If you add +1 up from 0 and do -1 from w you never cross because those are part of separate archimedean fields. I think there is also a result that if you have surreals and add the limitation that they need to be archimedean you get the real numbers

Real number have the completeness axiom/property. While for lesser systems the limit fails to exist and thus it is missing a "completing piece" for surreals the limit is not unique. Between the ascending numbers and what would be the real limit there is quaranteed to be a surreal number, so in that sense they are "overcomplete" to follow the standard limit constructions. That is {series|}=U is always going to exist but so will {series|U}=V while for reals V is required to either equal U or equal one of the series.

Surreals are more rich than hyperreals. One could imagine a dart board where some areas scored 10 points, some lines scored 15 points and intersections of lines score 20 points. Treating anything that isn't area as having literally zero measure the disintions between lines being more probable than line intersections get lost (0=0). With surreals one could try to say that llines are infidesimal in respects to areas and intersection points are infinidesimal with respect to lines. And you could still hold that twice area is twice as likely and twice the line length is twice as likely and twice the amount of points is twice as likely. But areas, lines and points would seem to live in 3 disconnected lands. An abundance of points would not be able to make them reach line probability (unless you provide an actual infinite amount)

However if intersections scored infinite points in respect to lines then it could make expected value sense to aim for intersection points. But if we know that all points are not infinidesimal in respect of each other then we know that any intersection point aiming strategy is inferior.

I guess the connection here is that if you try to divide the dart board into small areas, they are still going to be areas and some mechanism might misvalue an area containing an intersection point that whole area is worth what the point is worth.

The primary first need for transfinite recursion is to go from the successor construction to the natural numbers existing. Going to an approach that assumes an infinite set rather than proves it seems handy but weaker. Althought I guess in reading surreal papers I take set theory as given and while it doesn't feel like any super advanced features are used there migth be a lot of assumption baggage.

It also feels llike a dirty trick that we don't need to postulate the existence of zero and that we get surreals from not knowing any surreals. Surreal number definition references sets of surreal numbers? Don't know any? Worry not there is the set that is of every type. And now that you have read the definition with that knowledge you know a new surreal number which enables you to read the definition again. So we get a lot of finite numbers without positing the existence of a single number and we don't even need to explicitly define a successor relation.

The base number construction only uses set formation and order and doesn't touch arithmetic operations, so on that level "the birthday" of mappings has yet to come so it is of limited use. I have seen formulations of surreal theory where it is written in a more axiomatic fashion but a "process" style gives a lto of ground to realise connections betweeen strctures.

Re Jeffrey-Bolker, the only system I studied in detail was Savage's, but my impression is that the fix I applied to that system can be applied all the others that paint themselves into the corner of bounded utility, and with the same effect of removing that restriction. Do the Jeffrey-Bolker axioms either assume or imply bounded utility?

are you sure Savage's axioms rule out the sorts of preferences I'm talking about? They don't rule out bounded utility functions, after all.

Savage's axioms imply that utility is bounded. This is what Savage did not know when he formulated them, but Peter Fishburn proved it, and Savage included the result in the second edition of his book. So Savage accidentally brute-forced the pathological games out of existence. All acts, in Savage's system, have a defined, finite expected value, and the St. Petersburg game and its variants do not exist. God himself cannot offer you these games. The utilities of the successive St. Peterburg payoffs are bounded, and cannot even increase linearly, although intuitively that version should have a well-defined, finite expected value.

In my approach, I proceed more cautiously by only considering "finite" acts at the outset: acts with only finitely many different consequences. Then I introduce acts with infinitely many consequences as limits of these, some of which have finite expected values and some infinite.