#1




Improving the Absroption Formula
In this thread, I'll try to come up with ways to improve the current formula. I believe the problems we're now discovering with the formula are the reason for people experiencing imbalance at higher levels.
For an absorption formula, we want the following things:  Different armors should absorb roughly set proportions. Off the top of my head, cloth armor should absorb around 1020%, leather 3040%, mail 50% and plate 6070%.  There should be a cutoff (as there is now) at some percentage so that 100% is impossible. That would make for a boring game and impossible monsters.  Diminishing returns is probably desirable so that we don't just bump into the cutoff. However, we also need stronger effects at higher levels to counter increasing damage by the monsters. (It's possible that something like a cubic formula, which starts slowly, then gets sharper, and then tapers off, would be better.)  We want to feel the difference between armors and minimize the feel of diminishing returns. Meet the current formula: Absorb % = armor / (armor + (attacker level * 25) + 50) This function shows that the absorption percentage depends on both the attacker level and your current armor. If you stay at the same armor level while the attacker level goes up, your % absorption will go down and you'll get hurt But if we substitute values for attacker level = 1 into the function, we'll see that it simplifies to the following function: y = x / (x + 75) where y = % absorption and x = armor. This function behaves quite nicely, since it tapers off to 1.0 (100%). This is convenient since 100% is our maximum absorption (though the game limits absorption to 75%). It also rises pretty slowly, which equates to diminishing returns. You can see what it looks like in the picture (current_func.jpg). Notice that the function has a faster, almost linear pace up to around 75 (trust me, that's more or less where it's at). After that, it slows down significantly. This is a source of problems for us, because it means that people at the high end of the curve (high armor) will experience very slow growth. Notice what happens if we now substitute into the function level 50 rather than level 1: the simplified function now becomes y = x / (x + 1300) which looks like current_func_50.jpg. The previous function at level 1 is also pictured there for comparison. Remember that y is % absorption, x is armor. Notice that the function is now flatter as it covers the greater distance all the way to 1300, even in the earlier, fast rising part. Basically, at level 50, armor levels (aka x) are higher (in the thousands), the function needs to accept these higher armor levels without jumping to 100% armor (as it would have in the level 1 function). This is the reason for the higher constant. Another reason is that the old armor needs to become less effective  remember that if you stay with level 1 armor (x) at level 50, you'll get hammered. Using the level 50 function, armor of 200, which would have given you 72% absorption in level 1, will now give you a measly 13%. You may not be able to tell from the picture, but once again, after x=armor=1000, we get a very slow increase ie. diminishing returns. Once again, this is really frustrating for high level, high armor characters. Any point investment they make has very little effect, and plate armor seems to be of little use as well. Plate armor will try to raise the armor level by a certain amount, but because we're in the diminishing returns region, it'll have minimal effect and not really be worth it. What can be done to improve this situation? We can treat the function in several ways. One option is to reduce the amount that our constant has to grow between levels. The constant has to be able to handle the highest armor possible at each level. But the more it grows, the flatter it makes our function. The flatter the function, the less impact moving along it has. What we can do is to shift the function to the right mathematically. If we change the formula to be Absorb % = (armor  (1 * level)) / (armor  (1 * level) + level * 25 + 50) we can shift the function to the right by the amount specified as 1 * level here. Every increasing level shifts the function a little to the right. This makes sense: A function shifted to the right will produce no values (0) or negative values at lower armor (x) levels. At the higher levels, the shift increases, and this corresponds with the fact that at those high levels, your armor is pretty much worthless anyway. This gives us the ability to reduce the constant of the function, reducing the flattening effect. At level 50, our new function would simplify to Y = (X  50) / ((X  50) + 1050) this approach only makes a small difference that's barely visible, so I won't provide a picture. Another option is to utilize what we noticed about this function: it's much more linear in the lower part, and tapers off after passing the value of its constant. What does this mean? If we adjust the function so that the constant at each level (for the simplified function) will be about equal to the highest possible armor we can get at that level, we'll essentially only be using the linear, fast growing part of the function. The problem will then be that even at our maximum, the % values will be rather low since we aren't using the WHOLE function; we're just using a part of it. To fix this, we multiply the function by another constant, for example 1.5. The result will look like Absorb % = ( armor / (armor + (attacker level * 25) + 50) ) * 1.5 We would play with the constants to make sure we cover the realistic armor values. Sure, we'll have some percentages greater than 100% when we pass the maximum armor values, but since we limit our maximum percentage, that's not a problem (anything over 90% is equivalent to 90%, for example). This option produces quite a strong effect (see mult50.jpg). If you want to play with these constants, you can use my excel sheet at http://www.mediafire.com/?aavhm44ml01ao6m (it's too big for the forum). There's a sheet for the old formula and one for the one I'm trying out. The constants are all at the top, and they correspond to a full equation that includes both solution 1 and 2 which I mentioned above. Going from left to right, the constants are D1, E1, F1 and G1 (named for their cells). They correspond to: Absorb % = (armor  (D1 * level)) / (armor  (D1 * level) + level * E1 + F1) * G1 There are other options as well. Who's to say that % blocked should depend on the attacker level? If we can state that 2000, for example, is around the maximum armor, then we could use a linear or nonlinear function to turn any number out of 2000 into a percentage. This actually makes a lot of sense: characters will slowly be working up their armor percentage until the end game when their armor will be strongest. Absorb percentage would never go down just because you're fighting a higher level monster. Monster hits already get stronger with levels, and high level armors have minimum level requirements, so it really does seem like a good idea. Also, armor points seem to increase nonlinearly with levels already: relatively speaking, plate armor gets gradually stronger than cloth armor at the next level  they don't maintain the same ratios. I really think this is an idea worth seriously considering. Other options yet would be to switch to a linear function or some other function, while keeping the current variables intact. The most helpful thing you guys can do to help come up with good adjustments to the formula is experience from characters: what's typical cloth/leather/mail/plate armor for each level? What's the maximum at each level? The minimum? Uploading your characters to the Character Repository thread would really help with that. Last edited by Bluddy : 02222011 at 11:47 AM. 
#2




I played around some more, trying a linear function instead of a nonlinear one, and it seems pretty good. Updated my excel spreadsheet at http://www.mediafire.com/?nnas66mec6bi95c with the 'Linear' sheet.
The advantage of linearity is that you never get a feeling that you're not rewarded  every advance carries you forward by a couple of percentage points at least. In general, the rewards in DC seem better suited for a linear function since they, for example, include nonlinearity already in the armor values. I think this might be the best direction to go in. The function is something like Absorb % = ( (armor  (attacker level * 0.8)) / ( 60 + attacker level * 40) ) * 0.9 The constants in the excel sheet correspond to (based on their cells): Absorb % = ( (armor  (attacker level * D1)) / ( E1 + attacker level * F1) ) * G1 The important thing is, once again, knowing the min and max values at each level. It's not terrible if they're exceeded  the result would just be clamped to the maximum (0.9 in this case). Negative values should become 0. Last edited by Bluddy : 02222011 at 11:46 AM. 
#3




Some impressions:
First, I'm trying to understand what you're saying: Quote:
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Also, does this imply that absorption is absolute, in the sense that if it is 25% for a character, that 25% is applied to monsters above and below the character's current level? If so, that sounds wrong to me. Forgive me if I ask stupid questions here, but reading your post without full context (i.e. not being the developer of the game) is tricky at best, I'm first of all trying to understand the situation. 
#4




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It's true that there's a relationship between attacker level and armor value. But decomposing it into parts, the role of the level is just to add to that constant (C). As the level goes up, the constant gets bigger and bigger, changing the shape of the function. The practical result of that is that staying at a certain x (aka armor level) while the level goes up, will cause the % absorption to go down. Quote:
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EDIT: I edited the first 2 posts trying to make them more reader friendly. Hope that helps somewhat. Last edited by Bluddy : 02222011 at 11:47 AM. 
#5




Ah, yes. I now get the current situation/problem and your interpretation of it. Now studying the rest...
Edit: Some thoughts... Please comment and point out the flaws in my thinking, should there be any. Currently absorption can never reach a value as high as 90%. What you're suggesting is essentially a formula that allows absorption to (potentially) get to 90% (max) when a char reaches level 100. That in itself is a rather linear approach for this problem. Turn this around: if I absorb 90% of the damage, I'm virtually immortal. That removes the threat of running into level 100 monsters. I assume this formula is only for melee damage, so the threat would then come from elemental and/or magic damage, which might then require tweaking of it's own if the balance is shifted with regard to melee damage. Maximum armor values for a given level can never be ascertained, given the random nature of the game. I assume that's (at least partly) the reason the absorption formula is shaped the way it is. Quote:
 a max armor value for a character can not be stated.  this setup would diminish the relation between the attacker and defender in terms of their respective levels. This can be seen as personal taste though; I don't think a potentially linear progression of absorption towards 90% is a good thing. When looking at this, should we not also look at the damage formulas for the attackers? Perhaps answers and insights lie there, and at the very least it's connected. I do understand however that the current setup makes highlevel armor values lose too much power (the diminished return issue is perhaps too effective for high level characters). A tweak for that might be beneficial, but 90% absorption should never be reached. In short, as fas ar the numbers go I don't have a problem with the current setup. I have yet to experience the problem though; my highest level sofar is 27 so perhaps I'm not qualified to speak. And I might change my tune when I get to 90... I'll study this some more, I'll update if things come to mind. Last edited by Maledictus : 02222011 at 01:25 PM. 
#6




Changes
a) Make the cap 90% not 75%. b) Armor values need to increase more heavily with increased lvl requirements for cloth/leather, and much more heavily with str reqs for chain/plate. Maybe exponentially so. c) +% armor bonus skills need to increase, and the plate armor skill should give a massive +% armor with each level. Right now it's a skill you take 1 level in and that's it. Either that or give those chars plate at creation. Resistance formula needs to be tweaked as well, because right now even with a demonologist or warden and lots of spirit, I'm only getting 1015% reduction on elemental damage. This is a large reason why the game isn't fun past lvl 20. It's real fun until then, but once you get past a certain point, the game breaks down and is less fun. Many skills/spells become unviable, and the only way to play the game effectively for your combo is very obvious. 
#7




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While it sounds like all that's needed is a slight tweak of the numbers (ie. not the solutions I suggested), I don't think that's good enough. The function is built to cause diminishing returns at high levels. Without modifying the actual build of the function in some way (or switching to linear functions), I think this problem will stay. Also, this problem also exists in the resistance function (which I haven't examined properly yet) where the game often rewards 10 points of resistance which quickly become almost meaningless at higher levels. Another important point is that whatever the maximum is set at, it doesn't mean many characters will reach it. It can be set higher than any normal character can reach. Quote:
It's not a big deal if the maximum armor value is passed  the maximum percentage value will then be used. This isn't very different from what happens in the current function  when you pass the maximum assumptions of the function for that level, you'll get for example 57.1% instead of 57.0%, with increments getting smaller and smaller, essentially blocking you at 57%. You're essentially getting blocked in the same way. Quote:
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#8




That's my preference as well.
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[quote]c) +% armor bonus skills need to increase, and the plate armor skill should give a massive +% armor with each level. Right now it's a skill you take 1 level in and that's it. Either that or give those chars plate at creation.[quote] How much extra does each skill level give you? Quote:

#9




If cloth only absorb 1020% mages may never be endgameviable. With great armor for my level, I'm being killed constantly with a fire Mage. I can't kill stuff at my level before it closes in on me and if it gets into melee range I have big problems staying alive. No potions, pure character stats apps level 24or so, and same level opponents. Help me, Teleport, you're my only hope!
And the ceiling caving in on me doesn't help much 
#10




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