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Combining genetic gain, gene diversity, time components, cost components when optimizing breeding strategies Two parts: Dag Lindgren Seminar at the research school of forest genetics and breeding Umeå 08-09-15 1. Published 2002-2005 (many heard the essentials 2004, but not the research school doctorands) 2. In press (galley proof received) or preparation (breeders heard parts of it in May, but it is improved calculations, also for meeting tomorrow). Key issues • Strategy; • Genetic Gain; • Gene Diversity; • Time; • Cost. Consider all! The program “Breeding cycler” studies what happens during one complete breeding cycle Mating Selection Long-term breeding Testing Breeding cycler explores selection of selecting the best within a full sib family! Acknowledgement: Large thanks to Swedish breeding for the justification to construct a reasonable simple breeding cycler! Breeding population size is set to 50 and each is parent to two full sib families and from each the best individual is recruited to the next breeding population! Thus - to optimize Swedish breeding - it is usually sufficient to consider a single full sib family. That is the first part. Acknowledgement also to Ola Rosvall, who thought outside the box, and is spiritual father of thinking outside the 50 and a single generation. That is the second part. Inputs • Genetic variance components like: – Additive genetic variation in goal character (goal character is value for forestry but numerically volume production at mature age other characters unchanged) – Juvenile-mature correlation • Time components (duration for different actions) like: – Testing (age at selection) – Crossing – Wait for flowering • Cost components like: – Cost for additional plants – Cost for cycling the breeding population – Cost for additional parents used in crosses • Strategy: Structuring components e.g.: – Wait for flowering - mate - establish field test - select Combined concepts • Genetic Gain (breeding value) and Gene Diversity combined into “Group Merit” (the sum). • Cost expressed per founder and cycle • Time and Cost combined to “annual cost” (yearly budget) •“Group Merit progress at annual cost” combines all issues into a single measure, which can be studied and maximized. How it works… Results • Input parameters • Get results • Use “trial and error” to find what is best Inputs – commonly used • • • • • • • • • • • • • • Chosen to be relevant for to discussions about breeding of Swedish (=Nordic) Norway spruce and Scots pine (we have also made studies on poplars and Eucalyps) Many alternative scenarios evaluated to home in on optimum Annual budget 10 “test plant equivalents per year and founder” Cycling cost 30 per founder Crossing possible at age 10-15 for pine and 20 for spruce Clone testing possible for spruce but not pine CVAm = 14% (additive variation in value (volume) among trees at mature age) Dominance variance ¼ of additive Heritability almost 0.2 (within family heritability =0.1) Note than in breeding cycler papers 2000-2005 is the population considered a single full sib family, thus variance components are within family. That is explained and correct, but may still be misleading. In coming papers we will give it for whole population. Selection gain is created by selecting the best individual from each full sib or through one offspring per grandparent. Diversity loss with balanced 50 founder breeding, “group coancestry”, is punished as percent of forest production (probably high estimate) Rotation age 60 Juvenile-mature correlation according to Lambeth (1981). Comparison of main testing strategies – best genotypes are selected based on • Progeny – trees with good progeny • Clone – trees with good vegetative copies • Phenotype – trees with good appearance 0.6 0.5 Annual Group Merit, % 0.4 Clone 0.3 Phenotype 0.2 Progeny 0.1 0.0 0 0.1 0.2 0.3 0.4 0.5 0.6 Narrow-sense within family heritability Clone test strategy is best • Clone was superior for all realistic scenarios. • Swedish breeding uses clone testing with near optimal design (acc to breeding cycler) for Norway spruce and has initiated it for lodgepole pine. Development with clone testing is initiated for Scots pine. These approaches are strongly supported by BREEDING CYCLER results. • The optimal scenario for Norway spruce suggests later selection age in field trials than Swedish breeding heads for (20 instead of 15 years). The late sexual maturity of Norway spruce is an argument. Phenotypic selection may be slightly superior to Progeny-testing, for the most realistic scenarios Time for initiation (flowering) Annual Group Merit , % 0.20 Progeny 0.15 0.10 Phenotype 0.05 0 3 6 9 12 Delay before establishment of selection test (years) 15 18 Early flowering improves the efficiency of progeny-testing only marginally. Early flowering may make progeny-testing marginally superior to selection on phenotype Annual budget Annual Group Merit , % 0.3 0.2 Phenotype 0.1 Progeny 0.0 0 5 10 15 20 25 Budget per year and parent Phenotype get more superior at low budget, progeny slightly superior at high budget As phenotypic and progeny are similar, it seems logic to combine them in a two-stage strategy. Pre-selection of phenotypes, which are progeny-tested and the best reselected. Waiting time to sexual maturity is used for phenotypic testing! Phenotype/Progeny strategy Mating Stage1: Phenotype test and pre-selection Reselection based on performance of the progeny Stage 2:.Sexual propagation of pre-selected individuals Testing of the progeny Phenotype/Progeny strategy superior to either single stage strategy for most relevant cases At high budget, successful flower stimulation and low heritability, progeny test is superior. At low budget, high heritability, low cycling cost and low penalty for diversity, phenotypic selection is preferable. • Early flowering at age 3 can make progeny-test compatible with 2-stage • Sexual maturity at age 10 seems optimal, but no marked loss if sexual maturity occur first at age 15. Annual Group Merit (%) Result: 2-stage seems preferrable to Scots pine Main scenario 0.6 Pheno/Progeny 0.3 Progeny 0.0 0 5 10 15 20 25 Age of mating for progeny test (years) Suggested good scenario for Scots pine (for one family at given annual budget) Cycle time= 26 Gain=8% Select the best when progenytest is 10 years Stage 2. Progenytest with 30 offspring Mating 3 years Stage 1: Test 70 phenotypes Long-term breeding Cross Polymix (3 years) “Preselect” Select 5 at age 10 Size of the breeding population • The size of the breeding population (50) has been chosen because it is “sufficient”. We tried to optimize with breeding cycler!; • 50 (as used in Sweden) seemed about right for spruce and pine in Sweden; • May be a little lower for Norway spruce; • Maybe a little higher for Scots pine; The rest of the stuff is not published (one study in press, one in manus) • Idea: Keep balance by monitoring grandparents instead of parents. Each grand-parent give the same contribution but parents/grandparent is an input. • “Grandparents” can be regarded a synonym to “founders” for the situation in Sweden (50 founders/bpop). Main result - short • Scots pine in central Sweden with 50 founders (=grandparents) New method (balance among grandparents, 300 parents) Earlier assumed best strategy (phenotypic selection strategy, 50 parents, Hannrup et al 2007) Comparison assuming the same budget and gene diversity Annual Genetic Gain, % • • • 0.3 } 0.25 0.2 = 54% 0.15 0.1 0.05 0 New Current Why phenotypic selection? • Well-documentet (CJFR by Swedish breeders • Advantage of 2-stage not large • Special case of granparental balance with parents/grandparent = 1. SPM with parental balance (almost current Swedish program) Grand parents (=founders), F0 Mating grand parents Select and mate 2 best sibs (…) F1 (…) (…) F2 (…) Green trees show pedigree Multiple SPMs Grandparents F0 =founders Cross 4 best sibs (…) F1 F2 (…) (…) 1st rank family (…) (…) 3rd rank family nth rank family Cross e.g. 4 best sibs in the 2 best families (2 parents per grandparent) (…) 2nd rank family • Note that retrospectively SPM and multiple SPM have identical pedigrees, thus identical increase of coancestry. • Simple SPM (phenotypic selection) is a special case of multiple SPM (“combined selection”) with 1 parent per grandparent. Standard scenario • Heading to be relevant for Scots pine in central Sweden • Costs, field trial plant is the unit, cost components are derived from Hannrup et al. 2007. Genetic variance components derived from Rosvall et al 2001. • Annual budget 50/grandparent • Scots pine, cycling cost 100/grandparent • Added parent 50 • 6 parents/grandparent (near optimal) • Rotation time 70 years • Field test selection at 15 (optimal slightly lower but marginal reduction) • Breeding cycle length 20 years. • Juvenile-mature correlations for Scots pine derived from Jansson et al (2003). 0.5 Jansson et al. 2003 Gwase et al. 2000 Lambeth & Dill 2001 Lambeth 1980 Annual genetic gain, % 0.4 0.3 0.2 0.1 0.0 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20 21 Time, years Jansson et al. 2003 is for Scots pine in southern Sweden, which is most relevant. 15 year testing time seem near optimal. Genetic gain at different parents per grandparent Annual gain, % 0.30 0.25 Parent cost=50 Optimum at 6 54 % better 0.20 Phenotypic strategy 0.15 0 1 2 3 4 5 6 7 8 9 10111213141516 Number of parents per grandparent 0.30 Annual gain, % Cparent=0 Optimum is not strongly dependent on parent cost 0.25 0.20 Cparent=100 Cparent=50 0.15 0 1 2 3 4 5 6 7 8 9 10111213141516 Number of parents per grandparent Optimum number of parents per grandparent 16 Cparent=0 14 12 10.5 Cparent=50 10 8 6 6 Cparent=100 4 4.5 2 0 10 50 100 Annual budget per grandparent Optimum P/GP rises linearly with budget This study supports that the suggested strategy 5 (which will be more discussed 090816) is the best way to breed Scots pine, and suggest the strategy is substantially better than other alternatives. The details of the strategy as suggested in end of December 2007 seem optimal. This is however further investigated. Note that the start (“phenotypic preselection) is identical to the two stage strategy, final decision need to be done first at crossings end