Some Interesting Probability Limit Theorems About Plane Partitions of Bounded Height by Shalosh B. Ekhad Theorem Number , 1, : Consider the set of plane partitions whose 3D Ferrers diagram is inside an n by n by , 1, box Let the r.v. be the: the number of cells The even, 2r-th, moment, about the mean is (asymptotically, ignoring 1 ----, and beyond): 3 n 2 3 r (2/3 n + 7/12 n + 1/6 n ) (2 r)! / 2 \ | 3 r (-1 + r) r (-1 + r) (63 r - 75 r + 248)| / r |1 - ------------ + -------------------------------| / (r! 2 ) | 10 n 2 | / \ 1400 n / 2 3 The variance is, 2/3 n + 7/12 n + 1/6 n After dividing by the variance to the power r (i.e. normalizing it) we get that the normalized 2r-th moment is / 2 \ | 3 r (-1 + r) r (-1 + r) (63 r - 75 r + 248)| (2 r)! |1 - ------------ + -------------------------------| | 10 n 2 | \ 1400 n / ----------------------------------------------------------- r r! 2 In particular, it follows that this discrete prob. dist. is asymptotically normal, but it does much more! We have established the asymptotic to, 3, terms . Of course, by symmetry, all the odd moments are zero but we can derive this directly, getting that the odd moments eqaul 0 Theorem Number , 2, : Consider the set of plane partitions whose 3D Ferrers diagram is inside an n by n by , 2, box Let the r.v. be the: the number of cells The even, 2r-th, moment, about the mean is (asymptotically, ignoring 1 ----, and beyond): 3 n 2 3 r (5/3 n + 4/3 n + 1/3 n ) (2 r)! / 2 \ | 3 r (-1 + r) r (-1 + r) (63 r - 75 r + 458)| / r |1 - ------------ + -------------------------------| / (r! 2 ) | 20 n 2 | / \ 5600 n / 2 3 The variance is, 5/3 n + 4/3 n + 1/3 n After dividing by the variance to the power r (i.e. normalizing it) we get that the normalized 2r-th moment is / 2 \ | 3 r (-1 + r) r (-1 + r) (63 r - 75 r + 458)| (2 r)! |1 - ------------ + -------------------------------| | 20 n 2 | \ 5600 n / ----------------------------------------------------------- r r! 2 In particular, it follows that this discrete prob. dist. is asymptotically normal, but it does much more! We have established the asymptotic to, 3, terms . Of course, by symmetry, all the odd moments are zero but we can derive this directly, getting that the odd moments eqaul 0 Theorem Number , 3, : Consider the set of plane partitions whose 3D Ferrers diagram is inside an n by n by , 3, box Let the r.v. be the: the number of cells The even, 2r-th, moment, about the mean is (asymptotically, ignoring 1 ----, and beyond): 3 n 2 3 r (3 n + 9/4 n + 1/2 n ) (2 r)! / 2 \ | r (-1 + r) r (-1 + r) (21 r - 25 r + 176)| / r |1 - ---------- + -------------------------------| / (r! 2 ) | 10 n 2 | / \ 4200 n / 2 3 The variance is, 3 n + 9/4 n + 1/2 n After dividing by the variance to the power r (i.e. normalizing it) we get that the normalized 2r-th moment is / 2 \ | r (-1 + r) r (-1 + r) (21 r - 25 r + 176)| (2 r)! |1 - ---------- + -------------------------------| | 10 n 2 | \ 4200 n / --------------------------------------------------------- r r! 2 In particular, it follows that this discrete prob. dist. is asymptotically normal, but it does much more! We have established the asymptotic to, 3, terms . Of course, by symmetry, all the odd moments are zero but we can derive this directly, getting that the odd moments eqaul 0 Theorem Number , 4, : Consider the set of plane partitions whose 3D Ferrers diagram is inside an n by n by , 4, box Let the r.v. be the: the number of cells The even, 2r-th, moment, about the mean is (asymptotically, ignoring 1 ----, and beyond): 3 n 2 3 r (14/3 n + 10/3 n + 2/3 n ) (2 r)! / 2 \ | 3 r (-1 + r) r (-1 + r) (63 r - 75 r + 458)| / r |1 - ------------ + -------------------------------| / (r! 2 ) | 40 n 2 | / \ 22400 n / 2 3 The variance is, 14/3 n + 10/3 n + 2/3 n After dividing by the variance to the power r (i.e. normalizing it) we get that the normalized 2r-th moment is / 2 \ | 3 r (-1 + r) r (-1 + r) (63 r - 75 r + 458)| (2 r)! |1 - ------------ + -------------------------------| | 40 n 2 | \ 22400 n / ----------------------------------------------------------- r r! 2 In particular, it follows that this discrete prob. dist. is asymptotically normal, but it does much more! We have established the asymptotic to, 3, terms . Of course, by symmetry, all the odd moments are zero but we can derive this directly, getting that the odd moments eqaul 0 This took, 199.847, seconds