I think the notation here feels unintuitive. I don't think I'd guess what it means from reading it. 

perhaps: 1 day 80% [5,20], lifetime 80% [2.5, 40] though as I say in the other comment that just feels like a different confidence interval.

I like the idea of your proposal -- communicating how solidified one's credences are should be helpful for quickly communicating on new topics (although I could imagine that one has to be quite good at dealing with probabilities for this to actually provide extra information).

Regarding your particular proposal "CR [ <probability of change>, <min size of change>, <time spent on question> }" is unintuitive to me:

• In "80% CI [5,20]" the probability is denoted with %, while its "unit"-less in your notation
• In "80% CI [5,20]", the braces [] indicate an interval, while it is more of a tuple in your notation

A reformulation might be

80% CI [5,20] CR [0.1, 0.5, 1 day] --> 80% CI [5,20] $\times$10 % CR${}_{1\text{d}}$ [0.5}

Things I dislike about this proposal:

• The "CR${}_{1\text{d}}$" complicates notation. Possibly one could agree on a default time interval such as 1 day and only write the time range explicitly if it differs? Alternatively, "1 day CR" or "CR_1d" might be usable
• the "[0.5]" still feels unintuitive as notation and is still not an interval. Maybe there is a related theoretically-motivated quantity which could be used? Possibly something like the 'expected information gain' can be translated into its influence on the [5,20] intervals (with some reasonable assumptions on the distribution)? 
  • 80% CI [5,20] $\divideontimes$0.5 @ 10 % CR${}_{1\text{d}}$ might be an alternative, with the "\divideontimes" symbol being the $\pm$ of multiplication and hinting at the possible modification of the interval [5, 20]. For latex-free notation, "[5, 20] x0.5" might be a suitable simplified version.

Overall, I don't yet have a good intuition for how to think about expected information gain (especially if it is the expectation of someone else). 
Also, it would be nice if there was a theoretical argument that one of the given numbers is redundant -- getting an impression of what all the 6 numbers mean exactly would take me sufficiently long that it is probably better to just have the whole sentence

My 80% confidence interval is 5-20. I think there's 10% chance I'd change my upper or lower bound by more than 50% of the current value if I spent another ~day investigating this.

But this would of course be less of a problem with experience :)

I'm interested. 

In some way it's a lot like liquidity in a market. You are saying you'll buy $100 at 90% then $200 at 80% etc. Someone can't just come in and force you to bet $1m at 90%. You'd think they had more information than you.