Number of random walks starting from $0$











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Find a number of paths in random walk from $S_0=0$ to $S_{8n}=0$ satisfying the following terms:



(a) $S_k le -2$ for $2 le k le 4n-2$



(b) $S_k > 0$ for $4n le k le 8n$





Theorem: Let $S_0=a$ and $S_n=b$. $N_n(a,b)$ is the number of paths such that $S_0=a$ and $S_n=b$. If $b>0$ then the number of paths satisfying the following terms: 1) $S_0=0$ and $S_n=b$, 2) there doesn't exist $k in {{1,...,n-1}}$ that $S_k=0$, is equal to $frac bn N_n(0,b)$,



where $N_n(a,b) = binom{n}{1/2(n+b-a)}$.



I'm going to use homogeneity in time and in space (random walk properties).



(I don't want to use Catalan numbers in this exercise or any other "proven formulas".)





(a) $S_0=0, S_1=-1, S_2=-2,..., S_{4n-2}=-2$ for $S_k le -2$



then $S_2=0$ and $S_{4n-2}=0$ for $S_k le 0$



and $S_2=0$ ; $S_{4n-2}=0$ for $S_k ge 0$ (symmetry)



so $S_2=0$ ; $S_{4n-1}=1$ for $S_k > 0, ;;3 le k le 4n-1$



and from that $frac bnN_n(0,b)=frac{1}{4n-3} binom{4n-3}{1/2(4n-3+1-0)}=frac{1}{4n-3} binom{4n-3}{2n-1}$



(b)$S_{4n}=0, S_{8n-1}=1$, so $frac bnN_n(0,b)=frac{1}{4n-1} binom{4n-1}{2n}$



Is it a proper usage of the theorem mentioned above? I know how to use it when $S_k> or < ...$, but I'm not sure if I can "transform it" like that when $S_k le or ge ...$.



Please, correct me where I'm wrong or just tell me any tips. Will be grateful for any help.










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    Find a number of paths in random walk from $S_0=0$ to $S_{8n}=0$ satisfying the following terms:



    (a) $S_k le -2$ for $2 le k le 4n-2$



    (b) $S_k > 0$ for $4n le k le 8n$





    Theorem: Let $S_0=a$ and $S_n=b$. $N_n(a,b)$ is the number of paths such that $S_0=a$ and $S_n=b$. If $b>0$ then the number of paths satisfying the following terms: 1) $S_0=0$ and $S_n=b$, 2) there doesn't exist $k in {{1,...,n-1}}$ that $S_k=0$, is equal to $frac bn N_n(0,b)$,



    where $N_n(a,b) = binom{n}{1/2(n+b-a)}$.



    I'm going to use homogeneity in time and in space (random walk properties).



    (I don't want to use Catalan numbers in this exercise or any other "proven formulas".)





    (a) $S_0=0, S_1=-1, S_2=-2,..., S_{4n-2}=-2$ for $S_k le -2$



    then $S_2=0$ and $S_{4n-2}=0$ for $S_k le 0$



    and $S_2=0$ ; $S_{4n-2}=0$ for $S_k ge 0$ (symmetry)



    so $S_2=0$ ; $S_{4n-1}=1$ for $S_k > 0, ;;3 le k le 4n-1$



    and from that $frac bnN_n(0,b)=frac{1}{4n-3} binom{4n-3}{1/2(4n-3+1-0)}=frac{1}{4n-3} binom{4n-3}{2n-1}$



    (b)$S_{4n}=0, S_{8n-1}=1$, so $frac bnN_n(0,b)=frac{1}{4n-1} binom{4n-1}{2n}$



    Is it a proper usage of the theorem mentioned above? I know how to use it when $S_k> or < ...$, but I'm not sure if I can "transform it" like that when $S_k le or ge ...$.



    Please, correct me where I'm wrong or just tell me any tips. Will be grateful for any help.










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      Find a number of paths in random walk from $S_0=0$ to $S_{8n}=0$ satisfying the following terms:



      (a) $S_k le -2$ for $2 le k le 4n-2$



      (b) $S_k > 0$ for $4n le k le 8n$





      Theorem: Let $S_0=a$ and $S_n=b$. $N_n(a,b)$ is the number of paths such that $S_0=a$ and $S_n=b$. If $b>0$ then the number of paths satisfying the following terms: 1) $S_0=0$ and $S_n=b$, 2) there doesn't exist $k in {{1,...,n-1}}$ that $S_k=0$, is equal to $frac bn N_n(0,b)$,



      where $N_n(a,b) = binom{n}{1/2(n+b-a)}$.



      I'm going to use homogeneity in time and in space (random walk properties).



      (I don't want to use Catalan numbers in this exercise or any other "proven formulas".)





      (a) $S_0=0, S_1=-1, S_2=-2,..., S_{4n-2}=-2$ for $S_k le -2$



      then $S_2=0$ and $S_{4n-2}=0$ for $S_k le 0$



      and $S_2=0$ ; $S_{4n-2}=0$ for $S_k ge 0$ (symmetry)



      so $S_2=0$ ; $S_{4n-1}=1$ for $S_k > 0, ;;3 le k le 4n-1$



      and from that $frac bnN_n(0,b)=frac{1}{4n-3} binom{4n-3}{1/2(4n-3+1-0)}=frac{1}{4n-3} binom{4n-3}{2n-1}$



      (b)$S_{4n}=0, S_{8n-1}=1$, so $frac bnN_n(0,b)=frac{1}{4n-1} binom{4n-1}{2n}$



      Is it a proper usage of the theorem mentioned above? I know how to use it when $S_k> or < ...$, but I'm not sure if I can "transform it" like that when $S_k le or ge ...$.



      Please, correct me where I'm wrong or just tell me any tips. Will be grateful for any help.










      share|cite|improve this question















      Find a number of paths in random walk from $S_0=0$ to $S_{8n}=0$ satisfying the following terms:



      (a) $S_k le -2$ for $2 le k le 4n-2$



      (b) $S_k > 0$ for $4n le k le 8n$





      Theorem: Let $S_0=a$ and $S_n=b$. $N_n(a,b)$ is the number of paths such that $S_0=a$ and $S_n=b$. If $b>0$ then the number of paths satisfying the following terms: 1) $S_0=0$ and $S_n=b$, 2) there doesn't exist $k in {{1,...,n-1}}$ that $S_k=0$, is equal to $frac bn N_n(0,b)$,



      where $N_n(a,b) = binom{n}{1/2(n+b-a)}$.



      I'm going to use homogeneity in time and in space (random walk properties).



      (I don't want to use Catalan numbers in this exercise or any other "proven formulas".)





      (a) $S_0=0, S_1=-1, S_2=-2,..., S_{4n-2}=-2$ for $S_k le -2$



      then $S_2=0$ and $S_{4n-2}=0$ for $S_k le 0$



      and $S_2=0$ ; $S_{4n-2}=0$ for $S_k ge 0$ (symmetry)



      so $S_2=0$ ; $S_{4n-1}=1$ for $S_k > 0, ;;3 le k le 4n-1$



      and from that $frac bnN_n(0,b)=frac{1}{4n-3} binom{4n-3}{1/2(4n-3+1-0)}=frac{1}{4n-3} binom{4n-3}{2n-1}$



      (b)$S_{4n}=0, S_{8n-1}=1$, so $frac bnN_n(0,b)=frac{1}{4n-1} binom{4n-1}{2n}$



      Is it a proper usage of the theorem mentioned above? I know how to use it when $S_k> or < ...$, but I'm not sure if I can "transform it" like that when $S_k le or ge ...$.



      Please, correct me where I'm wrong or just tell me any tips. Will be grateful for any help.







      probability-theory stochastic-processes random-walk catalan-numbers






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      edited Nov 12 at 16:48

























      asked Nov 11 at 8:46









      MacAbra

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