15. Poisson Process II

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  • Опубліковано 13 гру 2024

КОМЕНТАРІ • 68

  • @yd_
    @yd_ 2 роки тому +13

    Every lecture, the number of views is going down. For everyone else doing all the problems, watching the lectures, etc. - you have my respect. I'll see you at the end!

  • @kelly4187
    @kelly4187 8 років тому +44

    Saw the last video? Skip to 11:40 👍

  • @aalokatharva4825
    @aalokatharva4825 3 роки тому +8

    For those confused like me regarding the fishing example:
    for part d): The number of fish caught can be found in 2 ways
    Consider 3 Random Variables:
    F: No. of fish caught
    T: Time (The values that time can take)
    FishTime: FishingTime (The values that fishing time takes, note that this is different from Time r.v.)
    1) E[F] = E[F|02)
    E * (1-P(0,2)) + 1 * P(0,2)
    Here E will not be = lambda * tau
    This is because if he fishes for exactly 2 hours it means he will definitely not catch 0 fish.
    So we need to calculate the conditional pmf. That is P(catches k fish|catches atleast 1 fish)
    Then use this to find the new Expected value by multiplying with k and summing for k = 1, 2....
    Then put this for E and calculate.
    Gives the same answer.

  • @xming7294
    @xming7294 7 років тому +33

    The bus crowdedness experiment is great.

    • @amitkesari2000
      @amitkesari2000 3 роки тому +1

      Absolutely!, it made everything so clear😃

  • @endogeneticgenetics
    @endogeneticgenetics 5 років тому +4

    Those paradoxes and the addressal of them: so good!

  • @xueqiang-michaelpan9606
    @xueqiang-michaelpan9606 7 років тому +8

    This lecture is great!

  • @sihanchen1331
    @sihanchen1331 4 роки тому +2

    16:16 I guess it should be P(0,2)*int_0^3 f_T1(t)dt (probability of catching 0 fish in 2 hours*the probability of the 1st arrival within 3 hours). Then I get the same results
    but somehow if you use P(0,2)*(1-P(0,3)) it's also the same result

  • @SomeHeavensStation
    @SomeHeavensStation 8 місяців тому

    I'm having trouble reconciling something from the fishing example (15:20). If the rule is that Poisson stops fishing when a fish is caught (as mentioned at 12:40), then shouldn't the P of catching at least 2 fish (example (e)) be zero? At 12:40, there seems to be a contradiction: (1) "You fish for 2 hours no matter what" AND (2) "You stop fishing as soon as you catch a fish."

  • @SequinBrain
    @SequinBrain 2 роки тому

    1:09-1:14 Notice both what he's saying and whether or not someone is walking through the door behind him.

  • @ahmedessam4068
    @ahmedessam4068 4 роки тому +1

    the bus arrival example is great after its further intuitive explanation, thanks.

  • @torontohrb2462
    @torontohrb2462 7 місяців тому

    Regarding part d) of finding the expected number of fish to be caught, we can use the total probability theorem as Prof Tsitsiklis suggested. Define X as the rv representing the number of fish caught in the first 2 hours. Then
    E[# of fish]=E[X|X>0] P(X>0) + E[1|X=0] P(X=0) where
    E[X|X>0] P(X>0)=[1P(X=1|X>0)+2P(X=1|X>0)+...]P(X>0)=1P(X=1)+2P(X=2)+...=E[X]=1.2

  • @FuzzyteddybearIV
    @FuzzyteddybearIV 8 років тому +3

    For the Expected number of fish ( ~ 19:00 ), shouldn't he include the possibility of catching N fish during the first two hours? Is the probability of 3 or more fish in 0 < t < 2 insignificant?

    • @Qladstone
      @Qladstone 7 років тому

      Yes, the fish caught in the first two hours is included as 0.6*2 in the expression.

    • @fahmiabdulaziz1300
      @fahmiabdulaziz1300 4 роки тому +1

      i have the same thought too. i think it should be (1-P(0,2))*0.6*2. but i haven't get satisfying proof yet.

    • @fahmiabdulaziz1300
      @fahmiabdulaziz1300 4 роки тому +1

      ua-cam.com/video/MvGuBQZZuLM/v-deo.html
      you can find better explanation there

  • @XINYANGAO
    @XINYANGAO 7 місяців тому

    Maybe the best lecture I have ever listened.

  • @anexocelisia9377
    @anexocelisia9377 3 роки тому +1

    mergin and splitting of the poisson process - > again the poisson process.
    Random Incidences of Poisson - > bus example for poisson process

  • @husseinfaiq803
    @husseinfaiq803 4 роки тому +2

    Never been this satisfied of something I watched since the purple wedding

    • @watt_the_border_collie
      @watt_the_border_collie 11 днів тому

      Thanks, now I have to stop learning and watch the scene and why not the whole 4th season

  • @liyuanzhang52
    @liyuanzhang52 4 роки тому +3

    bulb example is amazing

  • @jonahansen
    @jonahansen 5 років тому +9

    Dang - Prof Tsitsiklis is good! Reminds me of Gilbert Strang and Walter Lewin. Probably all MIT profs are good, eh?

  • @ramzimay9669
    @ramzimay9669 5 років тому +5

    Thank you very much
    I think that there is a missing factor (1-P(0,2)) in the response to the questions d and f. Is this true?

    • @sihanchen1331
      @sihanchen1331 4 роки тому

      For d) If you use divide and conquer you will get E(# of fish | T2) = 1.2*(1-P(0,2))+(1+1.2)*P(0,2) and you will get the same results

    • @amikumar1264
      @amikumar1264 4 роки тому +1

      @@sihanchen1331 Hi sihan,why you have taken expectation in time t>2 to be 1+1.2

    • @sihanchen1331
      @sihanchen1331 4 роки тому

      ami kumar oops it’s been a while I forgot my rationale but it’s to make sense of his answer

    • @LeeiFJaw
      @LeeiFJaw 4 роки тому

      @@sihanchen1331 Unfortunately, your reasoning here is wrong. E[number of fish | T> 2] is 1.

    • @LeeiFJaw
      @LeeiFJaw 4 роки тому +1

      The probability is one instead of 1 - P(0,2) since the 0.6*2 is the unconditioned expectation. Think of it in this way, the first two hour will happen no matter what, whether you catch some fish or none. The probability of catching zero fish in the first two hours is already encoded in the expectation 0.6*2.

  • @dursundurmaz915
    @dursundurmaz915 5 років тому +1

    45:57 we assume equally likely, bu prof. wrote 1/3 and 2/3 ? why

    • @Super7Gogeta
      @Super7Gogeta 5 років тому +1

      He was choosing intervals at random first, which is when he got 1/2 for both types of intervals. But in the second case he is picking a point at random (not an interval), and points are distributed on the real number line and are more likely to be in intervals of size 10 rather than of size 5.

  • @shauryamalhotra9136
    @shauryamalhotra9136 7 років тому +1

    Shouldn't the answer to the fish question at 15:46 be equal to p(0,2)*p(1,3) instead of p(0,2)*(1-p(0,3))
    I say this because the fisherman should fish for no longer than 1 fish. In the case of 1-p(0,3), he's considering all the possibilities that he could fish 1,2,3,4,5,6,7..... any number of fishes during that interval? from hour 2....5

    • @utxeee
      @utxeee 7 років тому

      I thought exactly the same thing!

    • @dhirajupadhyay01
      @dhirajupadhyay01 7 років тому +3

      I think the reason why it should not be p(1,3) is that p(1,3) means just one success in time interval 3, which completely removes the possibility of getting more than 1 success in that interval.Getting more than 1 success is quite possible as it is a Poisson process. We are stopping after the first success that doesn't mean in the interval (2,5) we can't get more than 1 fish.
      Other way to look at it is in this example we want to have at least one fish. What's the probability of finding at least one fish? Yes, you guessed it right 1 - P(0,3)

    • @semjoneschweiler2229
      @semjoneschweiler2229 Рік тому

      @dhirajupadhyay01 But isn't that exactly how the problem is defined? That if the first fish is caught after the 2h period, you go home instantly. This would imply that you can't fish more than 1 fish in the period of > 2h, thus I think it is in fact P(0, 2) * P(1, 3)

  • @Kaz.2719
    @Kaz.2719 9 років тому +6

    Great lecture, thank you. Will help me with my Stochastic Processes course

  • @dania_884
    @dania_884 3 роки тому +1

    wonderful teaching. the examples he taught at the end makes me laugh. The bus crowdedness example is great!

  • @cuiqingli2077
    @cuiqingli2077 6 років тому +1

    Thank you!!! MIT!!!!

  • @zhentan7176
    @zhentan7176 10 років тому +2

    excellent!

  • @jea_lee
    @jea_lee 7 місяців тому

    Is it just me who loves the chocolate cookie example 😂 Such an awesome professor and lecture!!

  • @thecarradioandarongtong4631
    @thecarradioandarongtong4631 2 роки тому

    It's a pleasure to listen to you Sir !! I am studying at an IIT

  • @ParthKohli
    @ParthKohli 3 роки тому

    Fantastic!

  • @laffoo
    @laffoo 9 років тому +1

    well done!

  • @iyalovecky
    @iyalovecky 2 роки тому +2

    Цікавий "парадокс". Слухав із задоволенням. Дякую!

  • @uwemenzel8473
    @uwemenzel8473 8 років тому +1

    The first terms in part d and f of the examples should be weighted with the probability that scenario 1 occurs, right?

    • @uwemenzel8473
      @uwemenzel8473 8 років тому +1

      Thanks Roy, I've got the same using total expectation. Regarding f): it must be considered that it's SURE that 2 hours have already been spent fishing if no catch. I get E(T) = 2*(1-P(0,2)) + (2 + 1/0.6)*P(0,2) which reduces to 2 + 1/0.6*P(0,2) as in the lecture.

    • @ishantyagi1992
      @ishantyagi1992 8 років тому +1

      math.stackexchange.com/questions/1312304/expected-number-of-occurences-in-poisson-process-that-can-stop-under-certain-con

    • @ishantyagi1992
      @ishantyagi1992 8 років тому

      Its because you are already multiplying by the probabilities of the respective cases to get the expectation. You just have to skip the value 0 which is anyways contributing nothing to the expectation.

    • @serhatkuk4180
      @serhatkuk4180 5 років тому +1

      Actually at time 19.55 professors says that we are going to wait 2 hours no matter what whether we caught a fish at [0,2] or didn't we still wait for at least 2 hours. So probability of waiting between [0,2] is 1 ! Therefore it is actually like total expectation theorem:
      1 * 0.6 * 2 + P(0,2) * 1
      The first one is probability of waiting in [0,2] interval, which is 100% . Second 1 is the expected value of the fish, given that we didn't caught any in [0,2] interval.

  • @oakschris
    @oakschris 8 років тому +7

    But is the life of a light bulb actually modeled by the memoryless Poisson process? I would think the past takes it's toll on the filament.

    • @vimalkarsan2309
      @vimalkarsan2309 8 років тому +3

      Does it really matter?

    • @Isaac668
      @Isaac668 7 років тому +5

      it's just a hypothetical, almost none of the processes in the world are truly memoryless. A bank having more people between 10 and 12 might mean there will be more people visiting between 12 and 2 cause it's a saturday, or it might mean less people will visit cause all of the bank's clientele visited already etc.. etc. etc.

    • @florianwicher
      @florianwicher 6 років тому +2

      Exactly my thoughts.A not so great example of an otherwise great lecture.

    • @ElizaberthUndEugen
      @ElizaberthUndEugen 4 роки тому

      yea, confusing example. Why isn't the life span of a light bulb normally distributed? Some last very short, most for medium length and some for very long.

  • @shuklashravan
    @shuklashravan 5 років тому

    The bus inter-arrival time example is a bad/counteractive example. If buses are running at the rate of 4 per hour, You go at a random time for many days and your average waiting time should be 7.5 minutes. Why would the bus company foll people by saying we are running buses whose time is determined by poisson process and not a uniform/predetermined time?

  • @ba2tripleO
    @ba2tripleO 4 роки тому +1

    what does 1 over lambda represent in the fishing example?

    • @LeeiFJaw
      @LeeiFJaw 4 роки тому

      The expectation of a geometric distribution with parameter λ is 1/λ.

    • @prabinlamichhane3130
      @prabinlamichhane3130 3 роки тому +1

      lambda is the rate of arrival (Arrivals per unit time). When we say 1/lambda, it becomes time per arrival which is the expected value of first arrival. Not sure about the actual intuition, but analysis as above makes sense.

    • @your_name96
      @your_name96 3 роки тому

      from the previous lecture , we have an exponential random variable from the poisson distribution in the case when k = 1 i.e arrival of the first success in a fixed time t. And expectation of an exponential random variable is 1/lambda, lambda being the arrival rate.

    • @yeslinsequeira4612
      @yeslinsequeira4612 5 місяців тому

      I think he misspoke when he said geometric. I derived the expectation of an exponential distribution, and it came out to be 1/lambda. Did we ever derive that though? Dont have that in my notes, kind of frustrating that that came out of nowhere

    • @yeslinsequeira4612
      @yeslinsequeira4612 5 місяців тому

      Looks like recitation 8 on MIT OCW, question 3, asks us to derive this in 3b. I guess thats why we were expected to know this? Dont tell me I should have been going through recitations, lectures arent enough? (crying emoji)

  • @GuruShreyaasSmeb
    @GuruShreyaasSmeb 2 роки тому

    Wow!!!

  • @RiccardoVincelli
    @RiccardoVincelli 9 років тому +1

    It's a Zipf, it's a Zipf