I'm trying to get the BLEP concept and I think I have it, apply the preintegrated impulse response of the "channel-medium" to the known shape signal/type of discontinuity (sinc), even though I have some weak point parts that I want to ask to.
I'm reading this paper linked below, I'm interested in the Polyblep part starting in pdf page 45, it seems interesting because it lets you skip the table part, but I'm not sure I'm getting the concept.
http://lib.tkk.fi/Dipl/2007/urn009585.pdf
When I plot the spline approximation residual I get this.
If you observe it doesn't have the response ripples before and after the step, I always thought that after a sudden change you can't have a straight line (DC) because it needs infinite harmonics, if I'm right this graph is representing from the sample before the discontinuity to the sample after, skipping all the ripples that have to occur in the DC part of a square by example. I'm right ? could be enough antialiasing doing it in this way ? maybe the graph is expressing something that i don't get.
Another question is, I heard that to have a bandlimited ramp i only have to integrate the bandlimited step, easy, but does this ramp can be applied to any frequency triangle wave discontinuity ? i mean, in the square an sawtooth the module of the discontinuity doesn't vary with frequency, it's always a 90 degree angle (ideally), in the triangle it does vary, is a bandlimited ramp usefull for any triangle like discontinuity type ? i don't think so because if it is why not use a bandlimited ramp to limit the 90 degree discontinuity?
I think that the solution could be a polynomial with the ramp module parameter, isn't it ? instead of applying a step applying a ramp of module M.
if you can use the ramp for everyting could also be used to bandlimit an linear ADSR envelope right to get the maximum speed possible?
Thanks for reading.
