I agree that the model as described would stand, yes.
I agree that the model would still stand in that case. However, with no safety margin, the slightest variation in column loads (such as might be caused by light breezes, or elevators moving up and down) would case cumulative plastic deformations of the columns. Eventually it would collapse from metal fatigue.
The springs below that element break first. Then a top-down progressive collapse would ensue.
Congratulations. After years of arguing from ignorance about this matter, you've finally hit on the right question. It's a bizarre question for any trained engineer to have to ask, but it's a good question in the sense that if you understand the answer, you'll understand why you've been wrong all this time.
The simple answer is that imparting kinetic energy creates dynamic loads, while adding potential energy (without exceeding the structure's capacity to bear) does not. But you've been told that many times before, and you don't seem to understand, or care about understanding, the difference.
It might help to think of it instead in terms of power. Power by definition is an amount of energy that's being converted (from some form to some other form) per unit time.
If power equals zero, it doesn't matter how much energy you have. You aren't doing anything to anything. Water behind a dam just sits there. A moving mass with nothing in its way just keeps going. To accelerate something, to break something, to heat something, to deform something, you need power. Energy being converted. When gravity can act on the water to get it moving, you have power. When the moving mass collides with something in its way, you have power. Energy being converted.
Adding potential energy to the top of a building that is able to statically handle the load does not generate power. Adding kinetic energy to (that is, accelerating) a significant part of a building does generate power, lots of power, because that kinetic energy is going to have to get converted and transferred rather quickly.
Failure at 0.5% compression is pretty rigid, which is why progressive collapse happens in your model even though you haven't specified a scale! (In effect, by specifying the ratios of strain to floor height for static conditions and for column failure, you've managed to invent a model that self-compensates for mass and height -- although finding materials with the specified properties for small heights or small masses might be difficult).
I agree that in experiment 1, the top springs might break first, but that would not prevent a complete progressive collapse from occurring since even dropping just one mass alone would be sufficient. In experiment 3, simultaneous crush-up and crush-down might occur at first but crush-down would predominate once a few floors were crushed.
BTW - how are you getting along with your 10 meters tall crush-down model?
Beware that it doesn't collapse on you during construction!
I've invited you to discuss my 10-meter model in the appropriate thread.
Respectfully,
Myriad
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