=>?@/0,J.AnhuiAgric.Sci.2019,47(2):34-37,79 29 0Z $ 1, 2, 2,0 2,0 3 (1. /W0S 1!, / 211200;2. / / &20, / 210095;3. 3 BC, 650000) "# [] -=., - HIJ [ 2] 29- =.*K, 8 11 ) *IJIC,EOPK52IJ, HIJ - =. [$>] 2- =. --5356,' H) Q, OPK* 0.8474 0.8449, OPK* 0.8649 0.8548 [$W]EO PK52* -=. W $%& - ;=.;EOPK5 ' S682.2 + 61 ()* A +, 0517-6611(2019)02-0034-04 doi:10.3969/j.isn.0517-6611.2019.02.011 -./0(1 )()*(OSID): GreyCorrelationDegreeAnalysisof29VarietiesofDahliapinnateCav. WUDan 1,NIEYu jie 2,HUYuan yuan 2 etal (1.NanjingLishuiDistrictSpecialEducationSchool,Nanjing,Jiangsu211200;2.Colegeof Horticulture,NanjingAgriculturalUniversity/LaboratoryofLandscapeDesignoftheMinistryofAgriculture,Nanjing,Jiangsu210095) Abstract [Objective]TorapidlyselectexcelentDahliapinnateCav.varieties,andtoestablishacomprehensiveevaluationsystem forthe screeningofd.pinnate.[method]with29varietiesofd.pinnateasexperimentalmaterials,weselected11quantitativetraitsasevaluationfac tors,andestablishedanevaluationsystembasedonthegreycorelationanalysismethodtocomprehensivelyevaluatetheadvantagesanddisad vantagesofd.pinnatevarieties.[result]twovarietiesofyingyin-535andzitiaowenwerescreened,whichhadmoreful bodied,brightlycol ored,andgoodcomprehensivecharacters.equivalencecorelationsofthetwovarietieswere0.8474,0.8449,andtheirweightedrelationalgrade ofthetwovarietieswere0.8649and0.8548,respectively.[conclusion]thegreycorelationanalysismethodprovidedatheoreticalbasisfor theselectionandbreedingofnewvarietiesofd.pinnate. Keywords DahliapinnateCav.;Variety;Greycorelationdegreeanalysis K(DahliapinnateCav.)K )& K, - 2 KK3U,K+,K, X 4 U, 5 K 67,EL[ GX, [1],EL[ F6 8K X 3X,8 L[-K 4 700 X K X,>8 _ C,.)% X+, E 9 E 8 8 9 C] 4Z K\ X3[\:$Y X9 $A [2],YK X[\ 0H,PUVK X F, N9 1 GH E X,-6 - P,F ; [3-4] 1E KX,] N I9 1,Z 29^ K X K PK PK T P, NZ 29^ X J9,%0,`UV K X H @ 1 :; 1.1 :; /KX3[\$ Y@ 29^ K&X,FX 1 1.2 Y72, ^ XX, 20, bc0 H \] =. DUS"K<X 2345 (1991 ),,,, ^. <=,+, =.<= 6789 2018-09-07 X(Q)- Varietyname 1 [ 0Z Table1 TestedvarietiesofD.pinnate Code X(Q)- Varietyname Code X 1,, X 16 48-\ X 2 N X 17 KK X 3 / X 18 <W X 4 = X 19 >-535 X 5 >N ' X 20? 0 X 6 X 21 c@ X 7 A BC X 22 >-155 X 8 X 23 E X 9 X 24 N X 10 %I X 25 N X 11 U X 26 X 12 F2G X 27 44-\ X 13 NHI X 28 65-\ X 14,J. X 29 ck X 15 45,#C 299;X ^ X Y7 A 5, X 11^TP, K PK T PT PK PK6 X A 1 N UPOV(,- X$ ). K DUS [5] 2 >* > O8 0;N0; K N0; PK&GK,K N0; PK&GK,K N0 J 1.3 1\ N9 1 29^; X) 1^ N!, ^ X)! 1^ 5 2;
47 2 29- =.EOPK5 35 TA x 0, TA x i,i=1,2,,n,$ x 0 ={x 0 (1), x 0 (2),,x 0 (n)},x i ={x i (1),x i (2),,x i (n)},i=1,2,,n,t min min x 0 (k) +ρmax max x 0 (k) i (k)= x 0 (k) +ρmax max x 0 (k) (1), i (k) x 0 x i E k T.,_ x 0 (k)- xδ i (k) _ =Δ i (k), x 0 TA x i TAE KZR ρ 9T,.AJ 0~1,A 0.5 8 9Z,,T, JTA x i (k)z; TA x 0 (k), a: γ i = 1 n n i (k) i=1 ` ; [6] 1, MicrosoftExcel 2016 8 2 2.1 ST0Z# %0;A,.;X X 0 H PJ,!X B6F,; K PJ,;X 11^P +J, 8 1^; TA, ;XP 2 > 2?, 6K ),,J..XRS (P<0.05);6 2^ X 6>. XRS; ck.xrs;.xrs;f2gpk T.XRS;.X RS 2 ST0Z# Table2 ComparisonofthemaincharactersofD.pinnate X Culti var K mm ofsawt oothes PK T P KT Lengthof Widthof X 1 123.75cde 23.56bc 11.70fghij 6.05efg 72.40gh 8.54bcd 45.38cdefg 93.13fg 57.75efghij 3.59gh 2.04efg X 2 25.75o 5.00lm 6.08l 3.60fg 68.82gh 6.55defghi32.88efghij 67.13hijk 30.63mn 2.80j 1.65ijk X 3 86.00ijk 22.63b 9.16ghijkl 4.66fg 134.64cd 6.84defghi28.63ghijkl 97.00fg 38.25jklmn 5.45de 2.04ef X 4 121.60ef 17.56bcd 9.89ghijkl 5.65efg 143.66b 8.04cdefg 66.13b 95.25fg 46.13ghijklm 6.31ab 2.79b X 5 73.25klm 12.51efghijk 9.31ghijkl 5.04efg 80.05g 6.55defgh 51.75bcde 55.63lmnop 56.88efghi 4.06fg 1.71hi X 6 139.88ab 15.13defg 14.44ef 5.50efg 125.22cd 5.71fghij 43.75cdefg 84.63ghij 66.63def 5.64bc 2.24de X 7 79.88jkl 11.38efghijkl10.11ghijkl 4.53fg 97.58f 3.68ij 31.00fghijk 150.63b 65.88def 4.60f 2.20efg X 8 139.13abc 20.58cdef 10.13ghijk 5.70fg 136.47cd 4.11hij 69.50b 136.25bc 59.75efghi 6.30bc 2.73bc X 9 132.20abc 14.56defgh 7.68ghijkl 3.66fg 72.75gh 11.15ab 39.00defgh 87.80fgh 95.80ab 3.22hij 2.08efg X 10 127.00bcd 7.70ijklm 8.88ghijkl 4.06fg 72.42gh 8.96bcd 19.60hijkl 97.60efg 63.80defgh 3.20hij 1.92fgh X 11 132.20abc 19.90bcd 11.22fgh 6.58ef 76.67g 12.93a 16.00ijkl 43.00op 52.60efghijk 3.26hij 2.48cd X 12 116.60def 8.44hijklm 11.00fghi 5.62efg 117.70de 7.75cdefg 38.00efghi 139.60b 45.00hijklm 5.10e 2.52cd X 13 24.68o 4.38m 7.12jkl 4.08fg 65.15gh 4.83ghij 15.40jkl 59.60klmno 58.60efghi 3.16hij 1.62hij X 14 27.74o 7.42jklm 7.80ghijkl 3.58fg 62.80ghi 3.16j 6.80l 45.20nop 52.00efghij 3.16hij 1.68hi X 15 104.40fg 14.20defgh 16.06de 8.26de 163.33a 8.17bcdef 19.60hijkl 148.80b 89.00bc 6.96a 3.22a X 16 59.20mn 8.30hijklm 8.72ghijkl 4.00fg 62.75ghi 3.78ij 53.40bcdef 78.80ghijk 64.00defg 3.20hij 1.06lm X 17 109.60ef 10.50fghijklm 11.36fg 6.30ef 130.77cd 11.32ab 21.80efghij 86.80fghi 70.80de 6.70ab 3.22a X 18 58.20n 10.60fghijklm 7.58hijkl 4.62fg 77.73g 5.18fghij 50.80ghijk 115.60de 101.40ab 3.06hij 1.84fgh X 19 68.40lmn 5.20m 7.46ijkl 2.46g 71.04gh 5.54efghij37.60bcd 120.00cd 54.40efghij 3.34hi 1.02lm X 20 83.80ijk 15.20defg 6.74kl 3.82fg 91.79f 2.43j 30.00efghij 65.20jklmn 78.00cd 4.20fg 1.88fgh X 21 136.00abc 30.97b 24.60b 21.33a 72.46gh 10.72abc 59.67a 47.00mnop 41.00ijklmn 3.64gh 1.34jkl X 22 71.00klm 12.98efghij 20.54c 16.92b 73.31gh 8.59bcde 36.00ghijkl 68.60hijkl 58.20efghi 3.18hij 1.26kl X 23 137.40abc 5.64klm 27.72a 22.68a 114.96e 12.31a 116.00kl 36.20p 23.60n 4.40f 1.84fgh X 24 140.00ab 17.20cde 20.26c 16.40b 72.31gh 8.93bcd 25.80fghijk 183.80a 39.20jklmn 3.58gh 2.28de X 25 71.20klm 9.00ghijklm 10.10ghijkl 4.84fg 44.79j 4.57ghij 12.20ghijkl 80.00ghijk 51.00fghijkl 1.98k 1.16lm X 26 86.20ij 9.10ghijklm 18.52cd 15.12b 57.41hij 8.77bcde 29.00cdefgh 106.00def 35.20klmn 2.68ij 1.32jkl X 27 101.20gh 11.80efghijkl16.34de 11.94c 49.87ij 5.00fghij 25.40bc 49.20lmnop107.00a 2.04k 0.84m X 28 90.40hi 14.00defghi 19.24cd 10.44cd 70.41gh 5.60efghij41.00efghij 66.80ijklm 33.40lmn 2.84ij 1.34jkl X 29 144.80a 36.16a 16.64de 15.60b 100.77f 7.57cdefg 60.80jk 60.40klmno 32.00mn 5.82cd 1.80ghi : A[ G N `E 0.05S RS Note:Diferentlowercasesinthesamecolumnindicatedsignificantdiferencesat0.05levelbetweentreatments 2.2 ST0Z#R)` P > 2 AX [PJ [,X P "S,E 9Z 2T % ] N, / 3
36 b 2019B 3 ST0Z#R)` P Table3 ResultsofthedimensionlesvaluesofthemaincharactersofdiferentvarietiesofD.pinnate X K of Lengthof Widthof X 0 1.0000 1.0000 1.0000 1.0000 1.0000 1.0000 1.0000 1.0000 1.0000 1.0000 1.0000 X 1 1.2765 1.7015 0.9262 0.7529 0.8138 1.1946 1.1719 1.0526 1.0041 0.8856 1.0722 X 2 0.2656 0.3611 0.4760 0.4480 0.7735 0.9167 0.8491 0.7587 0.5325 0.6912 0.8683 X 3 0.8871 1.6338 0.7253 0.5802 1.5133 0.9575 0.7393 1.0964 0.6651 1.3453 1.0722 X 4 1.2545 1.2683 0.7827 0.7031 1.6147 1.1254 1.7078 1.0766 0.8020 1.5582 1.4669 X 5 0.7556 0.9036 0.7372 0.6269 0.8997 0.9169 1.3365 0.6287 0.9889 1.0028 0.9012 X 6 1.4428 1.0922 1.1429 0.6844 1.4075 0.7990 1.1299 0.9565 1.1584 1.3916 1.1775 X 7 0.8239 0.8214 0.8005 0.5631 1.0967 0.5152 0.8006 1.7026 1.1454 1.1386 1.1577 X 8 1.4351 1.4858 0.8015 0.7093 1.5339 0.5752 1.7950 1.5401 1.0389 1.5551 1.4340 X 9 1.3636 1.0514 0.6080 0.4555 0.8177 1.5605 1.0072 0.9924 1.6657 0.7948 1.0946 X 10 1.3100 0.5560 0.7030 0.5052 0.8140 1.2530 0.5062 1.1032 1.1093 0.7899 1.0104 X 11 1.3636 1.4371 0.8882 0.8188 0.8618 1.8087 0.4132 0.4860 0.9146 0.8047 1.3051 X 12 1.2027 0.6095 0.8708 0.6994 1.3230 1.0845 0.9814 1.5779 0.7824 1.2589 1.3261 X 13 0.2546 0.3163 0.5636 0.5077 0.7323 0.6755 0.3977 0.6737 1.0189 0.7800 0.8525 X 14 0.2861 0.5358 0.6175 0.4455 0.7065 0.4427 0.1756 0.5109 0.9041 0.7800 0.8841 X 15 1.0769 1.0254 1.2714 1.0279 1.8358 1.1430 0.5062 1.6819 1.5475 1.7180 1.6945 X 16 0.6106 0.5994 0.6903 0.4978 0.7053 0.5286 1.3791 0.8907 1.1128 0.7899 0.5578 X 17 1.1305 0.7582 0.8993 0.7840 1.4699 1.5837 0.5630 0.9811 1.2310 1.6539 1.6945 X 18 0.6003 0.7655 0.6001 0.5749 0.8737 0.7247 1.3120 1.3067 1.7631 0.7553 0.9683 X 19 0.7055 0.3755 0.5906 0.3061 0.7985 0.7751 0.9711 1.3564 0.9459 0.8245 0.5368 X 20 0.8644 1.0977 0.5336 0.4754 1.0317 0.3400 0.7748 0.7370 1.3562 1.0368 0.9893 X 21 1.4028 2.2362 1.9474 2.6548 0.8144 1.4998 1.5410 0.5313 0.7129 0.8985 0.7052 X 22 0.7324 0.9373 1.6260 2.1056 0.8240 1.2012 0.9298 0.7754 1.0119 0.7850 0.6631 X 23 1.4173 0.4073 2.1944 2.8224 1.2922 1.7222 2.9959 0.4092 0.4103 1.0861 0.9683 X 24 1.4441 1.2421 1.6039 2.0409 0.8128 1.2488 0.6663 2.0775 0.6816 0.8837 1.1998 X 25 0.7344 0.6499 0.7996 0.6023 0.5035 0.6399 0.3151 0.9043 0.8868 0.4888 0.6104 X 26 0.8891 0.6571 1.4661 1.8816 0.6453 1.2264 0.7490 1.1981 0.6120 0.6615 0.6946 X 27 1.0439 0.8521 1.2935 1.4858 0.5605 0.6995 0.6560 0.5561 1.8605 0.5036 0.4420 X 28 0.9325 1.0110 1.5231 1.2992 0.7914 0.7832 1.0589 0.7551 0.5807 0.7010 0.7052 X 29 1.4936 2.6113 1.3173 1.9413 1.1326 1.0588 1.5703 0.6827 0.5564 1.4366 0.9472 2.3 $ 1 ] Δi(k), Δ i (k)= _ X 0 (k)-x i (k) _,. i=1,2,3,,10,k=1,2,3, 3T D_,;X6;XZ RJ Δ i (k)?`2 2^? J6 GJ,. J 1.82, GJ 0 2 2^? RD_T, (1),A ρ=0.5, / 4 4 ST0Z $^_ Table4 CorrelationdegreematrixofdiferentvarietiesofD.pinnate X K of Length Width X 1 0.7670 0.5647 0.9250 0.7864 0.8301 0.8238 0.8411 0.9453 0.9955 0.8883 0.9265 X 2 0.5534 0.5875 0.6346 0.6224 0.8007 0.9162 0.8577 0.7904 0.6606 0.7466 0.8736 X 3 0.8896 0.5894 0.7682 0.6843 0.6393 0.9553 0.7773 0.9042 0.7310 0.7249 0.9265 X 4 0.7814 0.7723 0.8073 0.7540 0.5968 0.8789 0.5625 0.9223 0.8213 0.6198 0.6609 X 5 0.7883 0.9042 0.7759 0.7092 0.9008 0.9163 0.7300 0.7102 0.9880 0.9969 0.9021 X 6 0.6727 0.9080 0.8643 0.7425 0.6907 0.8191 0.8751 0.9544 0.8517 0.6991 0.8368 X 7 0.8379 0.8360 0.8202 0.6756 0.9039 0.6524 0.8203 0.5643 0.8622 0.8678 0.8523 X 8 0.6766 0.6520 0.8210 0.7579 0.6302 0.6817 0.5337 0.6276 0.9590 0.6211 0.6771 X 9 0.7145 0.9465 0.6989 0.6256 0.8331 0.6188 0.9921 0.9917 0.5775 0.8160 0.9058 X 10 0.7459 0.6721 0.7539 0.6478 0.8303 0.7825 0.6482 0.8981 0.8928 0.8124 0.9887 X 11 0.7145 0.6755 0.8906 0.8340 0.8682 0.5295 0.6080 0.6391 0.9142 0.8233 0.7489 X 12 0.8178 0.6997 0.8757 0.7517 0.7381 0.9150 0.9800 0.6116 0.8070 0.7785 0.7362 X 13 0.5497 0.5710 0.6759 0.6489 0.7727 0.7371 0.6017 0.7361 0.9797 0.8053 0.8605 X 14 0.5604 0.6622 0.7040 0.6214 0.7561 0.6202 0.5247 0.6504 0.9047 0.8053 0.8870 8
47 2 29- =.EOPK5 37 ` 4 X K of Length Width X 15 0.9221 0.9728 0.7703 0.9703 0.5212 0.8642 0.6482 0.5716 0.6244 0.5590 0.5672 X 16 0.7003 0.6943 0.7461 0.6444 0.7554 0.6587 0.7059 0.8928 0.8897 0.8124 0.6730 X 17 0.8746 0.7901 0.9004 0.8082 0.6595 0.6092 0.6756 0.9797 0.7975 0.5819 0.5672 X 18 0.6948 0.7951 0.6947 0.6816 0.8781 0.7677 0.7447 0.7479 0.5439 0.7881 0.9663 X 19 0.7555 0.5930 0.6897 0.5674 0.8187 0.8018 0.9692 0.7186 0.9439 0.8383 0.6627 X 20 0.8703 0.9031 0.6611 0.6343 0.9663 0.5796 0.8016 0.7758 0.7187 0.9612 0.9884 X 21 0.6932 0.4240 0.4899 0.3548 0.8306 0.6455 0.6272 0.6600 0.7602 0.8997 0.7553 X 22 0.7727 0.9356 0.5924 0.4515 0.8379 0.8189 0.9283 0.8020 0.9870 0.8089 0.7298 X 23 0.6856 0.6056 0.4324 0.3330 0.7570 0.5575 0.3132 0.6063 0.6068 0.9135 0.9663 X 24 0.6720 0.7899 0.6011 0.4665 0.8294 0.7853 0.7317 0.4579 0.7408 0.8867 0.8199 X 25 0.7741 0.7222 0.8195 0.6959 0.6470 0.7165 0.5706 0.9048 0.8893 0.6403 0.7002 X 26 0.8914 0.7263 0.6613 0.5079 0.7195 0.8008 0.7838 0.8212 0.7011 0.7289 0.7488 X 27 0.9540 0.8602 0.7561 0.6519 0.6743 0.7518 0.7257 0.6721 0.5140 0.6470 0.6199 X 28 0.9309 0.9881 0.6350 0.7526 0.8135 0.8076 0.9392 0.7879 0.6846 0.7527 0.7553 X 29 0.6483 0.3609 0.7415 0.4915 0.8728 0.9393 0.6148 0.7415 0.6723 0.6758 0.9452 2.4 29 0Z $ 5?`),] ai /,X @A[ 9 =, TA ; TA, X, P < 5 ST0Z $ $ Table5 Thegreyrelevantdegreeandrelevantorderofdiferentvari etiesofd.pinnate X a Equalweight Order corelationdegree a Weighted incidence degree Order X 1 0.8449 2 0.8548 2 X 2 0.7312 20 0.7375 21 X 3 0.7809 11 0.7829 10 X 4 0.7434 16 0.7533 16 X 5 0.8474 1 0.8649 1 X 6 0.8104 3 0.8111 6 X 7 0.7903 8 0.7909 9 X 8 0.6943 27 0.6991 25 X 9 0.7928 6 0.7967 8 X 10 0.7884 9 0.8144 5 X 11 0.7496 14 0.7536 15 X 12 0.7919 7 0.7714 12 X 13 0.7217 22 0.7472 20 X 14 0.6997 26 0.7206 22 X 15 0.7265 21 0.6960 27 X 16 0.7430 17 0.7631 13 X 17 0.7494 15 0.7518 17 X 18 0.7548 13 0.7570 14 X 19 0.7599 12 0.7715 11 X 20 0.8055 4 0.8220 3 X 21 0.6491 28 0.6845 28 X 22 0.7877 10 0.8175 4 X 23 0.6161 29 0.6566 29 X 24 0.7074 24 0.7178 24 X 25 0.7346 19 0.7507 18 X 26 0.7355 18 0.7487 19 X 27 0.7116 23 0.6991 25 X 28 0.8043 5 0.8025 7 X 29 0.7004 25 0.7203 23 29^;Xa 5 G > -535? 0 >N ' NHI 5 ^ X P UV, H )<,? XC! D 5,J. 65-\ >-155 5^ P [+ Z,?`. 19^P ^,? X, a 5>-535 >N ' A BC N?`), a >-535 3 E N9 1X5! 91,` 5T N P5` G6 [6-7],< T S-5",`;S, G [8] N9 E K XI H,1'Q,?`Eb [C - P, $ N91Z T2 N9 \.Z,E2Z BUJ., 3 X, &, 9 B UJ\ P. H N9 1IA 29^ K X,$I #1 ` PI XU 1, ^ PZ XU, / ) 0 ] N 9 1Z K &'I E a6 a @ /,>-535 &'U,3Xa 6 a9+ 0.8474 0.8649 E 29^ K X,) P< A.,.&' \ 3,3Xa6 a9+ 0.8449 0.8548 XN 0UV X C,,? H., P R K&'IJ,GH K2 KR K S K-&%, ## [ KN K X,R [9] T ( -. 79/)
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