## The Annals of Mathematical Statistics

- Ann. Math. Statist.
- Volume 33, Number 4 (1962), 1440-1449.

### On Constructing the Fractional Replicates of the $2^m$ Designs with Blocks

#### Abstract

The problem of constructing fractional replicates of the $s^m$ designs, where $s$ is a prime power is not new in literature. There are several papers which deal with this problem. However, so far as the subject matter of this paper is concerned, the contributions made by Banerjee [2], Rao [8], Dykstra [6] and very recently by Addelman [1] are of special interest. This is yet another attempt in the same direction. The basic concept is the same as in [8], where Rao gives a method of obtaining block designs for the fractional replicates of the $s^m$ designs so as to estimate the main effects and the two-factor interactions orthogonally assuming all other interactions to be absent. With the same assumptions, a method of construction is given in this paper which gives in many cases block designs for the fractional replicates of the $2^m$ designs with lesser number of treatment combinations than that of the corresponding fractional designs given earlier. This is achieved by allowing the estimates to be correlated. The scheme allows the estimates of treatment-effects and block effects to be mutually orthogonal. An additional example is given at the end to indicate the possibility of improving the construction.

#### Article information

**Source**

Ann. Math. Statist., Volume 33, Number 4 (1962), 1440-1449.

**Dates**

First available in Project Euclid: 27 April 2007

**Permanent link to this document**

https://projecteuclid.org/euclid.aoms/1177704375

**Digital Object Identifier**

doi:10.1214/aoms/1177704375

**Mathematical Reviews number (MathSciNet)**

MR142177

**Zentralblatt MATH identifier**

0109.37204

**JSTOR**

links.jstor.org

#### Citation

Patel, M. S. On Constructing the Fractional Replicates of the $2^m$ Designs with Blocks. Ann. Math. Statist. 33 (1962), no. 4, 1440--1449. doi:10.1214/aoms/1177704375. https://projecteuclid.org/euclid.aoms/1177704375