Imaginary numbers are inherently unobservable

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Variables with imaginary values are considered unobservable because they do not correspond to measurable quantities in nature, unlike real-numbered variables that represent observable phenomena such as position and momentum. Hermitian operators in quantum mechanics, which have real eigenvalues, are linked to observables due to their alignment with measurable quantities. The discussion highlights that real numbers, including irrational numbers, have tangible representations in the physical world, while complex numbers do not correspond to any physical displacement. This distinction underscores the inherent difference in the status of real versus complex numbers in scientific measurement. Ultimately, the conversation emphasizes that only real numbers are realized as quantities in nature.
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Maybe this should be in the philosophy of science/math forum, but i thought it fitted here. Why is it that variables taking imaginary values are inherently unobservable, whereas real numbered variables correspond to observables like position/momentum? As far as I can see there is no a priori reason why this should be the case.
 
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Thanks that's an interesting thread. Here is a more specific question to explain what i mean. Why is it that Hermitian operators in quantum mechanics (ones with real eigenvalues) correspond to observables. What is it about real numbers over complex ones that make them observable? I don't think this question was directly covered in that thread.
 
Well, ultimately everything boils down to measurements of position: whether it's where the pointer is pointing to, or which LEDs are lit etc. The Ancient Greeks discovered (much to their dismay) that irrational numbers are realized in nature (e.g. the right-angled triangle with the two smaller unit sides has a hypotenuse of irrational length).

And so it was known, that the set of real numbers were realized in nature. There is no displacement in our space that is modeled by a complex number: this is why they have a slightly different status.
 
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masudr said:
Well, ultimately everything boils down to measurements of position: whether it's where the pointer is pointing to, or which LEDs are lit etc. The Ancient Greeks discovered (much to their dismay) that irrational numbers are realized in nature (e.g. the right-angled triangle with the two smaller unit sides has a hypotenuse of irrational length).

And so it was known, that the set of real numbers were realized in nature. There is no displacement in our space that is modeled by a complex number: this is why they have a slightly different status.

thank you for saying here about what it was that i was trying to say in the other thread (that got so contentious). i would say it as "the set of numbers are realized quantities in nature are called "real numbers".
 

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