Figure 1.
Figure 1.

Graphical representation of aggregation of 3 breeding values (BV2BV1BV3) with relation to a set of capacities vi, using the Choquet integral [HAG = BV2 + (BV1–BV2)v13 + (BV3–BV1)v3]. Subscripts in parentheses represents a reordered set of breeding values and capacities, such that BV(1)BV(2) ≤ ……. ≤ BV(n).

 


Figure 2.
Figure 2.

Variation of overall preference with respect to the utility of each trait (Pi*BVi), simulated under 2 scenarios (black cicles, OCP1: additive model; grey circles, OCP2: preference penalized by differences between BVADG and BVRNE). Adjusted polynomial lines (order 2) are shown. Pi, average relative preferences; BVi, breeding values; OCP, overall preference.