Kirish Intervallardagi elementar amallar Kalit so'zlar
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- 3.2 Xoleskiyning parchalanishi . shaklida yozilgan 2 ÿ ÿ ÿ . A = 2.2 Intervalli matritsalar
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Choleskiyning faktorizatsiyasi deb ataladigan bu parchalanish pastki
uchburchak F matritsaning transpozitsiyasi bilan hosil bo'ladi . ÿ ÿ ÿ 3.1.2 Silvestr mezoni: 1 . Agar A oraliq koeffitsienti simmetrik va musbat aniqlangan kvadrat matritsa bo'lsa, u holda F intervalli koeffitsientli pastki uchburchak matritsa mavjud bo'lib, u quyidagilarga javob beradi: a+b=[a1;a2]+[b1;b2]=[m(a)+m(b)ÿk; [m(a)+m(b)+k] (b2 + a2)ÿ(b1 + a1) . ÿ Kvadrat matritsaning ko‘chirilishi oraliq koeffitsient matritsasi bo‘lib, quyidagicha belgilanadi: AT oraliq koeffitsientli A simmetrik matritsaning satr va ustunlarini almashish natijasida olinadi : A simmetrik matritsa o‘zining transpozitsiyasiga teng bo‘lgan kvadrat matritsadir, ya’ni. shundayki , ai,j = aj,i 1 va n oralig'idagi barcha i va j uchun , bu erda ai,j intervalli matritsa koeffitsientlari, n esa uning tartibi. . a = [ a1; a2] 1 ÿ ÿ ÿ a2 + a1 a2 + a1 agar 0 [a1;a2] intervaliga tegishli bo'lmasa . ÿ 3.2 Xoleskiyning parchalanishi . shaklida yozilgan 2 ÿ ÿ ÿ . A = 2.2 Intervalli matritsalar = |[3.7; 4.3]| = [3.7; 4.3] > 0 [3.7; 4,3] [ÿ1,5;ÿ0,5] [ÿ1,5;ÿ0,5] [3,7; 4.3] aÿb=[a1;a2]ÿ [b1;b2]=[m(a)ÿm(b)ÿk; [m(a)ÿm(b)+k] (b2 + a2)ÿ(b1 + a1) . A n tartibli kvadrat matritsa va interval koeffitsienti shunday bo'lsin: [ÿ1,5;ÿ0,5] [3,7; 4,3] [ÿ1,5;ÿ0,5] . ÿ Agar a = [a1;a2] musbat bo'lsa, a sifatida belgilaymiz 1 An,n ÿBn,n=[0; 0] agar A = B bo'lsa . 2 a ÿ ÿ intervalli koeffitsientli matritsalar holatidan oraliqdagi un intervalli matritsaning aniqlovchisi bundan mustasno. A oraliq koeffitsienti n o'lchamli simmetrik kvadrat matrisa bo'lsin . 1 dan n gacha bo'lgan p uchun Ap = (ai j) n matritsaning determinantlari asosiy minorlar deb ataymiz . ÿ . . ÿ Ko'rinib turibdiki, bu belgi bilan biz × a = a ga egamiz a×b=[a1;a2]×[b1;b2]=[m(a)×m(b)ÿk; [m(a)×(b)+k] bunda k = min(m(a)×m(b)ÿa,bÿ (m(a)×m(b)) a = min(a1b1,a1b2, a2b1,a2b2) va b = max(a1b1,a1b2,a2b1,a2b2) . Download 181.58 Kb. Do'stlaringiz bilan baham: 
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