of age and background describe the same things happening once we pass on the other side.
Definitely not hallucinations. Actually scary how people still think that instead of exploring for themselves.
Arxiv.org PDF:
https://arxiv.org/pdf/2404.16050
Oh man, Stephen Wolfram and Jürgen Schmidthuber are probably fuming at the fact that this is called a "new" mathematical framework. It's all very old, and quite conventional, even popular -- not exactly the road not taken.
What the author did was use the Physical Church-Turing thesis, and Kleene's second recursion theorem, to show that: (1) If a universe’s dynamics are computable (PCT), and (2) the universe can implement universal computation (RPCT), then (3) the universe can simulate itself, including the computer doing the simulating.
That's basically all. And thus "there would be two identical instances of us, both equally 'real'." (Two numerically distinct processes are empirically identical if they are indistinguishable. You might remember this sort of thing from late 20th c. philosophy coursework.)
He also uses Rice’s theorem (old) to show that there is no uniform measure over the set of "possible universes."
It's all very interesting, but it's more a review article than a "new mathematical framework." The notion of a mathematical/simulated universe is as old as Pythagoras (~550 BC), and Rice, Church-Turing, and Kleene are all approaching the 100-year mark.
I'm no mathematician, but doesn't this come up against Gödel's incompleteness theorem? My brain has that roughly as "If you have a system and a model of that system, but the model is also part of the same system, something something, impossible"
Isn't GIT you can have a statement that is valid in a system, but can't be proven this way or that given the systems' axioms? And this is true for all such axiom systems? In other words the axioms are an incomplete description of the system.
Maybe the problem is axiomative deduction, we need a new inference-ology?
No, this sort of self-reflection is exactly what makes Gödel/Turing/etc impossibility results work ("strange loops" and all that).
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Godel's incompleteness theorem is about the limits of proof / mathematical knowledge. Algebra is still useful and true, even though the proof shows it must be incomplete.
Any decent Lisp can reimplement eval, apply and the rest of functions/atom within itself.
It’s also a little silly for the same reasons discussions of theoretical computability often are: time and space requirements. In practice the Universe, even if computable, is so complex that simulating it would require far more compute than physical particles and far more time than remaining until heat death.
Hehe yeah.. For me, its just inverted search for the God. There must be somethink behind it, if its not God, then it must be simulation! Kinda sad, I would expect more from scientist.
The big riddle of Universe is, how all that matter loves to organize itself, from basic particles to Atoms, basic molecues, structured molecues, things and finally live.. Probably unsolvable, but that doesnt mean we shouldnt research and ask questions...
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Yes, is that (obvious) point being addressed in the paper? At first skimming, it just says that a "sufficiently souped up laptop" could, in principle, compute the future of the universe (i.e. Laplace's daemon), but I haven't seen anything about the subsequent questions of time scales.
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The real universe might be different and far more complex than our simulated reality. Maybe a species that can freely move within 4 or 5 dimensions is simulating our 3D + uni directional time reality just like we „simulate“ reality with Sim City and Sims.
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You're predicating on particles, heat death, etc as you understand it being applicable to any potential universe. Such rules are only known to apply in this universe.
A universe is simply a function, and a function can be called multiple times with the same/different arguments, and there can be different functions taking the same or different arguments.
The issue with that in terms of the simulation argument, is that the simulation argument doesn't require a complete simulation in either space or time.
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Thanks for this great comment!
> He also uses Rice’s theorem (old) to show that there is no uniform measure over the set of "possible universes."
I assume a finite uniform measure? Presumably |set| is a uniform measure over the set of "possible universes".
Anyway if I understood that correctly, than this is not that surprising? There isn't a finite uniform measure over the real line. If you only consider the possible universes of two particles at any distance from eachother, this models the real line and therefore has no finite uniform measure.
Okay, here's the thing: this is creating revenue, this is fascinating literature for a huge class of armchair scientists that want to believe, want to play with these mental toys, and are willing to pay for the ability to fantasize with ideas they are incapable of developing on their own. This is ordinary capitalism, spinning revenues out of sellable stories.
The simulation hypothesis takes something reasonable, that reality is "virtual," and runs it into absurdity.
If the universe isn't "real" in the materialist sense, that does not imply that there's a "real" universe outside of the one we perceive, nor does it imply that we're being "simulated" by other intelligences.
The path of minimal assumptions from reality not being "real" is idealism. We're not simulated, we're manifesting.
Exactly, it's paradoxical; how would you define the universe as a simulation, without being on the same substrate! The title should have focused more on the computability of the universe, as we know it.
I think the underlying assumption is that we are “real”, meaning our existence is grounded in some undisputed “reality”. So if what we perceive as the universe isn’t real, then there has to be some other real universe that is simulating it in some way.
Sorry, I don't understand what you are saying. What do you mean by "something reasonable, that reality is virtual"? In many ways, by definition, reality is what is real not virtual. I have other questions, but this is a good start :)
When I say that reality isn't "real" (which is awkward for sure) what I'm referring to is that we have a perception of space and time which is absolute and inviolable, when it's likely space and time (as we understand them) are artifacts of our perceptual lens, and "reality" is based on something more akin to consensus than immutable laws. From this perspective you could view physics more as a communication/consistency protocol for consciousness than the raw nature of the universe.
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Yep, might as well go straight to the Mathematical Universe Hypothesis:
> Tegmark's MUH is the hypothesis that our external physical reality is a mathematical structure. That is, the physical universe is not merely described by mathematics, but is mathematics — specifically, a mathematical structure. Mathematical existence equals physical existence, and all structures that exist mathematically exist physically as well. Observers, including humans, are "self-aware substructures (SASs)". In any mathematical structure complex enough to contain such substructures, they "will subjectively perceive themselves as existing in a physically 'real' world".
https://en.wikipedia.org/wiki/Mathematical_universe_hypothes...
Konrad Zuse was a German pioneer in computing, best known for building the Z3 in 1941—the world's first functional programmable digital computer. Later in his career, he explored profound philosophical and theoretical ideas about the nature of the universe. Rechnender Raum (literally "Computing Space" or "Calculating Space") is the title of his groundbreaking 1969 book (published in the series Schriften zur Datenverarbeitung). In it, Zuse proposed that the entire universe operates as a vast discrete computational process, akin to a giant cellular automaton. He argued that physical laws and reality itself emerge from digital, step-by-step computations on a grid of discrete "cells" in space, rather than from continuous analog processes as traditionally assumed in physics. This idea challenged the prevailing view of continuous physical laws and laid the foundation for what we now call digital physics, pancomputationalism, or the simulation hypothesis (the notion that reality might be a computation, possibly running on some underlying "computer"). Zuse's work is widely regarded as the first formal proposal of digital physics, predating similar ideas by others like Edward Fredkin or Stephen Wolfram.
I always feel like these frameworks rely on a semantic sleight of hand that sounds plausible on the surface, but when you drill down a bit they render words like 'simulation' 'reality' or 'truth' as either unintelligible or trite, depending on how you define them.
They're defined relative to the axioms. In this case he is using the standard arithmetic & set theoretic constructions to define the terms & functions he's talking about. It's logically sound, whether it makes physical sense or not is another matter.
The problem of computers is the problem of time : How to obtain a consistent causal chain !
The classical naive way of obtaining a consistent causal chain, is to put the links one after the other following the order defined by the simulation time.
The funnier question is : can it be done another way ? With the advance of generative AI, and things like diffusion model it's proven that it's possible theoretically (universal distribution approximation). It's not so much simulating a timeline, but more sampling the whole timeline while enforcing its physics-law self-consistency from both directions of the causal graph.
In toy models like game of life, we can even have recursivity of simulation : https://news.ycombinator.com/item?id=33978978 unlike section 7.3 of this paper where the computers of the lower simulations are started in ordered-time
In other toy model you can diffusion-model learn and map the chaotic distribution of all possible three-body problem trajectories.
Although sampling can be simulated, the efficient way of doing it necessitate to explore all the possible universes simultaneously like in QM (which we can do by only exploring a finite number of them while bounding the neighbor universe region according to the question we are trying to answer using the Lipschitz continuity property).
Sampling allows you to bound maximal computational usage and be sure to reach your end-time target, but at the risk of not being perfectly physically consistent. Whereas simulating present the risk of the lower simulations siphoning the computational resources and preventing the simulation time to reach its end-time target, but what you could compute is guaranteed consistent.
Sampled bottled universe are ideal for answering question like how many years must a universe have before life can emerge, while simulated bottled universe are like a box of chocolate, you never know what you are going to get.
The question being can you tell which bottle you are currently in, and which bottle would you rather get.
Causality also is not a universal thing. Some things just coexist and obey to some laws.
Does the potential cause current? No, they coexist.
I’m not sure Einstein would allow your concept of “simulation time”. Events are only partially ordered.
The whole “simulation hypothesis” thing has always irked me. To me, the question of whether our universe was [“intentionally” “created” by some other “being(s)”] vs [“naturally” happened] is meaningless. Whatever it was on the other side is way too insanely unfathomable to be classified into those 2 human-created ideas. Ugh the whole thing is so self-centered.
It appeals to sophomoric modern atheists who can't comprehend that infinity and nothing exists at the same time. People seek a reason "why" not realizing the question is the answer. The universe exists because 'why not?' because Infinity seeks to prevail over nothing. Nothing strikes at the heel of infinity. The truth is not in these lines or that theory but betwixt here and there and once "you" realize it, it realizes "you." Because it is you and you are it for it is itself. This may sound like my mumbo jumbo woo but once you know it knows you know it knows you know.
yes haha, it is mumbo jumbo to the uninitiated (which can mean many different things!)
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The author of the article on the site, is the author of the paper!
Which of him is simulating which?
Department of Research Simulation
“ Wolpert shows that this isn’t required by the mathematics: simulations do not have to degrade, and infinite chains of simulated universes remain fully consistent within the theory.”
How is this consistent with the second law of thermodynamics? If there is one universe containing an infinite number of simulations (some of which simulate the base universe) wouldn’t there be a limit to how much computation could be contained? By its very nature a chain of simulations would grow exponentially with time, rapidly accelerating heat death. That may not require the simulations to degrade but it puts a hard limit on how many could be created.
Standard theory of computation is not concerned about entropy or physical realizability. It's just arithmetic & lookup tables defined w/ set theoretic axioms.
Trying to read the paper... I guess if you ignore the difference between finite and infinite tape Turing machine, and if all physical constraints are outside the scope of the paper, then it is easy to prove the universe can simulate itself.
Hope folks involved in this type of exploration have it clear in mind that what they are reasoning about it’s strictly the model of the real world only. It’s far from obvious that nature follows anything remotely computational.
> The simulation hypothesis — the idea that our universe might be an artificial construct running on some advanced alien computer — has long captured the public imagination.
Right; that's the feeble public imagination. What captures my imagination is the idea that the existence of the rules alone is enough to obtain the universe; no simulator is required.
We can make an analogy to a constant like pi. No division has to take place of a circumference by a diameter in order to prop up the existence of pi.
The requirement for a simulator just punts the rock down the road: in what universe is that simulator, and what simulates that? It's an infinite regress. If there is no simulator, that goes away.
If certain equations dictate that you exist and have experiences, then you exist and have experiences in the same way that pi exists.
Here is one thing I don't understand about these kind of approaches. Doesn't a computational simulation imply that time is discrete? If so, doesn't this have consequences for our currently best physical theories? I understand that the discreteness of time would be far below what can be measured right now but AFAIK it would still makes a difference for physical theories whether time is discrete or not. Or am I mistaken about that? There are similar concerns about space.
By the way, on a related note, I once stumbled across a paper that argued that if real numbers where physically realizable in some finite space, then that would violate the laws of thermodynamics. It sounded convincing but I also lacked the physical knowledge to evaluate that thesis.
Time and space aren't well defined, but current models indeed put a discrete limit on both: Planck-Length and Planck-Time (~1.9×10^−43s and ~5.7×10^−35m respectively).
Below these limits, physical descriptions of the world lose meaning, i.e. shorter time spans or distances don't result in measurable changes and our models break down. That doesn't mean these limits are "real" in the sense that space and time are indeed quantised, but experiments and observations end at these limits.
This all assumes there's no computation beyond a Turing machine, right? Therefore, this assumes reality is a simulation on a finite set of rationals?
So, as long as one believes in continuum, this is just toying around?
We've yet to propose an experiment that demonstrates the inadequacy of IEEE floats if used carefully. The simulation only needs to be good enough.
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These models get things backwards. The universe is a wave function in logic space. It appears discrete and quantized because integers composed of primes are logically stable information entropy minimal nodes. In other words the universe is the way it is because it depends on math. Math does not depend on the universe. Logic is its own "simulation." Math does not illuminate physics, rather physics illuminates math. This can be shown by the construction of a filter that cleanly sorts prime numbers from composites without trial division but by analysis of the entropic harmonics of integers. In other words what we consider integers are not fundamental but rather emergent properties of the minimal subjunctive of superposition of zero (non existence) and infinity (anything that is possible). By ringing an integer like a bell according to the template provided by the zeta function we can find primes and factor from spectral analysis without division. Just as integers emerge from the wave as stable nodes so do quanta in the physical isomorphism. In other words both integers and quanta are emergent from the underlying wave that is information in tension between the polarity of nonexistence and existence. So what appears discrete or simulated is actually an emergent phenomenon of the subjunctive potential of information constrained by the two poles of possibility.
Think the leakage is if the simulation were a manufactured emulation, like humans trying to mirror natural laws through technology.
An emergent simulation, nature borne out of nature, may not have those same defects.
We can prove that the "defects" we see emerge naturally from the entropic optimization of information subject to the superposition of being and not being. Between nothing and everything the universe exists in an entropic gradient.
Simulating a/the universe, and simulating the universe at-or-above realtime are also two separate things.
A non-realtime simulation would allow you certain solutions (such as perfectly recreating a past state of the current universe), but might not allow you to practically see a future state.
"Example 1. ... After this you physically isolate isolate your laptop, from the rest of the Universe, and start running it..."
However there is no way "you can physically isolate isolate your laptop, from the rest of the Universe" so doesn't that refute this example (at least?)
Like running Kubernetes in a Docker container.
It's starting with the assumption that the simulation would reproduce the universe perfectly; this eliminates a lot of possibilities.
Many would expect that the parent universe would be more sophisticated, potentially with more dimensions, that we can only glimpse through artifacts of the simulation.
I've always wondered how you'd be able to rigorously distinguish breaking out of the simulation from just discovering novel things about your current universe.
Is a black hole a bug or a feature? If you find a way to instantly observe or manipulate things at Alpha Centauri by patterning memory in a computer on Earth a special way, is that an exploit or is it just a new law of nature?
Science is a descriptive endeavor.
I guess that some extreme cases would be obvious - if a god-admin shows up and says "cut that out or we'll shut your universe down", that's a better indication of simulation than the examples I gave. But even so, it could be a power bluff, someone pretending to be a god. Or it could be comparable to aliens visiting Earth rather than gods revealing themselves - i.e. some entity of a larger system visiting another entity of the same system, not someone outside it poking inside.
Also that Universe could use entities similar to hard and soft links (quantum entanglement), memory deduplication and so on.
How many people did we met in the world with similar face appearances and even personalities, almost like you are finding copycats everywhere? Also, it happens as if some kind of face/shape would just have a single personality with minimal differences spread over thousands of lookalikes...
I Don't Know, Timmy, Being God Is a Big Responsibility https://qntm.org/responsibilit
I wonder if there’s a concept akin to Shannon Entropy that dictates the level of detail a simulation can provide given a ratio of bits to something. Although presumably any level of bits could be simulated given more time.
An explanation of the observer effect may be that the universe is lazily evaluated at the moment of observation. Outside of that experienced reality, it might as well be all a cloud of latent possibilities, rough outlines and low-res details, enough for a plausible simulation.
This would allow for a dds attack on reality where a bunch of simulants attempt to perform computationally expensive observations at the same time.
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A universe is a function. It only makes sense that a function can call other functions, including itself, ad infinitum. And a function may be called in the same or a different thread.
Related?
> Consequences of Undecidability in Physics on the Theory of Everything
https://news.ycombinator.com/item?id=45770754
Zero cost abstractions! I'd almost be interested in Bostrom's inevitable physics-based counter (if he wasn't such a racist bellend).
Yeah right. In infinite Turing machines maybe. If it’s finite, it’s impossible to simulate something larger with the same fidelity
Once again, discussion around the simulation hypothesis that for some reason assumes the simulating universe has the exact same laws of physics / reality as the simulated universe. Assuming that the simulated universe can use their mathematics to describe/constrain the simulator universe. It makes no sense to me.
Someone did another 'Kleene-Turing' on the whole issue with "the origin"?
bad bad not good.
We can't even run docker inside docker without making things slower, the simulator hypotheses is frankly ridiculous
You would be living inside docker and wouldn’t know how fast the outside is. Maybe lightspeed is a limit inflicted by the simulation.
That's what a simulated universe running inside Docker would say.
Nah, it runs on podman…
Nobody is going to pay all those docker licenses /s
Funny people still call that "simulation hypothesis". At some point they should try to do some Past lives regressions or Out of body experience (astral projection). Then they'll know for sure what this reality is about.
I would consider this if someone was able to demonstrate a way to distinguish these phenomena from altered states of mind (i.e. hallucinations). We know and can demonstrate that the human psyche can easily be manipulated in various ways (psychological manipulation, drugs, magnetic fields, sleep depravation, stress, etc.) to cause such experiences.
Some actual evidence for for "past life regressions" and "astral projection" would be nice...
PLR is real, read the works of Michael newton and others. Over 8000 PRL from people of all kind of age and background describe the same things happening once we pass on the other side. Definitely not hallucinations. Actually scary how people still think that instead of exploring for themselves.
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Yeah, from what I heard, that's how scientology recruits true believers.