Page 107 - Linear Models for the Prediction of Animal Breeding Values 3rd Edition
P. 107
In the next section, some of the bull solutions are partitioned to contributions
from various sources to gain a better understanding of MACE.
Equations for partitioning bull evaluations from MACE
The equations for sire proofs from Eqn 5.15 are:
(5.16)
−1
−1
−1
−1
−1
ˆ
(Z′R Z + A −1 Ä G )a = (A Q Ä G )gˆ + Z′R (y - Xcˆ)
where:
ˆ a = Qg ˆ + ˆ s
Thus Eqn 5.16 can be expressed as:
(Z′R Z + A −1 Ä G )a = (A Q Ä G )gˆ + Z′R −1 Z(CD) (5.17)
−1
−1
ˆ
−1
−1
where:
−1
−1
−1
CD = (Z′R Z) (Z′R (y - Xcˆ))
CD (country deviation) is simply a vector of weighted average of corrected DRP in
all countries where the bull has a daughter, the weighting factor being the reciprocal
−1
of EDC multiplied by the residual variance in each country. Since R is diagonal, CD
is equal to the vector (y − Xc).
ˆ
For a particular bull with a direct progeny (e.g. son), Eqn 5.17 can be written as:
−1 −1 )a −1 (a ˆ + 0.5(a ˆ + g)) + Z′R Z(CD)
−1
ˆ
ˆ
(Z′R Z + G a bull bull = G a par sire mgs
−1 (a ˆ - 0.25a ˆ ) (5.18)
+ G ∑a prog prog mate
1
8
2
8
where a = , , or if both sire and MGS (maternal grandsire), only MGS, only sire
par 11 15 3 2
= if bull’s mate (MGS of the progeny)
8
or no parents are known, respectively; and a prog 11
2
3 par prog
is known or if unknown. The above values for a and a are based on the assump-
−1
tion that A has been calculated without accounting for inbreeding. Note that in Eqn 5.18:
bull par prog
a = 2a + 0.5a
Equation 5.18 can be expressed as:
−1 −1 −1 −1
ˆ
bull bull par
(Z′R Z + G a )a = 2G a (PA) + (Z′R Z)CD
−1
prog prog mate
+ 0.5G ∑a (2a ˆ - 0.5a ˆ )
where:
PA = 0.5ˆ a sire + 0.25(ˆ a mgs + ) ˆ g
−1 −1 −1
Pre-multiplying both sides of the equation by (Z¢R Z + G a bull ) gives:
ˆ a = W PA + W YD + W PC (5.19)
bull 1 2 3
where:
)¤
ˆ
ˆ
PC = ∑ a prog (2a prog - 0.5a mate ∑ a prog and W + W + W = I
3
2
1
Multivariate Animal Models 91
