Apologies all for the delay in responding to this thread. The reference I found for the "logically possible worlds" definition of falsifiability was this one https://www.jstor.org/stable/pdf/687321.pdf?casa_token=pqL-ZTfdrUwAAAAA:8w6gGfAMqSueO1bQbf2p1pn_tu1SfSQxQM6u_SRNVdB1FSG-nXkrG43C14cbwunQnj5fwqsKGUZMZfL0igb2AKa-7yC2EIn5nBsFIFTByJ1pk6YUiu8 , from which I quote:
"Falsifiability in the strong sense demands that there be a refutation of the theory in every logically possible world in which the theory is empirically inadequate "
"When a theory Σ is said to be falsifiable what is usually meant is that there is a set of singular observation sentences which falsifies (i.e., is inconsistent with) Σ. Essentially this is the classical analysis given by Hempel and Popper. Semantically, it requires that in some observation structure there exists a set of observations which refutes Σ. In a much stronger sense we might say that Σ is falsifiable just in case in every observation structure not expandable to a model of Σ there exists a falsifying set of observations. Let us distinguish these two senses by calling the first the weak sense and the second the strong sense. The difference is this. The weak sense requires only that an empirical refutation of Σ be a logical possibility. The strong sense stipulates in addition that no matter how Σ is empirically inadequate it is susceptible to empirical refutation. For example, an observation sentence of the form 'VxFx' is strongly falsifiable, but the conjunction of 'VxFx' with another observation sentence of the form '3xGx' is only weakly falsifiable" [boldface my own]
The first quote justifies my usage of logically possible worlds (I used universes, as I felt it was a better choice at the time). Technically, however, their "strong definition" in the first quote doesn't exactly correspond to my own definition, where I required the existence of a logically possible world in which the a falsifying observation could occur. To see this discrepancy, note that if the set of logically possible worlds were the empty set, falsiability would trivially hold according to their "strong" definition but would fail according to my own definition. Nevertheless, on reading both the weak and strong definition put forward in the second quote I believe that my definition is actually consistent with their "weak" definition (see boldfaced text). One might quibble that they used "logical possibility" rather than "logically possible world" as I used, but on comparing the strong definition across the two quotes it looks as though the two terms are used interchangeably by the author.
Now aside from that, I've become reasonably convinced from certain posts in this thread that the 2nd law is falsifiable (in the sense of the study I linked as well as the more naive sense that several posters in this thread argued for). In particular, if atyy is correct in post #57 that there are already logically consistent physical theories that violate the 2nd law, then that would effectively answer the question. Grossgnlockner in post #54 appears to suggest otherwise - I would like to get to the bottom of that if possible. Does the derivation from probability assume some basic physics that is not present in the theories mentioned by atyy? Do the theories mentioned by atyy violate the basic laws of probability used in the derivation mentioned by Grossgnlockner?
Footnote:
As an aside (I left this as a footnote as I am not sure how well non peer reviewed sources will be taken here). There was a discussion on a similar topic on falsifiability here . They found better examples than my case of arithmetic (which was quite fairly critiqued in this thread). Specifically, is the statement that all squares have four sides falsifiable? I would argue not, and yet I can point to an observation which would falsify it (finding a square with 3 sides). The only way I can see to evade this problem is to add the condition that falsifying observations have to be logically possible in the definition of falsifiability! PS: if the moderators don't like my including this link, I'll be happy to remove it, but I thought some posters did a better job at framing the issue than I did.
