This throws the baby out with the bathwater; we can falsify and verify to degrees. Refusing the terms verify and falsify because we are not able to assign infinite credence seems like a mistake.
I agree; that’s why “strictly.” But you seem to miss the point, which is that falsification and verification are perfectly symmetric: whether you call the glass half empty or half full on either side of the equation wasn’t my concern.
Two basic criticisms apply to Popperian falsificationism: 1) it ignores verification (although the “verisimilitude” doctrine tries to overcome this limitation); and 2) it does assign infinite credence to falsification.
No. 2 doesn’t comport with the principles of Bayesian inference, but seems part of LW Bayesianism (your term):
This allowance of a unitary probability assignment to evidence conditional on a theory is a distortion of Bayesian inference. The distortion introduces an artificial asymmetry into the Bayesian handling of verification versus falsification. It is irrational to pretend—even conditionally—to absolute certainty about an empirical prediction.
I agree; that’s why “strictly.” But you seem to miss the point, which is that falsification and verification are perfectly symmetric: whether you call the glass half empty or half full on either side of the equation wasn’t my concern.
Two basic criticisms apply to Popperian falsificationism: 1) it ignores verification (although the “verisimilitude” doctrine tries to overcome this limitation); and 2) it does assign infinite credence to falsification.
No. 2 doesn’t comport with the principles of Bayesian inference, but seems part of LW Bayesianism (your term):
This allowance of a unitary probability assignment to evidence conditional on a theory is a distortion of Bayesian inference. The distortion introduces an artificial asymmetry into the Bayesian handling of verification versus falsification. It is irrational to pretend—even conditionally—to absolute certainty about an empirical prediction.