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COSC 4364 Numerical Methods - Lecture25_Fourier_Series_DFT_FFT
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00:13 Okay, okay. Okay. So to talking about transform, yes,
00:31 way stall the tail end of last and a couple of additional examples quickly
00:43 then all these other things. So you for use here is yes,
00:53 is the best serves up. It's patient enough and go to infinity.
01:00 a while then you can get an representation of the function as long as
01:06 or even just continues on the continues, continues and if it's not
01:16 Then at the jumps it four year here converges to the midpoint 15,
01:21 left and right. So the limit when you approach the and here's what's
01:33 higher compute these coefficients and this is you serious or the coefficients for the
01:42 part of the cosine function and for sign which is kind of papa please
01:49 thanks Frances stick formula. And then went through and said, yeah,
01:56 it's an even function then you don't to worry about the odd part of
02:01 fourier transform because that's from 20 LTD have to work for even less than
02:10 on back. That's the only need the integration point after the interval because
02:16 the symmetry. So from the half and from work to find coefficient and
02:23 , if it's all the same you can only think it's enough to
02:26 more than half interval And only one basis functions to science look at
02:35 And if I want to do the is kind of simple. So depending
02:40 an approximation, is it just for first step. Oh, basis functions
02:47 the cold, serious for your serious of the function. And yeah,
02:54 formula for computing what And it's kind different things of all. And the
03:01 -15 we went through, you socializing can be translation and scaling of
03:10 sport From being symmetric around zero. they shifted and different. So we
03:18 up and then we talked about kind this example actually showing, oh
03:28 you can sort of decided from this and depending on how many terms on
03:35 CS expansion of reviews they got. first one is kind of, it's
03:43 really the first one. The first is the full way became these two
03:47 and then it gets modified by the trick functions. And because around the
03:55 points here it is and odd So that's fine. They won't let
04:01 fine of the basis functions. No sign. It's not kind of odd
04:08 respect to the original thing, but respect to the midpoint. So before
04:13 see this trench and automatically figures it . But it is. And there's
04:21 one that is also an old function in this case about the midpoint,
04:26 can be accountable for first frequency and frequencies and are financially if you add
04:33 all up because closer and closer to to square away. But again,
04:41 I said, it's farther on the , so on this. So there's
04:48 one just together functions. So that just an example, the acoustics are
05:05 little bit far and that's uh so I looked at frequency analysis of signals
05:12 the acoustics or something else, best of the two things I'm interested in
05:18 best the energy that is basically than sum of the squares of the coefficients
05:26 and B. So it's kind of amplitude, sometimes a gift. And
05:30 tells you something about the energy of sun. The difference between that there
05:37 both pros and science kind of a issue um can also have, you
05:43 , check function and argument plus the and I started watching can unravel it
05:48 terms of but this is one way which aptitude for these questions and that
06:04 So any examples of that, I'm to make a little bit more but
06:14 the same time or contact represent. it's common to use whole lot of
06:27 instead of contrition coordinates, but on news, the four star. Um
06:36 so there is that trying to write down in terms of enforcement coordinates,
06:45 imaginary I The Square one. And is kind of related to frequent system
06:54 they come back from the next So it's common to write, introduced
07:01 notion here. Is that yes, with all of P as being the
07:07 period minus 5/2 5/2. And some the formulas last time and two I
07:15 kind of the standard interval for the function from a normal length and then
07:21 of this failing to an arbitrary instead the two points. And so this
07:30 going to show up in a lot sites and that's going to try to
07:35 it and have you have dots, going to be used in the exponent
07:42 peter and of course, um for reasons. And the Israeli ins are
07:53 to Greece and I will be mm . So here it says these are
08:04 coefficients we want to talk about Um the point of that have been
08:09 that in general they helped us a so and come back to that and
08:20 playing around with this notion of the . Okay, I'll pull our coordinates
08:28 appointment, remember that he today are some angle Theta this coast plus I
08:37 minus something. It's just simply that some moments that are So that means
08:47 that's the Express Co Xanterra as well science era in terms of these three
08:53 . Um and that's useful when we back to the for your formula that
08:58 before that. Okay, there was before we get there. So then
09:04 the other thing that is convenient to and we will use it is the
09:09 than and sign is simply just to for them to occupy the part into
09:18 angle. So because it's just go and if I said I would take
09:24 and that's that's what I forgot. that's something happened remarkable then um this
09:35 particular important property but there are other that um I wanna talk about it
09:43 a little bit but um this is normal if you have say that
09:50 what to do uh you invest to around the circle that's a function of
09:56 . I said it was zero and it's one, you know that part
10:00 then it's data is part of the . Then it's basically coastline is zero
10:08 I is one. So then you to the imaginary one and this is
10:14 to be used in the algorithms from about insurance. I have to compute
10:19 for your transforms but for now it's up it's this thing and the corresponding
10:28 . Oh it's you again the borrowing not in this china is the argument
10:35 me or something. And so um what um so I'm going to go
10:47 and then trying to have you have picture of the unit circle in your
10:54 . I find it very useful to particularly discreet for transform that we talked
11:02 hopefully soon. So um, so is kind of a useful thing.
11:10 ? Right. That's hard times into better and then it's the same as
11:14 and we have to play Just our for one I think on the next
11:20 . Yes. Next to the Is simply listing them. That's that
11:29 remember. And serious serious expansion. was some of things based on co
11:36 and sign of the whole set of . Nothing best to have the property
11:42 there was. Yeah. How about chill out. What do you
11:47 That's right. That's so it goes this. Right. So um ah
12:00 . The end inside that's what's. . Thank you for that. I'm
12:12 . Why don't you come back? here we have this impression for the
12:20 areas of the function over minus pi 2. 5/2. So now you're
12:25 there's kind of an argument um variable the argument of the Cosine and Sine
12:31 that is related to the charming and . So again this was on the
12:39 side and it looked like this. , they tried to use the expression
12:45 the coastline and sine as a function feet to the fire form instead.
12:53 that's the in order to fund things this formula call sign and sign.
12:59 terms of the new professional users the importance. So then uh if I
13:08 these things in here so I can an expression then for the function there
13:13 terms of now using the polar coordinates each or something instead. It's
13:22 Yeah goes in here and there And zero is found a trivial but some
13:29 and papers and that therefore versus sample . And it could plug me in
13:37 . Then this becomes the one. it's clear zero then become centrist the
13:44 of the fixed components concept going around easier to look at this one perhaps
13:54 that if n is positive, one we can do is to occupy this
14:02 and I then they get high on and I squared on the bottom and
14:07 needs to fight. So and then we get the miners are really comes
14:12 this part and you still have to that is common. Hey, they
14:17 pro sign as well as them the market by the a simple everyone can
14:26 then we can simplify the expression to sure I get it. Um And
14:32 kind of look at the negative I just turns out that all of
14:38 All right. But especially when you're these expressions into this formula and then
14:55 So and then it's not writing it , but it thinks using the outputs
14:59 the previous slide, the algorithm needs be gone by during the integration of
15:10 function with respect to. Um So Right inside here and to do that
15:22 one way is tend to multiply first then do the integration. So that
15:28 that's in integration and then we respect . Are you applying the outcasts and
15:34 on the right hand side the And then again expression for F.
15:43 and then you can basically change the of the subversion of the intervention that
15:49 . So then you have this expression and this is kind of the planet
15:56 this argument is zero. The investigator Iran and alpha still not depend on
16:08 . So that means the integration of something and it's basically a whole
16:16 Then it's zero before it becomes there's equal and much more negative and
16:23 . So the only case when this is not zero, it's from these
16:28 guys are equal. So that is you got. So then thanks for
16:38 10 years, learn best way alpha one M equals m. The integration
16:46 are if this argument zero then it's one. So they will get basically
16:53 . Mm hmm. one over the is um this takes the form and
17:06 and integrated based on the internet. . No later. And that's why
17:13 have a way of death is given you. And this is the scaling
17:19 , the interval given to you. then you've got the Newport christian for
17:24 and to plug in into this So this is kind of representing then
17:37 to transform now using this polar coordinates of calculation coordinates. And uh,
17:50 of discussion of these rules of There is as the same convenient and
17:55 and they don't have this. And so and here is coming back to
18:04 potential formulas that we have a frigid . So so this kind of looks
18:11 ridiculous at first but that's really what want to have. Um So and
18:17 reminds you that any polynomial has a of rules equal to these degrees or
18:26 . And the planes in principle and This equation has 10 rules and I
18:34 want to try to find them by the former representation. And that was
18:42 one. It's just a jewel that order ah Certainly Pretend Equal zero.
18:50 is true. And also you go the circle so we have this part
18:59 from the definitional X. Yeah but for their this is the observation here
19:06 builds the set of explosive power is to one. And if you use
19:10 former representation and use the radio is one and it works so that we
19:16 have that um One equals this They all they also know that the
19:29 that is double period then okay for . We know that means that their
19:35 . So that's true. But it's true for every integer K. Uh
19:42 . Greater number. That's basically to but we're on the unit circle on
19:46 back And it's one. So for case this is also true. So
19:51 basically have Written one and 2 different this one and this one so that
19:59 can put them equal and said that is true. and then there's the
20:07 whenever theta is equal to support these exponents equal to each other. And
20:13 get for the terror values for which is true. Then that's the route
20:20 this equation. So a couple of is far too long to use
20:29 And these cars will need to make stay at home. So um here
20:38 kind of an an impression or for your top unit. Yes. You
20:45 that square everyone to call it C on this side. But basically There
20:50 two rules and there's one for Um and three that is not commonly
20:58 but use it and best digital 1/3 the way around the unit circle for
21:04 power away. And then they come after having done raised it to the
21:10 for great thanks. And the other is this set of groups. One
21:18 and -1. And either it's To 4th power. Um certainly use it
21:24 verify. One to the fourth car trivial minus four I. To the
21:30 car is for square it's minus one you square it again. Then you
21:33 plus one. The things that you see that these are actually of this
21:42 . So that's one not to talk this. Great. From them.
21:49 kind of pictures is helpful in this me personally and to try to understand
21:54 going on. Yeah. So um so this is the same what they
22:08 step forward. Okay. I guess have an example. So yes.
22:12 yes. So what I want to that often is a common way of
22:21 . Um this is or the series terms of all the coordinates is and
22:32 writing up. So there are two . Okay. You want to buy
22:37 the simple burial rites and omega into car. Okay. And then you
22:41 a subscript of em and the subscript inverse that tells you how many um
22:50 you have. four slices going on unit circle. Oh, so mm
22:58 . All the guys often have tortuous factors from the signal for a bunch
23:02 times but it's important to remember that kind of have to arguments with it
23:10 mm in the case and we will that from the banks of sites
23:16 So, so this is if and um goes between zero and n minus
23:28 . So two pi over N is of the minimum angle or the minimum
23:34 in the unit circle. And then . They just recounts the number of
23:42 . So 01234 exception. And then go back and okay becomes equal to
23:49 then we're back. So that's why goes from zero to environments on um
23:59 , so here was one and equals . Then the only option is K
24:03 zero and that's obviously one that's kind trivial if you have any close to
24:10 I want to these two points and even if okay can number zero or
24:15 can be one and this is the trivial and if it's one what you
24:20 is Into the two parts Times K Divided 1 and two. And this
24:28 actually alright bye. Which is basically moment. I'll have circle 2 -1
24:36 then you can continue. It gets little bit fussy And the 4th
24:44 there's another four slices for the first is creeping up again. The next
24:49 is 1 and four. So this personal to the right over to and
24:56 best and now you are at this now the point of these things would
25:07 opening clear later when I talked about kids for your transformed because yeah,
25:17 remember the expression for the chanson was sum of our customs in today.
25:30 right. Or something they need to something is here. So it's basically
25:36 of Outkast times on a bus. omega is one, you don't need
25:43 do any work. It was multiplying one. It's kind of done Something
25:49 -1 is not really any work to figure out if we're going to go
25:53 and subtract and yes you have. if there's something that happens to be
26:03 , it doesn't require in the competition just the part of so and the
26:13 called basic for me to ask for transform and hopefully get to talk about
26:19 make use of the fact that some the commenters are simple. It doesn't
26:25 very dramatic operation. So let's say working computer William transforms And this was
26:33 one. Okay. So now I I'm more difficult. So any questions
26:38 that. So try to keep this of unity and the unit circle around
26:45 what you're going to use later you talked about your operating the summer
26:51 first Times omega ah the almond does but tells you how much you want
26:58 wait and then the letter wants. there is no picture. So I
27:11 think they're doing a good job in books to try to figure out continuous
27:18 to be discreet formula. Mm attractive make up for Harley gaps from
27:27 with integral zor continuous function to dealing discrete set of data. And then
27:35 in fits it's a single processing or that will monitor something you're monitored.
27:41 . Single. But I just don't to do for example, the single
27:48 most of this computing today it's So the sample things. And as
27:53 as the digitized today. Seven. for some filtering one that you might
27:59 with that animal form with defects. computers and work on examples. So
28:08 is from the administration of all all the time. Another person in Hong
28:15 . There are some references that show this one. Sorry about the
28:18 All right. So especially it is you know, for simplicity they assume
28:26 sampling rate and the duration of the interval is the capital. So you
28:32 a bunch of values. I should going. So everybody here is that
28:39 actually and a lot of continuous And the sample one is a set
28:45 discrete values that you get overtime for . and then one can index all
28:51 values. Which so and I would to do so one way of all
28:59 them relating the sample data to the continuous functions. There's simply kind of
29:09 is disrupted. That function. There functions is only one when the argument
29:15 zero and it's true everywhere else. , basically what it says here as
29:23 evolves. And this summation here. one of the terms in the sun
29:28 come to be Non zero. That 20 happens to be for this concept
29:36 K. You got different values the data. So, and then for
29:44 short time will this two then label samples together? Yes. So this
29:54 the way we wanted and representing the between the continuous function and the sample
30:05 . And we want to use that to try to figure out how to
30:11 you think So on the next So it's sort of this this is
30:16 representation of the samples from the continuous . and then two related to work
30:23 and should have been a minus. mean to find the key over to
30:27 an arbitrary capable of them. Um then we had a second rate of
30:35 and the confederates capital and here probably what the number of intervals
30:40 So you know how many um violence have within the period. And so
30:49 means when we take this thing off we don't need to go through um
30:55 because it's periodic function. We only to worry about What happens within one
31:01 from -1 to 2. And with notion of arcade then one can write
31:08 song as coming from minus and over to end of it too. Um
31:15 in this formation and then because again properties of the direct function, practically
31:22 only thing is content with these guys they contribute to this location from the
31:27 life. So now, so the machinery to get the proficient. So
31:34 what we have this most expression for four year series in foreign coordinates.
31:41 what, how we figured out what coefficients. Elf Lands were supposed to
31:47 by integrating this continuous functions multiplied by the function. Yeah. So now
32:00 have our best to find the alphas using all right samples there. So
32:09 , yes, all this expression plug the sample function that the principal looks
32:16 a continuous function with foreign states. continuous function thing. Um but in
32:25 this is not having this expression so is continuous but it's actually only nontrivial
32:33 points dynamic can exchange the integration estimation . They commute and if a co
32:41 data has no dependence on feet so the best we can change the order
32:47 integration and then also and you know expression again for integration over this period
32:56 after this great points when it is zero. Um So if you just
33:05 the tease for um which T. 20 is equal to change the
33:14 K. Then what you get is the only limit is This is non
33:23 , longer reported subsets of T So on the first. Yeah.
33:31 your girl come to the superior because just selecting this Kindergartners for the
33:37 So the song is still there but T just disparate ties into this
33:45 So yes, come on in the the that the out fast in the
33:52 of a sample single is now in some over the sample values within a
34:01 weighted by this or something. So is indeed the discrete fourier transform.
34:14 watching verse three kind of the riots representation of um the samples function from
34:25 continuous function. So I think I this on To have now 40 minutes
34:36 depression for example they are then you the efficient this way and then based
34:44 as I said this translation, this indeed what the discrete fourier transform,
34:51 looks like someone compute a set of , one for each. Ah and
35:01 of them, it is in there's a weighted sum on the samples
35:08 observed within the field and the waiting from the east of the so so
35:18 is that these kids from the transform That the vote 1st, I want
35:25 jump to then see how it relates the continuous thanks give you money for
35:34 dating, continue to transform. So question that rotation that is used from
35:49 uh special soul, okay, on side. So So now that's a
36:01 use extent also the example there as of your input, there was a
36:07 on the previous slides and then there an art book, right, which
36:14 the story of proficient on the previous . So here is a member of
36:21 structure what happened next the input after heat of the audience that before but
36:31 can see that them for each day that was the end on the previous
36:35 , You have a two I subject close. Yeah. And then we
36:46 , as I said, how many that are but this was the ranch
36:51 I was with 102 and oneness oneness was symmetrical. So again, so
37:01 is the typical way things have been and so these no and for twitter
37:11 most monthly on that. Ah so are not depending on the data and
37:18 this is each of the artists civilization on the unit circle and I want
37:23 explain. Um and so typically mm . Can you pre compute these
37:38 Some software they use don't um just of very wasteful someone having happened to
37:49 an effort free routine and depending on you use it, it should be
37:55 and trying see whether it's they're better a set of them ahead of time
38:04 then apply them for all kinds of sequences instead of very confusing them every
38:09 because they do not. They only on the size of the electron.
38:16 that's an important aspect. Remember the . So, another thing that they
38:24 out here, this is basically matrix product text has always been a vector
38:33 each. But today you have one , so to speak in the Matrix
38:40 for EJ. So there is kind the low index and is kind of
38:45 color. So that's the way you the matrix set them off.
38:56 so this is kind of the basic fourier transform computational. You should think
39:01 it as well renting spectrum of profession it's rarely used in this one.
39:10 cards, this matrix F that is guns here are various real opportunity.
39:21 this matrix very special property And these special properties is often used to um
39:32 our police are called fast food, is to rely on the top.
39:43 that's what that is. You worried about basically the inverse fourier
39:52 The university ST fourier transform is based using kind of it inverse of the
39:58 several factors. And if it works out to see that to do the
40:09 fourier transform, you don't really need new set of federal factors. So
40:14 nice recognize what's it to the minus instrumented for each of them. Thank
40:22 for your practice for whereas the But they said the other thing to
40:31 on this side is the way they oh will be transformed and it's important
40:41 coordinate. I am not normalized from I mentioned last time. So I'm
40:50 on you views things um, you root and scaling for the forward and
40:56 backward. You don't need an extra . But if you didn't scale the
41:01 person need to scale it for them . They came first. So if
41:08 has to be, but making sure you get something the same. So
41:14 curious in the former transform, why is here, wow, This
41:24 that they need to divided by end order to get the original. Mm
41:37 . Oh thank you. And the so far as welcome continues to be
41:48 , wow. Now, first of of the books slides voice make some
42:02 about that. Mhm Yeah. Mm . So remember again how the F
42:12 the collection of several factors. Has role for each of the wives or
42:19 outcomes of the proficient and the fourier . Uh it's uh rescuing the size
42:29 the circle in two halves and there's then the subsequent is the number of
42:36 um in this case here, Is going to each roll of this
42:45 of the matrix. So for each put substantive buying the portal transform into
42:53 input then in the expo owner and is okay. And then you have
43:04 hmm. Finding the why is this to the J. K. So
43:09 product of J and K is what up in this matrix here.
43:15 they the worst sub script is a of slices. So in this case
43:21 four, let's get started for and there's cape times day showing up on
43:27 here as the power of each of two parties divided by that. So
43:35 time J zero. So the broadcast zero everywhere. Um similar in the
43:41 column, K is zero. Also the product of J&K is zero
43:48 And then you go to the 2nd . Now jay is fine. And
43:54 you see here is One times K saying No 1, 2,
43:58 Next time is jay is to some this two times 02 times 12 times
44:05 times three for them. 1, , 3 being the case. Did
44:12 get this set of exponents and then a perfect now probably this each of
44:18 empire Now divide by four and Then they just have each of the
44:27 parts or final. The 22 parts the horses powers of That's the
44:34 Mm hmm. In order to ah power is zeros and then it's all
44:41 and it's all one in the E. I. Over two is
44:47 imaginary hiked all the way around healing . So that means ah this is
45:00 um we are I think I did pay attention to. So there is
45:10 of a sudden inconsistency and contradiction whether use plus or minus here. The
45:18 thing that matters is whether ah when do the inverse transform that they use
45:27 opposite sign from the forward. so look at this thing now that
45:37 best for you. If there was over to each of the pi over
45:41 times one, that's plus I not . And that's why I discovered that
45:47 . Sure that in your mind this and then the next time is basically
45:53 squared with his mind as well. so they did. There's a difference
46:04 the sign. While I said it matter for the correct outcome. So
46:10 you have plus. All right, it for her picture on here in
46:21 stuff. So if it's plus in experiment, you go around this
46:28 if you have minus in the experiment go around this. So it's under
46:33 direction but it doesn't change the collection values. So, um so if
46:48 was a minus here, you will this matrix. And I said,
46:54 this essentially when you do that's four here. So this one man.
47:05 if the core here says this is native quantum occupy again and what this
47:11 and there's really no or maybe feeding let's see that At the time of
47:16 month, like three or -1 is subtraction is going to happen instead of
47:22 . And when you do create more modification and I definitely need start to
47:29 the real components, an imaginary components resources. So North is needed To
47:36 compute at four times or no twiddle them up. So here is on
47:49 same side. They were working it at four And doing destiny there four
47:55 6 outcome in terms of that they for the transform and this is again
48:03 pain versus from now. And this again what the head of the previous
48:13 and front therefore we got the respondents to remember what it is, the
48:21 kind tricks. There's a reason for of petitioning this thing that will come
48:26 for the next slide and so the of this, next slide is really
48:38 . Go on to make this observation the structural properties of the FBI fast
48:46 transform. They want us to call tune transform. This is coming out
48:54 the book. Try to explain it a different motion autopsy. Yes.
49:02 the past four years transformed. Mhm. This matrix now is not
49:12 there is the force that we have . Ah and here was the ability
49:18 Matrix 16 x two matrix. Now turns out that if you do so
49:25 effect for the permutations of this Um You can in fact get the
49:33 subjects like this. So this is commuting rows and columns and just make
49:41 now after you've done this permutation. this. Uh huh. The original
49:48 nature that is comfortable. Um Now got this picture form of the resulting
49:58 nuclear in nature. Now I'll be that um this is in fact the
50:07 . Two and this is also the nature. So that explains this notation
50:16 this column. Now This is two and this is a two.
50:21 This is kind of almost f. except for their I. And the
50:29 and the same thing is also almost except the signs and things have become
50:37 not supplied by the high. So this is also kind of related to
50:43 two but it's multiplied by the diagonal in the sense of The first row
50:49 the same as in f. The next show has been modified by
50:53 design. So that's kind of multiplying a diagonal matrix tax ft Um this
51:01 is essential listing with the minus sign negate all the things on top this
51:09 here. So in the end somewhere , is that showing what diagonal matrix
51:17 plugs in order to that's always take diagonal Party supply. This F two
51:27 yes, 13 months of Matrix. what's the point of this? The
51:34 is, yeah, If you have at two again at four doesn't require
51:44 more work than this failing Of F and the summation. So you're welcome
51:56 that. So there are many things happens in this process and use the
52:01 of what happens, you know? it turns this permitting. So now
52:06 need to fill it up. So we introduced try to do this by
52:12 the structure of this thing. They need to Correent the consequence of the
52:19 on that. So you can do competition in one part and then you
52:26 to work on there were x also inverse fermentation nature. So if you
52:33 that, you'll get a good structure looks like this that doing in fact
52:42 of sort in this case the input to even index mm hmm input values
52:50 our index into the fire and then do and that will transform half size
53:01 XC and into another half size on on guard. So the question
53:10 what was the point of this? yes. So instead of doing 14
53:16 four brand that are giving to So it doesn't seem to be much
53:23 a game. But the point is can do this very personally.
53:31 that's what I'm trying to show Yes. So that's why instead of
53:37 something the have more interest plantations ah your book. So I'll just common
53:48 . So matrix vector multiplication in terms arithmetic operations we know is n squared
53:55 in the end violent matrix and takes squared operations some of protection but exploiting
54:02 properties of the S matrix of these . You in fact and um there
54:10 animals changing the arithmetic complexity 10 times . They constantly personally apply this game
54:18 moving forward and forward. Thanks to guys twice as many half sites at
54:25 time we do it. But the repeated a number of steps. So
54:31 the work can accept this kind of and a bunch of so I will
54:46 to talk about. Okay, what you doing this? I think.
54:52 . Because if farmers aspects important computation but this is a personal way of
55:01 it is known as the school to associated with it. But they were
55:09 the first to discover it. But even if it was discovered that it
55:16 the first ah and stuff. All actually I don't know what the person
55:23 , but it was just one scientists their own industry industry that ended up
55:31 for the transformers? That seems a . I don't like everybody else.
55:45 . So the one thing that is too as that. It's your
56:02 They are originally in there. So nicely from zero to N. In
56:09 of your samples now you kind of them so you could even once before
56:15 other ones. And now if you this recursive lee to go from there
56:23 or big size too small to buy that is the smallest too, then
56:31 hands up the order this time and . And then what happens is what's
56:42 thing here. So it's known as controversial and honor show that on some
56:52 from that faction that works. But . So the one way of doing
56:57 competitions is you can write down barn coat what saved the day is here
57:06 then you can just reverse the order the bits in that fourth step.
57:12 I'm trying to show that what the means. So you have zero and
57:19 from left to right and then you to write right to left instead of
57:24 that can change zero. This If you start to write it down
57:29 the opposite order. This one from goes to Now, then eight or
57:34 highest numbers of one is not first of that. So this is just
57:39 example of taking this and then but think things done and will suffer officer
57:44 the order of debates. So this that's where the picture ourselves impact
57:54 So this is important. Um, was implicit In the past four means
58:02 it is causing this the organization because the sorting into order and even the
58:11 the documents to have accepted input variables apply the platform and transformed to it
58:20 the output is not necessarily in the party expected it to be the boss
58:26 to find it by the controversial by the actual suffers who's that and I'll
58:33 to show if anyone is interested in due north Carolina sympathies in particular on
58:46 . So they were distributed to transform is a good one to best in
58:55 of network trying to help. It one of the politicians that Children so
59:05 I want to know and probably um are algorithms, yeah, some of
59:16 there are so called sorting algorithms that of built in the implementation to undo
59:27 effects of the implicit controversial that transform so for somebody to use libraries I
59:38 need to be aware of where there's self supporting version or The most informal
59:47 . Okay, now the things I to highlight, I'll talk about in
59:52 book. So sorry, two Basic and I'll talk about what happened Most
60:01 us share of books and seen they about this one and they are no
60:09 in computational complexity. So that the in terms of how they need with
60:18 rotational factors and the trivial factors and different and how you get memory
60:25 So they have very different behaviors and a particular report distributed cluster. Um
60:36 I'm trying to feel it and then . Trying to cover this. Thank
60:49 . So for computation efficiency in particular gas And computational efficiency worry about two
61:02 . one is the number of our which is important sometimes, but overall
61:11 the number of memory references you which is an ordinance to discuss access
61:16 need. It's also more important than account of operation. And that's why
61:22 things come from. Mm hmm. now let's start with this upon the
61:30 and frequency wants to do. So the gun. Now, the general
61:38 of these little factor matrix. They mentioned some of the previous ones.
61:45 one thing to notice them because of property. Uh the field factors began
61:49 to go around the during a circle . Uh that's the other piece is
61:57 as one. So even though this looks different, they are now.
62:03 basically we should go down halfway down to be over too. The rest
62:07 the role here is basically the same the first part. Except there's a
62:14 . So what is the one way uh huh being one of their projects
62:20 trying to do that here in expression terms of then. So project um
62:29 there was this a matrix vector You have reported factors Now the key
62:37 Transformers, the three points and then compute and the other version of the
62:45 . And then there's this case today the summation index going through a role
62:51 I always found them take the first of the role and the next second
62:55 of the roll, then we can get their proper both input factor and
63:03 factor about this. Today parents sent rain entity over to if you do
63:11 then you can uh yeah, there some current theater. Right, so
63:19 have this benefactor times P over two that was effectively -1 to the power
63:26 my God, a subscript p to power of two is -1. And
63:30 there is tell here that uh Kind expansion exponential -1 here. And then
63:39 have so basically you get the same factor multiplied by either a sum or
63:48 or to improve. So here's the and that was that Okay, so
63:57 we can do one more thing. this was so this just kind of
64:03 size transform if you like the summation half you have two elements here.
64:11 there is an additional kind of trickery by looking at even advertising. So
64:21 such as so if they look at components then you basically have the place
64:31 how to do so quit crying then now that he wants From there or
64:38 two more cartoons. So so you plug it in. It's nothing
64:45 It's not now but So this one basically from 0 to T -1 And
64:52 not trying to value from 0 to . So if I get in here
64:59 once and for getting the odd ones once when you have a two and
65:05 experiment is the same as having P there too in the orphanage. So
65:12 all that happened here I think. now for the off the shadows here
65:20 still having to circle it down for little bit here. So this gets
65:25 no, the first part is this and then we have a one
65:31 That is this additional diagnostic. So this is, it's kind of one
65:41 sized transport. The fact is Fruity number two. The range of
65:49 compute author is has a range of have the number of values. As
65:58 as the number of values. I that's the same here. The difference
66:04 the first one is that this is . So there's a minus here and
66:08 there's they stood the factor that Yeah, the results of subtracting so
66:15 can help. So this is the . Um you put that into the
66:24 this is also have transformed over the . So the bottom of life is
66:30 have such things as these. But these properties so you have the competition
66:36 is to some two values or subtract to values and multiply what the
66:42 So one year this was popularly known butterflies as for your transform literature to
66:49 about my butterfly computation. And this says we have these two input values
66:57 either add or subtract them. Oh okay and then the one that got
67:04 just multiplied by the factor. So kind of the competition that is done
67:10 each step. Oh this ah fast to transport. So it looks like
67:16 is what I did. So basically take an input value and you combine
67:21 where the other riders that was half distance away. That's the P over
67:27 . And then you do to have transports. Now what they also did
67:33 that case was yeah we have these so the given ones and then we
67:41 the old ones. So in this what we get is um the ones
67:47 did just the addition that corresponded to even ones for the ones that actually
67:53 by the tribal factor after subtraction. correspondent to the audience and then you
68:00 this for something and then you get like this. So that's good.
68:05 here is that the first stage that halfway across, That's the way you
68:10 input values and then one just multiply there and fiddle factors and then you
68:19 to have size and then you repeat same thing. So here's 1/2 size
68:24 has one half size and public dependent now they turn the factors is if
68:30 use the same p bass, it's the 024 and six 412, 3.5
68:38 the team. So the best and is the one that repeats itself.
68:44 as I said, the first thing started with them as what's known as
68:47 order input And we're taking within this from zero and 1 words and what
68:54 gaps on the output and um resorting odds and even in terms of the
69:02 , this is in fact where the values are so to invest in do
69:09 things and right things back where they from in memory. Then as I
69:13 that a result appears Uh in the location on the themed books some of
69:21 one. So this is kind of # 14 or whatever it is.
69:28 location instead of this location comparative. Sorry, this is occasion or it
69:37 but it's It's the intervals from the 16 input. This so these investor
69:44 traverse studies we found on the Yeah, so this is probably what
69:51 controversy. This submission. Made So this is normal and that was
69:59 traverse and so no mm mm And practices usually 50 thing in particular.
70:09 it's distributed these so it's important to out if the former assume that you
70:16 your data sets you know some sub other processors question between the factories and
70:24 not going to be too much into time but this what I'm trying to
70:29 here is that together so and this going to be a difference compared to
70:36 destination of time. That is often in articles or books and protected
70:43 So in this kind of estimation frequency it's called. The view is kind
70:48 the maximum set with benefactors in the branch and then it is the subset
70:53 other one And every 4th 1 etc . These critical factors is the substance
71:00 what to use in the first stage this okay and there was the civic
71:12 of factors based on the stage. I'm sorry so you do things and
71:21 the other destination in time that tends be the one that's most distressed it
71:26 with out instead of trying to do in terms of output they do um
71:34 even respected the same gang loca half the input data points and the other
71:44 of the data points so still half the inner product this one on evening
71:54 potato plug it in and simplify the . Yeah again through an experiment that
72:03 replace the doctor too and the subscript thing for the other trump card
72:11 So now we have something that looks this. Now the range of
72:15 Is still the old ranch where it the summation range is half of them
72:21 we want to try to find we also use half the range for
72:26 outputs and expertise. So now you instead of mm hmm with L and
72:35 even else now you have not even ah as opposed to halfway the input
72:44 on the evening the input halfway and output and the buckling to the formulas
72:52 you think that happens here that if few of the two here arrange ah
73:03 we have this guy here To be the two And it's the one place
73:13 The over two, it's the same the base for them that stays in
73:18 so we don't have never bought that and then we have Plus B over
73:22 and this one too Plus B over and this one and that's where so
73:31 Iran that means that becomes a negative . Yes sir. So this is
73:39 now have the range in terms of after that and from that and there's
73:45 place for teams ah you have successfully the differences kind of looks like this
73:51 that case one of the here is of the inputs is occupied by this
73:59 for cases and then there's at the . So in this case the twitter
74:04 is the input and then it's the artist so it's a difference where the
74:10 effect that happens to be on the around the output from this and so
74:17 what this thing is kind of reverses there, I think input there then
74:26 goes backwards but it's that so long , halfway across in terms of ah
74:34 data and then twitter was the So you can gamble but then you
74:45 required to process them have to go come The last stage towards the first
74:51 when you're adopted tested 2x2s and there's past minus because is on the unit
74:59 and if you do this thing so know, normally when you discover that
75:04 the result order made the input and disorder in order to. Ah yes
75:10 course for the normal order. Uh . The other thing is also the
75:18 thing in terms of the swivels, use them All the twitters in the
75:23 stage of his F50 and suppose the stage and previous ones are always the
75:29 . Um Now so this was I want to get to restore order and
75:37 one of the factors once again said one last point questions well I'll do
75:50 and I will repeat that next The point is there are a few
75:55 about these things. So we'll talk and more so all some of its
76:03 as well. For the desperation interpersonal violence is not true. What
76:13 true is that affected the traverse is order. So you can also use
76:20 destination time for normal order in from chooses, but then your similarly you
76:27 use destination time, destination frequency, to hearst inputs if that's what you
76:35 . And I'll talk about that next . I'm supposed to also have a
76:39 forward and inverse because many applications they a piece to come with certain computations
76:47 they said for your space so they back and forth between forward and
76:52 So I will talk about thank You're welcome. Mm hmm, mm
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