GRBDs versus RCBDs: Replication and interaction Like a
randomized complete block design (RCBD), a GRBD is randomized. Within each block, treatments are
randomly assigned to
experimental units: this randomization is also independent between blocks. In a (classic) RCBD, however, there is no replication of treatments within blocks.
Two-way linear model: Blocks and treatments The experimental design guides the formulation of an appropriate
linear model. Without replication, the (classic) RCBD has a
two-way linear-model with treatment- and block-effects but
without a block-treatment
interaction. Without replicates, this two-way linear-model that may be estimated and tested without making parametric assumptions (by using the randomization distribution, without using a normal distribution for the error). In the RCBD, the block-treatment interaction cannot be estimated using the randomization distribution;
a fortiori there exists no "valid" (i.e. randomization-based) test for the block-treatment interaction in the
analysis of variance (anova) of the RCBD. The distinction between RCBDs and GRBDs has been ignored by some authors, and the ignorance regarding the GRCBD has been criticized by statisticians like
Oscar Kempthorne and Sidney Addelman. The GRBD has the advantage that
replication allows block-treatment interaction to be studied.
GRBDs when block-treatment interaction lacks interest However, if block-treatment interaction is known to be negligible, then the experimental protocol may specify that the interaction terms be assumed to be zero and that their degrees of freedom be used for the error term. GRBD designs for models without interaction terms offer more degrees of freedom for testing treatment-effects than do RCBs with more blocks: An experimenter wanting to increase power may use a GRBD rather than RCB with additional blocks, when extra blocks-effects would lack genuine interest. ==Multivariate analysis==