Pdf for distance between two uniform random points in a circle












3














This is my first post in the group and I would be very thankful for any help. I am trying to develop a probability distribution for a performance analysis in my thesis. I am trying to look in to literature which provides the probability distribution for distance between two random points in a unit circle.



I would try to explain the problem. Suppose we have a point X and we have point x1 in the unit circle C1 which contains X. There is another unit circle X2 right next to the circle X1. There is a point x2 in the unit circle X2. Let d1 be the distance between X and x1 and d2 be the distance between X and x2. All the points are distributed within respective circles with random distribution. I want to know the probability distribution for d1/d2. Has anyone worked with a similar problem or anybody can direct me towards any literature.



Thank you so much for the help.
Cheers,
Waqas










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  • 1




    By "the unit circle $C_1$ which contains $X$" do you mean that $X$ is the center of $C_1$?
    – Math1000
    Nov 29 '15 at 9:01






  • 1




    What are the centers of the circles?
    – Rodrigo de Azevedo
    Jun 28 '16 at 14:05
















3














This is my first post in the group and I would be very thankful for any help. I am trying to develop a probability distribution for a performance analysis in my thesis. I am trying to look in to literature which provides the probability distribution for distance between two random points in a unit circle.



I would try to explain the problem. Suppose we have a point X and we have point x1 in the unit circle C1 which contains X. There is another unit circle X2 right next to the circle X1. There is a point x2 in the unit circle X2. Let d1 be the distance between X and x1 and d2 be the distance between X and x2. All the points are distributed within respective circles with random distribution. I want to know the probability distribution for d1/d2. Has anyone worked with a similar problem or anybody can direct me towards any literature.



Thank you so much for the help.
Cheers,
Waqas










share|cite|improve this question














bumped to the homepage by Community 10 hours ago


This question has answers that may be good or bad; the system has marked it active so that they can be reviewed.











  • 1




    By "the unit circle $C_1$ which contains $X$" do you mean that $X$ is the center of $C_1$?
    – Math1000
    Nov 29 '15 at 9:01






  • 1




    What are the centers of the circles?
    – Rodrigo de Azevedo
    Jun 28 '16 at 14:05














3












3








3







This is my first post in the group and I would be very thankful for any help. I am trying to develop a probability distribution for a performance analysis in my thesis. I am trying to look in to literature which provides the probability distribution for distance between two random points in a unit circle.



I would try to explain the problem. Suppose we have a point X and we have point x1 in the unit circle C1 which contains X. There is another unit circle X2 right next to the circle X1. There is a point x2 in the unit circle X2. Let d1 be the distance between X and x1 and d2 be the distance between X and x2. All the points are distributed within respective circles with random distribution. I want to know the probability distribution for d1/d2. Has anyone worked with a similar problem or anybody can direct me towards any literature.



Thank you so much for the help.
Cheers,
Waqas










share|cite|improve this question













This is my first post in the group and I would be very thankful for any help. I am trying to develop a probability distribution for a performance analysis in my thesis. I am trying to look in to literature which provides the probability distribution for distance between two random points in a unit circle.



I would try to explain the problem. Suppose we have a point X and we have point x1 in the unit circle C1 which contains X. There is another unit circle X2 right next to the circle X1. There is a point x2 in the unit circle X2. Let d1 be the distance between X and x1 and d2 be the distance between X and x2. All the points are distributed within respective circles with random distribution. I want to know the probability distribution for d1/d2. Has anyone worked with a similar problem or anybody can direct me towards any literature.



Thank you so much for the help.
Cheers,
Waqas







circle uniform-distribution






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asked Sep 17 '14 at 5:55









Waqas

287




287





bumped to the homepage by Community 10 hours ago


This question has answers that may be good or bad; the system has marked it active so that they can be reviewed.







bumped to the homepage by Community 10 hours ago


This question has answers that may be good or bad; the system has marked it active so that they can be reviewed.










  • 1




    By "the unit circle $C_1$ which contains $X$" do you mean that $X$ is the center of $C_1$?
    – Math1000
    Nov 29 '15 at 9:01






  • 1




    What are the centers of the circles?
    – Rodrigo de Azevedo
    Jun 28 '16 at 14:05














  • 1




    By "the unit circle $C_1$ which contains $X$" do you mean that $X$ is the center of $C_1$?
    – Math1000
    Nov 29 '15 at 9:01






  • 1




    What are the centers of the circles?
    – Rodrigo de Azevedo
    Jun 28 '16 at 14:05








1




1




By "the unit circle $C_1$ which contains $X$" do you mean that $X$ is the center of $C_1$?
– Math1000
Nov 29 '15 at 9:01




By "the unit circle $C_1$ which contains $X$" do you mean that $X$ is the center of $C_1$?
– Math1000
Nov 29 '15 at 9:01




1




1




What are the centers of the circles?
– Rodrigo de Azevedo
Jun 28 '16 at 14:05




What are the centers of the circles?
– Rodrigo de Azevedo
Jun 28 '16 at 14:05










2 Answers
2






active

oldest

votes


















0














Where is your problem? Google is your friend!



If you google the words:



distance random points in circles



the first hit gives you the book:
An introduction to geometrical probability by A.M. Mathai.



To find in Google:



http://books.google.de/books/about/An_Introduction_to_Geometrical_Probabili.html?id=FV6XncZgfcwC&redir_esc=y



If you look into the book in Google preview,
on page 217 you find a chapter treating your problem.



Maybe you can read it yourself ;-)!



Ciao



Karl






share|cite|improve this answer





















  • Hi Karl. Thank you so much for the link. Unfortunately, the relevant chapter is not available for reading and I am unable to find it in library of my own uni. I hope I can get a similar book or this book to read through and get the solution. Thanks a lot for the help.
    – Waqas
    Sep 17 '14 at 7:18










  • Hi Waqas, did you try this link, there is page 217-9:<books.google.de/…>
    – Karl
    Sep 17 '14 at 7:25










  • I have tried to open the link. It is probably from the german version of google but it says that from 77-555 it is not available for reading. I am trying to search it to suggest to my supervisor if I could buy it but I can not find any link as of yet to get it. I hope I can find the book as it clearly would help me a great deal.
    – Waqas
    Sep 17 '14 at 7:32










  • Sorry that it doesn't work. Amazon gives also a preview, not these pages, but at least the bibliography. Maybe this helps.
    – Karl
    Sep 17 '14 at 8:38












  • Hi. I got the pages of the book from my library. The pdf involves an integral of which I am finding hard to solve. Could you help. I have posted the integral here
    – Waqas
    Sep 22 '14 at 4:11



















-2














Please look at this work 1 which has investigated the interference from neighbor cells, and hence, investigated the distribution of distances between users. Hope it works for you.






share|cite|improve this answer























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    2 Answers
    2






    active

    oldest

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    2 Answers
    2






    active

    oldest

    votes









    active

    oldest

    votes






    active

    oldest

    votes









    0














    Where is your problem? Google is your friend!



    If you google the words:



    distance random points in circles



    the first hit gives you the book:
    An introduction to geometrical probability by A.M. Mathai.



    To find in Google:



    http://books.google.de/books/about/An_Introduction_to_Geometrical_Probabili.html?id=FV6XncZgfcwC&redir_esc=y



    If you look into the book in Google preview,
    on page 217 you find a chapter treating your problem.



    Maybe you can read it yourself ;-)!



    Ciao



    Karl






    share|cite|improve this answer





















    • Hi Karl. Thank you so much for the link. Unfortunately, the relevant chapter is not available for reading and I am unable to find it in library of my own uni. I hope I can get a similar book or this book to read through and get the solution. Thanks a lot for the help.
      – Waqas
      Sep 17 '14 at 7:18










    • Hi Waqas, did you try this link, there is page 217-9:<books.google.de/…>
      – Karl
      Sep 17 '14 at 7:25










    • I have tried to open the link. It is probably from the german version of google but it says that from 77-555 it is not available for reading. I am trying to search it to suggest to my supervisor if I could buy it but I can not find any link as of yet to get it. I hope I can find the book as it clearly would help me a great deal.
      – Waqas
      Sep 17 '14 at 7:32










    • Sorry that it doesn't work. Amazon gives also a preview, not these pages, but at least the bibliography. Maybe this helps.
      – Karl
      Sep 17 '14 at 8:38












    • Hi. I got the pages of the book from my library. The pdf involves an integral of which I am finding hard to solve. Could you help. I have posted the integral here
      – Waqas
      Sep 22 '14 at 4:11
















    0














    Where is your problem? Google is your friend!



    If you google the words:



    distance random points in circles



    the first hit gives you the book:
    An introduction to geometrical probability by A.M. Mathai.



    To find in Google:



    http://books.google.de/books/about/An_Introduction_to_Geometrical_Probabili.html?id=FV6XncZgfcwC&redir_esc=y



    If you look into the book in Google preview,
    on page 217 you find a chapter treating your problem.



    Maybe you can read it yourself ;-)!



    Ciao



    Karl






    share|cite|improve this answer





















    • Hi Karl. Thank you so much for the link. Unfortunately, the relevant chapter is not available for reading and I am unable to find it in library of my own uni. I hope I can get a similar book or this book to read through and get the solution. Thanks a lot for the help.
      – Waqas
      Sep 17 '14 at 7:18










    • Hi Waqas, did you try this link, there is page 217-9:<books.google.de/…>
      – Karl
      Sep 17 '14 at 7:25










    • I have tried to open the link. It is probably from the german version of google but it says that from 77-555 it is not available for reading. I am trying to search it to suggest to my supervisor if I could buy it but I can not find any link as of yet to get it. I hope I can find the book as it clearly would help me a great deal.
      – Waqas
      Sep 17 '14 at 7:32










    • Sorry that it doesn't work. Amazon gives also a preview, not these pages, but at least the bibliography. Maybe this helps.
      – Karl
      Sep 17 '14 at 8:38












    • Hi. I got the pages of the book from my library. The pdf involves an integral of which I am finding hard to solve. Could you help. I have posted the integral here
      – Waqas
      Sep 22 '14 at 4:11














    0












    0








    0






    Where is your problem? Google is your friend!



    If you google the words:



    distance random points in circles



    the first hit gives you the book:
    An introduction to geometrical probability by A.M. Mathai.



    To find in Google:



    http://books.google.de/books/about/An_Introduction_to_Geometrical_Probabili.html?id=FV6XncZgfcwC&redir_esc=y



    If you look into the book in Google preview,
    on page 217 you find a chapter treating your problem.



    Maybe you can read it yourself ;-)!



    Ciao



    Karl






    share|cite|improve this answer












    Where is your problem? Google is your friend!



    If you google the words:



    distance random points in circles



    the first hit gives you the book:
    An introduction to geometrical probability by A.M. Mathai.



    To find in Google:



    http://books.google.de/books/about/An_Introduction_to_Geometrical_Probabili.html?id=FV6XncZgfcwC&redir_esc=y



    If you look into the book in Google preview,
    on page 217 you find a chapter treating your problem.



    Maybe you can read it yourself ;-)!



    Ciao



    Karl







    share|cite|improve this answer












    share|cite|improve this answer



    share|cite|improve this answer










    answered Sep 17 '14 at 6:38









    Karl

    6641614




    6641614












    • Hi Karl. Thank you so much for the link. Unfortunately, the relevant chapter is not available for reading and I am unable to find it in library of my own uni. I hope I can get a similar book or this book to read through and get the solution. Thanks a lot for the help.
      – Waqas
      Sep 17 '14 at 7:18










    • Hi Waqas, did you try this link, there is page 217-9:<books.google.de/…>
      – Karl
      Sep 17 '14 at 7:25










    • I have tried to open the link. It is probably from the german version of google but it says that from 77-555 it is not available for reading. I am trying to search it to suggest to my supervisor if I could buy it but I can not find any link as of yet to get it. I hope I can find the book as it clearly would help me a great deal.
      – Waqas
      Sep 17 '14 at 7:32










    • Sorry that it doesn't work. Amazon gives also a preview, not these pages, but at least the bibliography. Maybe this helps.
      – Karl
      Sep 17 '14 at 8:38












    • Hi. I got the pages of the book from my library. The pdf involves an integral of which I am finding hard to solve. Could you help. I have posted the integral here
      – Waqas
      Sep 22 '14 at 4:11


















    • Hi Karl. Thank you so much for the link. Unfortunately, the relevant chapter is not available for reading and I am unable to find it in library of my own uni. I hope I can get a similar book or this book to read through and get the solution. Thanks a lot for the help.
      – Waqas
      Sep 17 '14 at 7:18










    • Hi Waqas, did you try this link, there is page 217-9:<books.google.de/…>
      – Karl
      Sep 17 '14 at 7:25










    • I have tried to open the link. It is probably from the german version of google but it says that from 77-555 it is not available for reading. I am trying to search it to suggest to my supervisor if I could buy it but I can not find any link as of yet to get it. I hope I can find the book as it clearly would help me a great deal.
      – Waqas
      Sep 17 '14 at 7:32










    • Sorry that it doesn't work. Amazon gives also a preview, not these pages, but at least the bibliography. Maybe this helps.
      – Karl
      Sep 17 '14 at 8:38












    • Hi. I got the pages of the book from my library. The pdf involves an integral of which I am finding hard to solve. Could you help. I have posted the integral here
      – Waqas
      Sep 22 '14 at 4:11
















    Hi Karl. Thank you so much for the link. Unfortunately, the relevant chapter is not available for reading and I am unable to find it in library of my own uni. I hope I can get a similar book or this book to read through and get the solution. Thanks a lot for the help.
    – Waqas
    Sep 17 '14 at 7:18




    Hi Karl. Thank you so much for the link. Unfortunately, the relevant chapter is not available for reading and I am unable to find it in library of my own uni. I hope I can get a similar book or this book to read through and get the solution. Thanks a lot for the help.
    – Waqas
    Sep 17 '14 at 7:18












    Hi Waqas, did you try this link, there is page 217-9:<books.google.de/…>
    – Karl
    Sep 17 '14 at 7:25




    Hi Waqas, did you try this link, there is page 217-9:<books.google.de/…>
    – Karl
    Sep 17 '14 at 7:25












    I have tried to open the link. It is probably from the german version of google but it says that from 77-555 it is not available for reading. I am trying to search it to suggest to my supervisor if I could buy it but I can not find any link as of yet to get it. I hope I can find the book as it clearly would help me a great deal.
    – Waqas
    Sep 17 '14 at 7:32




    I have tried to open the link. It is probably from the german version of google but it says that from 77-555 it is not available for reading. I am trying to search it to suggest to my supervisor if I could buy it but I can not find any link as of yet to get it. I hope I can find the book as it clearly would help me a great deal.
    – Waqas
    Sep 17 '14 at 7:32












    Sorry that it doesn't work. Amazon gives also a preview, not these pages, but at least the bibliography. Maybe this helps.
    – Karl
    Sep 17 '14 at 8:38






    Sorry that it doesn't work. Amazon gives also a preview, not these pages, but at least the bibliography. Maybe this helps.
    – Karl
    Sep 17 '14 at 8:38














    Hi. I got the pages of the book from my library. The pdf involves an integral of which I am finding hard to solve. Could you help. I have posted the integral here
    – Waqas
    Sep 22 '14 at 4:11




    Hi. I got the pages of the book from my library. The pdf involves an integral of which I am finding hard to solve. Could you help. I have posted the integral here
    – Waqas
    Sep 22 '14 at 4:11











    -2














    Please look at this work 1 which has investigated the interference from neighbor cells, and hence, investigated the distribution of distances between users. Hope it works for you.






    share|cite|improve this answer




























      -2














      Please look at this work 1 which has investigated the interference from neighbor cells, and hence, investigated the distribution of distances between users. Hope it works for you.






      share|cite|improve this answer


























        -2












        -2








        -2






        Please look at this work 1 which has investigated the interference from neighbor cells, and hence, investigated the distribution of distances between users. Hope it works for you.






        share|cite|improve this answer














        Please look at this work 1 which has investigated the interference from neighbor cells, and hence, investigated the distribution of distances between users. Hope it works for you.







        share|cite|improve this answer














        share|cite|improve this answer



        share|cite|improve this answer








        edited Jun 28 '16 at 13:54

























        answered Jun 28 '16 at 11:42









        user76648

        13




        13






























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