Question

Q3 Suppose X1, X2, ..., Xn are i.i.d. Poisson random variables with expected value ). It is well-known that X is an unbiased estimator for l because I = E(X). 1. Show that X1+Xn is also an unbiased estimator for \. 2 2. Show that S2 (Xi-X) = is also an unbaised esimator for \. n-1 3. Find MSE(S2). (We will need two facts) E com/questions/2476527/variance-of-sample-variance) 2. Fact 2: For Poisson distribution, E[(X – u)4] 312 + 1. (See for example, https://www. wolframalpha.com/input/?i=central+moment+of+poisson) 4. Which one, X, S2 or X1+Xn, is the best estimator for ^?

Answer 1

and vor(xi)=A for =1,21.-M. Solo XIX2 - - 1 xn on poisson (2) - Exile EC XIX) & E(X1 + Xn) = (FC) + E(X)] = (1+) 7 El ritmu ) d and This x+xn is on unbiased estimator) 2 of n. s² n 2: {(xi-x72 n-1 .121 ㅗ E cxi- Atx-7) 821 n-1 2 is = d) + n- ว 2 m ê [(x2 -2) - (8-11 ((x2-1) (x-1) -2(K-2) (xi-2)] 2 (ti-A)? + n. 15-112² - 2(8 - x) & cxi-x)] = 1 1 1 2 - 1 ² - 0 CF-47² {(xx-1) n- 821 xil h Since EX - NA lil Now since - n-na = n(x-1). E (%) = El Exi = I ² Erti) = na n ia =d

and var )= you to sxi ) El 1 { voorxi) (xi's are in debondens nz tel 2 (nal = 1 12 = E(Y-x) ² - [yor (i) = E(F-2²) h so n E(51 = 2 2 2 & ECXi-a)? - n EC-d)?] x=1 En in n (1) il n-1 om 3. 2 ارد an unbiased (n-1) = A so s is on unbiased Estimator of de MSE (3) varcs) & (bias (5²))? since estimator, this bias (5²) =0. So MSE (5) vor (5²) Vor (5²) = I [ E(X-1414 0²= Var (X) = d & E (x-1)" = 32²+ こ n-3 n-l ou n Thus (n-3) o n-l Vars (5") = 1/2 [ 317 + 7 - = 1 4 [13 - 13 ) ² +r 1)

- Var (5) = 1 [ 21 + 22 als n-1 14 is an unbiased 2 since f, s², Xitan estimator of Var (81 = 1, Var(5²) = 2x² and + TIS n-l Var moto = (vor () + varr xnd? Ź (211 So If n> 2 than var (x) is minimum Thurs is the best estimator for f.