Matematikada, Appell seriyali to'rttadan iborat gipergeometrik qatorlar F 1 , F 2 , F 3 , F 4 ikkitadan o'zgaruvchilar tomonidan kiritilgan Pol Appell (1880 ) va bu umumlashtiriladi Gaussning gipergeometrik qatorlari 2 F 1 bitta o'zgaruvchining. Appell to'plamini o'rnatdi qisman differentsial tenglamalar shulardan funktsiyalari echimlar bo'lib, bir qator o'zgaruvchan gipergeometrik qatorlar bo'yicha ushbu ketma-ketlikning turli xil kamaytiradigan formulalarini va ifodalarini topdi.
Ta'riflar
Appell seriyasi F 1 | uchun belgilanadix | < 1, |y | <1 juftlik qatori bo'yicha
F 1 ( a , b 1 , b 2 ; v ; x , y ) = ∑ m , n = 0 ∞ ( a ) m + n ( b 1 ) m ( b 2 ) n ( v ) m + n m ! n ! x m y n , {displaystyle F_ {1} (a, b_ {1}, b_ {2}; c; x, y) = sum _ {m, n = 0} ^ {infty} {frac {(a) _ {m + n } (b_ {1}) _ {m} (b_ {2}) _ {n}} {(c) _ {m + n}, m!, n!}}, x ^ {m} y ^ {n } ~,} qayerda ( q ) n {displaystyle (q) _ {n}} Pochhammer belgisi . Ning boshqa qiymatlari uchun x va y funktsiya F 1 tomonidan belgilanishi mumkin analitik davomi . Buni ko'rsatish mumkin[1]
F 1 ( a , b 1 , b 2 ; v ; x , y ) = ∑ r = 0 ∞ ( a ) r ( b 1 ) r ( b 2 ) r ( v − a ) r ( v + r − 1 ) r ( v ) 2 r r ! x r y r 2 F 1 ( a + r , b 1 + r ; v + 2 r ; x ) 2 F 1 ( a + r , b 2 + r ; v + 2 r ; y ) . {displaystyle F_ {1} (a, b_ {1}, b_ {2}; c; x, y) = sum _ {r = 0} ^ {infty} {frac {(a) _ {r} (b_ {) 1}) _ {r} (b_ {2}) _ {r} (ca) _ {r}} {(c + r-1) _ {r} (c) _ {2r} r!}}, X ^ {r} y ^ {r} {} _ {2} F_ {1} chapda (a + r, b_ {1} + r; c + 2r; xight) {} _ {2} F_ {1} chapda ( a + r, b_ {2} + r; c + 2r; yight) ~.} Xuddi shunday, funktsiya F 2 | uchun belgilanadix | + |y | <1 ketma-ket
F 2 ( a , b 1 , b 2 ; v 1 , v 2 ; x , y ) = ∑ m , n = 0 ∞ ( a ) m + n ( b 1 ) m ( b 2 ) n ( v 1 ) m ( v 2 ) n m ! n ! x m y n {displaystyle F_ {2} (a, b_ {1}, b_ {2}; c_ {1}, c_ {2}; x, y) = sum _ {m, n = 0} ^ {infty} {frac { (a) _ {m + n} (b_ {1}) _ {m} (b_ {2}) _ {n}} {(c_ {1}) _ {m} (c_ {2}) _ {n }, m!, n!}}, x ^ {m} y ^ {n}} va uni ko'rsatish mumkin[2]
F 2 ( a , b 1 , b 2 ; v 1 , v 2 ; x , y ) = ∑ r = 0 ∞ ( a ) r ( b 1 ) r ( b 2 ) r ( v 1 ) r ( v 2 ) r r ! x r y r 2 F 1 ( a + r , b 1 + r ; v 1 + r ; x ) 2 F 1 ( a + r , b 2 + r ; v 2 + r ; y ) . {displaystyle F_ {2} (a, b_ {1}, b_ {2}; c_ {1}, c_ {2}; x, y) = sum _ {r = 0} ^ {infty} {frac {(a ) _ {r} (b_ {1}) _ {r} (b_ {2}) _ {r}} {(c_ {1}) _ {r} (c_ {2}) _ {r} r!} }, x ^ {r} y ^ {r} {} _ {2} F_ {1} chapda (a + r, b_ {1} + r; c_ {1} + r; xight) {} _ {2} F_ {1} chapda (a + r, b_ {2} + r; c_ {2} + r; yight) ~.} Shuningdek, funktsiya F 3 uchun |x | < 1, |y | <1 ketma-ketlik bilan aniqlanishi mumkin
F 3 ( a 1 , a 2 , b 1 , b 2 ; v ; x , y ) = ∑ m , n = 0 ∞ ( a 1 ) m ( a 2 ) n ( b 1 ) m ( b 2 ) n ( v ) m + n m ! n ! x m y n , {displaystyle F_ {3} (a_ {1}, a_ {2}, b_ {1}, b_ {2}; c; x, y) = sum _ {m, n = 0} ^ {infty} {frac { (a_ {1}) _ {m} (a_ {2}) _ {n} (b_ {1}) _ {m} (b_ {2}) _ {n}} {(c) _ {m + n }, m!, n!}}, x ^ {m} y ^ {n} ~,} va funktsiyasi F 4 uchun |x |½ + |y |½ <1 seriya bo'yicha
F 4 ( a , b ; v 1 , v 2 ; x , y ) = ∑ m , n = 0 ∞ ( a ) m + n ( b ) m + n ( v 1 ) m ( v 2 ) n m ! n ! x m y n . {displaystyle F_ {4} (a, b; c_ {1}, c_ {2}; x, y) = sum _ {m, n = 0} ^ {infty} {frac {(a) _ {m + n } (b) _ {m + n}} {(c_ {1}) _ {m} (c_ {2}) _ {n}, m!, n!}}, x ^ {m} y ^ {n } ~.} Takrorlanish munosabatlari
Gauss gipergeometrik qatori singari 2 F 1 , "Appell" ning er-xotin seriyasiga sabab bo'ladi takrorlanish munosabatlari qo'shni funktsiyalar orasida. Masalan, Appell uchun bunday aloqalarning asosiy to'plami F 1 tomonidan berilgan:
( a − b 1 − b 2 ) F 1 ( a , b 1 , b 2 , v ; x , y ) − a F 1 ( a + 1 , b 1 , b 2 , v ; x , y ) + b 1 F 1 ( a , b 1 + 1 , b 2 , v ; x , y ) + b 2 F 1 ( a , b 1 , b 2 + 1 , v ; x , y ) = 0 , {displaystyle (a-b_ {1} -b_ {2}) F_ {1} (a, b_ {1}, b_ {2}, c; x, y) -a, F_ {1} (a + 1, b_ {1}, b_ {2}, c; x, y) + b_ {1} F_ {1} (a, b_ {1} + 1, b_ {2}, c; x, y) + b_ {2 } F_ {1} (a, b_ {1}, b_ {2} + 1, c; x, y) = 0 ~,} v F 1 ( a , b 1 , b 2 , v ; x , y ) − ( v − a ) F 1 ( a , b 1 , b 2 , v + 1 ; x , y ) − a F 1 ( a + 1 , b 1 , b 2 , v + 1 ; x , y ) = 0 , {displaystyle c, F_ {1} (a, b_ {1}, b_ {2}, c; x, y) - (ca) F_ {1} (a, b_ {1}, b_ {2}, c +) 1; x, y) -a, F_ {1} (a + 1, b_ {1}, b_ {2}, c + 1; x, y) = 0 ~,} v F 1 ( a , b 1 , b 2 , v ; x , y ) + v ( x − 1 ) F 1 ( a , b 1 + 1 , b 2 , v ; x , y ) − ( v − a ) x F 1 ( a , b 1 + 1 , b 2 , v + 1 ; x , y ) = 0 , {displaystyle c, F_ {1} (a, b_ {1}, b_ {2}, c; x, y) + c (x-1) F_ {1} (a, b_ {1} + 1, b_ {) 2}, c; x, y) - (ca) x, F_ {1} (a, b_ {1} + 1, b_ {2}, c + 1; x, y) = 0 ~,} v F 1 ( a , b 1 , b 2 , v ; x , y ) + v ( y − 1 ) F 1 ( a , b 1 , b 2 + 1 , v ; x , y ) − ( v − a ) y F 1 ( a , b 1 , b 2 + 1 , v + 1 ; x , y ) = 0 . {displaystyle c, F_ {1} (a, b_ {1}, b_ {2}, c; x, y) + c (y-1) F_ {1} (a, b_ {1}, b_ {2} + 1, c; x, y) - (ca) y, F_ {1} (a, b_ {1}, b_ {2} + 1, c + 1; x, y) = 0 ~.} Boshqa har qanday munosabatlar[3] F 1 bu to'rttadan kelib chiqishi mumkin.
Xuddi shunday, Appell's uchun barcha takrorlanadigan munosabatlar F 3 ushbu beshta to'plamdan foydalaning:
v F 3 ( a 1 , a 2 , b 1 , b 2 , v ; x , y ) + ( a 1 + a 2 − v ) F 3 ( a 1 , a 2 , b 1 , b 2 , v + 1 ; x , y ) − a 1 F 3 ( a 1 + 1 , a 2 , b 1 , b 2 , v + 1 ; x , y ) − a 2 F 3 ( a 1 , a 2 + 1 , b 1 , b 2 , v + 1 ; x , y ) = 0 , {displaystyle c, F_ {3} (a_ {1}, a_ {2}, b_ {1}, b_ {2}, c; x, y) + (a_ {1} + a_ {2} -c) F_ {3} (a_ {1}, a_ {2}, b_ {1}, b_ {2}, c + 1; x, y) -a_ {1} F_ {3} (a_ {1} + 1, a_) {2}, b_ {1}, b_ {2}, c + 1; x, y) -a_ {2} F_ {3} (a_ {1}, a_ {2} + 1, b_ {1}, b_ {2}, c + 1; x, y) = 0 ~,} v F 3 ( a 1 , a 2 , b 1 , b 2 , v ; x , y ) − v F 3 ( a 1 + 1 , a 2 , b 1 , b 2 , v ; x , y ) + b 1 x F 3 ( a 1 + 1 , a 2 , b 1 + 1 , b 2 , v + 1 ; x , y ) = 0 , {displaystyle c, F_ {3} (a_ {1}, a_ {2}, b_ {1}, b_ {2}, c; x, y) -c, F_ {3} (a_ {1} +1, a_ {2}, b_ {1}, b_ {2}, c; x, y) + b_ {1} x, F_ {3} (a_ {1} + 1, a_ {2}, b_ {1} +) 1, b_ {2}, c + 1; x, y) = 0 ~,} v F 3 ( a 1 , a 2 , b 1 , b 2 , v ; x , y ) − v F 3 ( a 1 , a 2 + 1 , b 1 , b 2 , v ; x , y ) + b 2 y F 3 ( a 1 , a 2 + 1 , b 1 , b 2 + 1 , v + 1 ; x , y ) = 0 , {displaystyle c, F_ {3} (a_ {1}, a_ {2}, b_ {1}, b_ {2}, c; x, y) -c, F_ {3} (a_ {1}, a_ { 2} + 1, b_ {1}, b_ {2}, c; x, y) + b_ {2} y, F_ {3} (a_ {1}, a_ {2} + 1, b_ {1}, b_ {2} + 1, c + 1; x, y) = 0 ~,} v F 3 ( a 1 , a 2 , b 1 , b 2 , v ; x , y ) − v F 3 ( a 1 , a 2 , b 1 + 1 , b 2 , v ; x , y ) + a 1 x F 3 ( a 1 + 1 , a 2 , b 1 + 1 , b 2 , v + 1 ; x , y ) = 0 , {displaystyle c, F_ {3} (a_ {1}, a_ {2}, b_ {1}, b_ {2}, c; x, y) -c, F_ {3} (a_ {1}, a_ { 2}, b_ {1} + 1, b_ {2}, c; x, y) + a_ {1} x, F_ {3} (a_ {1} + 1, a_ {2}, b_ {1} + 1, b_ {2}, c + 1; x, y) = 0 ~,} v F 3 ( a 1 , a 2 , b 1 , b 2 , v ; x , y ) − v F 3 ( a 1 , a 2 , b 1 , b 2 + 1 , v ; x , y ) + a 2 y F 3 ( a 1 , a 2 + 1 , b 1 , b 2 + 1 , v + 1 ; x , y ) = 0 . {displaystyle c, F_ {3} (a_ {1}, a_ {2}, b_ {1}, b_ {2}, c; x, y) -c, F_ {3} (a_ {1}, a_ { 2}, b_ {1}, b_ {2} + 1, c; x, y) + a_ {2} y, F_ {3} (a_ {1}, a_ {2} + 1, b_ {1}, b_ {2} + 1, c + 1; x, y) = 0 ~.} Hosilalar va differentsial tenglamalar
Appell uchun F 1 , quyidagi hosilalar ikki qatorli ta'rifdan kelib chiqadi:
∂ n ∂ x n F 1 ( a , b 1 , b 2 , v ; x , y ) = ( a ) n ( b 1 ) n ( v ) n F 1 ( a + n , b 1 + n , b 2 , v + n ; x , y ) {displaystyle {frac {qisman ^ {n}} {qisman x ^ {n}}} F_ {1} (a, b_ {1}, b_ {2}, c; x, y) = {frac {chap (aight ) _ {n} chap (b_ {1} ight) _ {n}} {chap (cight) _ {n}}} F_ {1} (a + n, b_ {1} + n, b_ {2}, c + n; x, y)} ∂ n ∂ y n F 1 ( a , b 1 , b 2 , v ; x , y ) = ( a ) n ( b 2 ) n ( v ) n F 1 ( a + n , b 1 , b 2 + n , v + n ; x , y ) {displaystyle {frac {qisman ^ {n}} {qisman y ^ {n}}} F_ {1} (a, b_ {1}, b_ {2}, c; x, y) = {frac {chap (aight ) _ {n} chap (b_ {2} kun) _ {n}} {chap (cight) _ {n}}} F_ {1} (a + n, b_ {1}, b_ {2} + n, c + n; x, y)} Uning ta'rifidan Appell's F 1 qo'shimcha ravishda quyidagi ikkinchi darajali tizimni qondirishi aniqlandi differentsial tenglamalar :
x ( 1 − x ) ∂ 2 F 1 ( x , y ) ∂ x 2 + y ( 1 − x ) ∂ 2 F 1 ( x , y ) ∂ x ∂ y + [ v − ( a + b 1 + 1 ) x ] ∂ F 1 ( x , y ) ∂ x − b 1 y ∂ F 1 ( x , y ) ∂ y − a b 1 F 1 ( x , y ) = 0 {displaystyle x (1-x) {frac {qisman ^ {2} F_ {1} (x, y)} {qisman x ^ {2}}} + y (1-x) {frac {qisman ^ {2} F_ {1} (x, y)} {qisman x partial y}} + [c- (a + b_ {1} +1) x] {frac {qisman F_ {1} (x, y)} {qisman x} } -b_ {1} y {frac {qisman F_ {1} (x, y)} {qisman y}} - ab_ {1} F_ {1} (x, y) = 0} y ( 1 − y ) ∂ 2 F 1 ( x , y ) ∂ y 2 + x ( 1 − y ) ∂ 2 F 1 ( x , y ) ∂ x ∂ y + [ v − ( a + b 2 + 1 ) y ] ∂ F 1 ( x , y ) ∂ y − b 2 x ∂ F 1 ( x , y ) ∂ x − a b 2 F 1 ( x , y ) = 0 {displaystyle y (1-y) {frac {qisman ^ {2} F_ {1} (x, y)} {qisman y ^ {2}}} + x (1-y) {frac {qisman ^ {2} F_ {1} (x, y)} {qisman xpartial y}} + [c- (a + b_ {2} +1) y] {frac {qisman F_ {1} (x, y)} {qisman y} } -b_ {2} x {frac {qisman F_ {1} (x, y)} {qisman x}} - ab_ {2} F_ {1} (x, y) = 0} Uchun qisman differentsial tenglamalar tizimi F 2 bu
x ( 1 − x ) ∂ 2 F 2 ( x , y ) ∂ x 2 − x y ∂ 2 F 2 ( x , y ) ∂ x ∂ y + [ v 1 − ( a + b 1 + 1 ) x ] ∂ F 2 ( x , y ) ∂ x − b 1 y ∂ F 2 ( x , y ) ∂ y − a b 1 F 2 ( x , y ) = 0 {displaystyle x (1-x) {frac {qisman ^ {2} F_ {2} (x, y)} {qisman x ^ {2}}} - xy {frac {qisman ^ {2} F_ {2} ( x, y)} {qisman xpartial y}} + [c_ {1} - (a + b_ {1} +1) x] {frac {qisman F_ {2} (x, y)} {qisman x}} - b_ {1} y {frac {qisman F_ {2} (x, y)} {qisman y}} - ab_ {1} F_ {2} (x, y) = 0} y ( 1 − y ) ∂ 2 F 2 ( x , y ) ∂ y 2 − x y ∂ 2 F 2 ( x , y ) ∂ x ∂ y + [ v 2 − ( a + b 2 + 1 ) x ] ∂ F 2 ( x , y ) ∂ y − b 2 x ∂ F 2 ( x , y ) ∂ x − a b 2 F 2 ( x , y ) = 0 {displaystyle y (1-y) {frac {qisman ^ {2} F_ {2} (x, y)} {qisman y ^ {2}}} - xy {frac {qisman ^ {2} F_ {2} ( x, y)} {qisman xpartial y}} + [c_ {2} - (a + b_ {2} +1) x] {frac {qisman F_ {2} (x, y)} {qisman y}} - b_ {2} x {frac {qisman F_ {2} (x, y)} {qisman x}} - ab_ {2} F_ {2} (x, y) = 0} Tizimda echim bor
F 2 ( x , y ) = C 1 F 2 ( a , b 1 , b 2 , v 1 , v 2 ; x , y ) + C 2 x 1 − v 1 F 2 ( a − v 1 + 1 , b 1 − v 1 + 1 , b 2 , 2 − v 1 , v 2 ; x , y ) + C 3 y 1 − v 2 F 2 ( a − v 2 + 1 , b 1 , b 2 − v 2 + 1 , v 1 , 2 − v 2 ; x , y ) + C 4 x 1 − v 1 y 1 − v 2 F 2 ( a − v 1 − v 2 + 2 , b 1 − v 1 + 1 , b 2 − v 2 + 1 , 2 − v 1 , 2 − v 2 ; x , y ) {displaystyle F_ {2} (x, y) = C_ {1} F_ {2} (a, b_ {1}, b_ {2}, c_ {1}, c_ {2}; x, y) + C_ { 2} x ^ {1-c_ {1}} F_ {2} (a-c_ {1} + 1, b_ {1} -c_ {1} + 1, b_ {2}, 2-c_ {1}, c_ {2}; x, y) + C_ {3} y ^ {1-c_ {2}} F_ {2} (a-c_ {2} + 1, b_ {1}, b_ {2} -c_ {) 2} + 1, c_ {1}, 2-c_ {2}; x, y) + C_ {4} x ^ {1-c_ {1}} y ^ {1-c_ {2}} F_ {2} (a-c_ {1} -c_ {2} + 2, b_ {1} -c_ {1} + 1, b_ {2} -c_ {2} + 1,2-c_ {1}, 2-c_ { 2}; x, y)} Xuddi shunday, uchun F 3 ta'rifdan quyidagi hosilalar kelib chiqadi:
∂ ∂ x F 3 ( a 1 , a 2 , b 1 , b 2 , v ; x , y ) = a 1 b 1 v F 3 ( a 1 + 1 , a 2 , b 1 + 1 , b 2 , v + 1 ; x , y ) {displaystyle {frac {kısmi} {qisman x}} F_ {3} (a_ {1}, a_ {2}, b_ {1}, b_ {2}, c; x, y) = {frac {a_ {1 } b_ {1}} {c}} F_ {3} (a_ {1} + 1, a_ {2}, b_ {1} + 1, b_ {2}, c + 1; x, y)} ∂ ∂ y F 3 ( a 1 , a 2 , b 1 , b 2 , v ; x , y ) = a 2 b 2 v F 3 ( a 1 , a 2 + 1 , b 1 , b 2 + 1 , v + 1 ; x , y ) {displaystyle {frac {kısalt} {qisman y}} F_ {3} (a_ {1}, a_ {2}, b_ {1}, b_ {2}, c; x, y) = {frac {a_ {2 } b_ {2}} {c}} F_ {3} (a_ {1}, a_ {2} + 1, b_ {1}, b_ {2} + 1, c + 1; x, y)} Va uchun F 3 quyidagi differentsial tenglamalar tizimi olinadi:
x ( 1 − x ) ∂ 2 F 3 ( x , y ) ∂ x 2 + y ∂ 2 F 3 ( x , y ) ∂ x ∂ y + [ v − ( a 1 + b 1 + 1 ) x ] ∂ F 3 ( x , y ) ∂ x − a 1 b 1 F 3 ( x , y ) = 0 {displaystyle x (1-x) {frac {qisman ^ {2} F_ {3} (x, y)} {qisman x ^ {2}}} + y {frac {qisman ^ {2} F_ {3} ( x, y)} {qisman xpartial y}} + [c- (a_ {1} + b_ {1} +1) x] {frac {qisman F_ {3} (x, y)} {qisman x}} - a_ {1} b_ {1} F_ {3} (x, y) = 0} y ( 1 − y ) ∂ 2 F 3 ( x , y ) ∂ y 2 + x ∂ 2 F 3 ( x , y ) ∂ x ∂ y + [ v − ( a 2 + b 2 + 1 ) y ] ∂ F 3 ( x , y ) ∂ y − a 2 b 2 F 3 ( x , y ) = 0 {displaystyle y (1-y) {frac {qisman ^ {2} F_ {3} (x, y)} {qisman y ^ {2}}} + x {frac {qisman ^ {2} F_ {3} ( x, y)} {qisman xpartial y}} + [c- (a_ {2} + b_ {2} +1) y] {frac {qisman F_ {3} (x, y)} {qisman y}} - a_ {2} b_ {2} F_ {3} (x, y) = 0} Uchun qisman differentsial tenglamalar tizimi F 4 bu
x ( 1 − x ) ∂ 2 F 4 ( x , y ) ∂ x 2 − y 2 ∂ 2 F 4 ( x , y ) ∂ y 2 − 2 x y ∂ 2 F 4 ( x , y ) ∂ x ∂ y + [ v 1 − ( a + b + 1 ) x ] ∂ F 4 ( x , y ) ∂ x − ( a + b + 1 ) y ∂ F 4 ( x , y ) ∂ y − a b F 4 ( x , y ) = 0 {displaystyle x (1-x) {frac {qisman ^ {2} F_ {4} (x, y)} {qisman x ^ {2}}} - y ^ {2} {frac {qisman ^ {2} F_ {4} (x, y)} {qisman y ^ {2}}} - 2xy {frac {qisman ^ {2} F_ {4} (x, y)} {qisman xpartial y}} + [c_ {1} - (a + b + 1) x] {frac {qisman F_ {4} (x, y)} {qisman x}} - (a + b + 1) y {frac {qisman F_ {4} (x, y )} {qisman y}} - abF_ {4} (x, y) = 0} y ( 1 − y ) ∂ 2 F 4 ( x , y ) ∂ y 2 − x 2 ∂ 2 F 4 ( x , y ) ∂ x 2 − 2 x y ∂ 2 F 4 ( x , y ) ∂ x ∂ y + [ v 2 − ( a + b + 1 ) y ] ∂ F 4 ( x , y ) ∂ y − ( a + b + 1 ) x ∂ F 4 ( x , y ) ∂ x − a b F 4 ( x , y ) = 0 {displaystyle y (1-y) {frac {qisman ^ {2} F_ {4} (x, y)} {qisman y ^ {2}}} - x ^ {2} {frac {qisman ^ {2} F_ {4} (x, y)} {qisman x ^ {2}}} - 2xy {frac {qisman ^ {2} F_ {4} (x, y)} {qisman x qismli y}} + [c_ {2} - (a + b + 1) y] {frac {qisman F_ {4} (x, y)} {qisman y}} - (a + b + 1) x {frac {qisman F_ {4} (x, y )} {qisman x}} - abF_ {4} (x, y) = 0} Tizimda echim bor
F 4 ( x , y ) = C 1 F 4 ( a , b , v 1 , v 2 ; x , y ) + C 2 x 1 − v 1 F 4 ( a − v 1 + 1 , b − v 1 + 1 , 2 − v 1 , v 2 ; x , y ) + C 3 y 1 − v 2 F 4 ( a − v 2 + 1 , b − v 2 + 1 , v 1 , 2 − v 2 ; x , y ) + C 4 x 1 − v 1 y 1 − v 2 F 4 ( 2 + a − v 1 − v 2 , 2 + b − v 1 − v 2 , 2 − v 1 , 2 − v 2 ; x , y ) {displaystyle F_ {4} (x, y) = C_ {1} F_ {4} (a, b, c_ {1}, c_ {2}; x, y) + C_ {2} x ^ {1-c_ {1}} F_ {4} (a-c_ {1} + 1, b-c_ {1} + 1,2-c_ {1}, c_ {2}; x, y) + C_ {3} y ^ {1-c_ {2}} F_ {4} (a-c_ {2} + 1, b-c_ {2} + 1, c_ {1}, 2-c_ {2}; x, y) + C_ { 4} x ^ {1-c_ {1}} y ^ {1-c_ {2}} F_ {4} (2 + a-c_ {1} -c_ {2}, 2 + b-c_ {1} - c_ {2}, 2-c_ {1}, 2-c_ {2}; x, y)} Integral vakolatxonalar
Appellning juft seriyali tomonidan aniqlangan to'rt funktsiyani quyidagicha ifodalash mumkin er-xotin integral jalb qilish elementar funktsiyalar faqat (Gradshteyn & Ryzhik 2015 yil , §9.184) harv xatosi: maqsad yo'q: CITEREFGradshteynRyzhik2015 (Yordam bering ) . Biroq, Emil Pikard (1881 ) Appellnikini topdi F 1 bir o'lchovli sifatida ham yozilishi mumkin Eyler -tip ajralmas :
F 1 ( a , b 1 , b 2 , v ; x , y ) = Γ ( v ) Γ ( a ) Γ ( v − a ) ∫ 0 1 t a − 1 ( 1 − t ) v − a − 1 ( 1 − x t ) − b 1 ( 1 − y t ) − b 2 d t , ℜ v > ℜ a > 0 . {displaystyle F_ {1} (a, b_ {1}, b_ {2}, c; x, y) = {frac {Gamma (c)} {Gamma (a) Gamma (ca)}} int _ {0} ^ {1} t ^ {a-1} (1-t) ^ {ca-1} (1-xt) ^ {- b_ {1}} (1-yt) ^ {- b_ {2}}, mathrm {d} t, to'rtburchaklar Re, c> Re, a> 0 ~.} Ushbu vakolat vositasi yordamida tekshirilishi mumkin Teylorning kengayishi integralning, so'ngra muddatli termal integratsiyaning.
Maxsus holatlar
Pikardning ajralmas vakili shuni anglatadiki to'liq bo'lmagan elliptik integrallar F va E shuningdek to'liq elliptik integral Π - bu Appell-ning alohida holatlari F 1 :
F ( ϕ , k ) = ∫ 0 ϕ d θ 1 − k 2 gunoh 2 θ = gunoh ( ϕ ) F 1 ( 1 2 , 1 2 , 1 2 , 3 2 ; gunoh 2 ϕ , k 2 gunoh 2 ϕ ) , | ℜ ϕ | < π 2 , {displaystyle F (phi, k) = int _ {0} ^ {phi} {frac {mathrm {d} heta} {sqrt {1-k ^ {2} sin ^ {2} heta}}} = sin (phi ), F_ {1} ({frac {1} {2}}, {frac {1} {2}}, {frac {1} {2}}, {frac {3} {2}}; sin ^ { 2} phi, k ^ {2} sin ^ {2} phi), quad | Re, phi | <{frac {pi} {2}} ~,} E ( ϕ , k ) = ∫ 0 ϕ 1 − k 2 gunoh 2 θ d θ = gunoh ( ϕ ) F 1 ( 1 2 , 1 2 , − 1 2 , 3 2 ; gunoh 2 ϕ , k 2 gunoh 2 ϕ ) , | ℜ ϕ | < π 2 , {displaystyle E (phi, k) = int _ {0} ^ {phi} {sqrt {1-k ^ {2} sin ^ {2} heta}}, mathrm {d} heta = sin (phi), F_ { 1} ({frac {1} {2}}, {frac {1} {2}}, - {frac {1} {2}}, {frac {3} {2}}; sin ^ {2} phi , k ^ {2} sin ^ {2} phi), quad | Re, phi | <{frac {pi} {2}} ~,} Π ( n , k ) = ∫ 0 π / 2 d θ ( 1 − n gunoh 2 θ ) 1 − k 2 gunoh 2 θ = π 2 F 1 ( 1 2 , 1 , 1 2 , 1 ; n , k 2 ) . {displaystyle Pi (n, k) = int _ {0} ^ {pi / 2} {frac {mathrm {d} heta} {(1-nsin ^ {2} heta) {sqrt {1-k ^ {2} sin ^ {2} heta}}}}} = {frac {pi} {2}}, F_ {1} ({frac {1} {2}}, 1, {frac {1} {2}}, 1; n, k ^ {2}) ~.} Tegishli seriyalar
$ Delta $ ikkita ikkita o'zgaruvchiga tegishli ketma-ketliklar mavjud1 , Φ2 , Φ3 , Ψ1 , Ψ2 , Ξ1 va Ξ2 , umumlashtiradigan Kummerning birlashgan gipergeometrik funktsiyasi 1 F 1 bitta o'zgaruvchining va birlashuvchi gipergeometrik chegara funktsiyasi 0 F 1 shunga o'xshash tarzda bitta o'zgaruvchining. Ulardan birinchisi tomonidan kiritilgan Per Humbert yilda 1920 . Juzeppe Lauricella (1893 ) Appell seriyasiga o'xshash to'rtta funktsiyani aniqladi, lekin ikkita o'zgaruvchiga emas, balki ko'pgina o'zgaruvchilarga bog'liq x va y . Ushbu turkumlar Appell tomonidan ham o'rganilgan. Ular ma'lum qisman differentsial tenglamalarni qondiradilar, shuningdek, Eyler tipidagi integrallar va shaklida ham berilishi mumkin kontur integrallari .Adabiyotlar
^ Burchnall & Chaundy (1940), formula (30) ga qarang. ^ Burchnall & Chaundy (1940), formula (26) yoki Erdélyi (1953), 5.12 (9) formulasiga qarang. ^ Masalan, ( y − x ) F 1 ( a , b 1 + 1 , b 2 + 1 , v , x , y ) = y F 1 ( a , b 1 , b 2 + 1 , v , x , y ) − x F 1 ( a , b 1 + 1 , b 2 , v , x , y ) {displaystyle (yx) F_ {1} (a, b_ {1} + 1, b_ {2} + 1, c, x, y) = y, F_ {1} (a, b_ {1}, b_ {2) } + 1, c, x, y) -x, F_ {1} (a, b_ {1} + 1, b_ {2}, c, x, y)} Apell, Pol (1880). "Sur les séries hypergéométriques de deux o'zgaruvchilar va sur des équations différentielles linéaires aux dérivées partielles". Comptes rendus hebdomadaires des séances de l'Académie des fanlar (frantsuz tilida). 90 : 296–298 va 731–735. JFM 12.0296.01 .CS1 maint: ref = harv (havola ) (yana qarang "Sur la série F."3 (a, a ', b, β', b; x, y) "in C. R. Akad. Ilmiy ish. 90 , 977-980-betlar)Appell, Pol (1882). "Sur les fonctions hypergéométriques de deux o'zgaruvchilar" . Journal de Mathématiques Pures et Appliquées 8 : 173–216. CS1 maint: ref = harv (havola ) [doimiy o'lik havola Appell, Pol; Kampé de Fériet, Jozef (1926). Hipergéométriques et hypersphériques; Polynômes d'Hermite (frantsuz tilida). Parij: Gautier-Villars. JFM 52.0361.13 . CS1 maint: ref = harv (havola ) Askey, R. A .; Olde Daalhuis, A. B. (2010), "Appell seriyasi" , yilda Olver, Frank V. J. ; Lozier, Daniel M.; Boisvert, Ronald F.; Klark, Charlz V. (tahr.), NIST Matematik funktsiyalar bo'yicha qo'llanma ISBN 978-0-521-19225-5 JANOB 2723248 Burchnall, J. L .; Chaundy, T. W. (1940). "Appellning ikki karra gipergeometrik funktsiyalarining kengayishi". Kvart. J. Matematik., Oksford ser . 11 : 249–270. doi :10.1093 / qmath / os-11.1.249 . CS1 maint: ref = harv (havola ) Erdélii, A. (1953). Oliy transandantal funktsiyalar, jild. Men (PDF) . Nyu-York: McGraw-Hill.CS1 maint: ref = harv (havola ) Gradshteyn, Izrail Sulaymonovich ; Rijik, Iosif Moiseevich ; Geronimus, Yuriy Veniaminovich ; Tseytlin, Mixail Yulyevich ; Jeffri, Alan (2015) [2014 yil oktyabr]. "9.18.". Tsvillingerda Daniel; Moll, Viktor Gyugo (tahrir). Integrallar, seriyalar va mahsulotlar jadvali Academic Press, Inc. ISBN 978-0-12-384933-5 LCCN 2014010276 .CS1 maint: ref = harv (havola ) Humbert, Per (1920). "Sur les fonctions hypercylindriques". Comptes rendus hebdomadaires des séances de l'Académie des fanlar (frantsuz tilida). 171 : 490–492. JFM 47.0348.01 .CS1 maint: ref = harv (havola ) Lauricella, Juzeppe (1893). "Sulle funzioni ipergeometriche a più variabili". Rendiconti del Circolo Matematico di Palermo 7 : 111–158. doi :10.1007 / BF03012437 . JFM 25.0756.01 . S2CID 122316343 .CS1 maint: ref = harv (havola ) Pikard, Emil (1881). "Sur une extension aux fonctions de deux variables du problème de Riemann relativ aux fonctions hypergéométriques" . Annales Scientifiques de l'École Normale Supérieure . Série 2 (frantsuz tilida). 10 : 305–322. doi :10.24033 / asens.203 JFM 13.0389.01 .CS1 maint: ref = harv (havola ) C. R. Akad. Ilmiy ish. 90 (1880), 1119–1121 va 1267–1269-betlar).Slater, Lucy Joan (1966). Umumlashtirilgan gipergeometrik funktsiyalar ISBN 0-521-06483-X JANOB 0201688 .CS1 maint: ref = harv (havola ) ISBN 978-0-521-09061-2 )Tashqi havolalar
![{displaystyle x (1-x) {frac {qisman ^ {2} F_ {1} (x, y)} {qisman x ^ {2}}} + y (1-x) {frac {qisman ^ {2} F_ {1} (x, y)} {qisman x partial y}} + [c- (a + b_ {1} +1) x] {frac {qisman F_ {1} (x, y)} {qisman x} } -b_ {1} y {frac {qisman F_ {1} (x, y)} {qisman y}} - ab_ {1} F_ {1} (x, y) = 0}](https://wikimedia.org/api/rest_v1/media/math/render/svg/8706133888a0e338e4de551a4972366985207f9d)
![{displaystyle y (1-y) {frac {qisman ^ {2} F_ {1} (x, y)} {qisman y ^ {2}}} + x (1-y) {frac {qisman ^ {2} F_ {1} (x, y)} {qisman xpartial y}} + [c- (a + b_ {2} +1) y] {frac {qisman F_ {1} (x, y)} {qisman y} } -b_ {2} x {frac {qisman F_ {1} (x, y)} {qisman x}} - ab_ {2} F_ {1} (x, y) = 0}](https://wikimedia.org/api/rest_v1/media/math/render/svg/1bff5fa0629d1a666987c3de41c19c844051e462)
![{displaystyle x (1-x) {frac {qisman ^ {2} F_ {2} (x, y)} {qisman x ^ {2}}} - xy {frac {qisman ^ {2} F_ {2} ( x, y)} {qisman xpartial y}} + [c_ {1} - (a + b_ {1} +1) x] {frac {qisman F_ {2} (x, y)} {qisman x}} - b_ {1} y {frac {qisman F_ {2} (x, y)} {qisman y}} - ab_ {1} F_ {2} (x, y) = 0}](https://wikimedia.org/api/rest_v1/media/math/render/svg/3d21a04bed4e7413e8920bbc7f497839ce1d825d)
![{displaystyle y (1-y) {frac {qisman ^ {2} F_ {2} (x, y)} {qisman y ^ {2}}} - xy {frac {qisman ^ {2} F_ {2} ( x, y)} {qisman xpartial y}} + [c_ {2} - (a + b_ {2} +1) x] {frac {qisman F_ {2} (x, y)} {qisman y}} - b_ {2} x {frac {qisman F_ {2} (x, y)} {qisman x}} - ab_ {2} F_ {2} (x, y) = 0}](https://wikimedia.org/api/rest_v1/media/math/render/svg/bceed8d14dc2c12b0a45aaa9c18ed620c9f8c559)
![{displaystyle x (1-x) {frac {qisman ^ {2} F_ {3} (x, y)} {qisman x ^ {2}}} + y {frac {qisman ^ {2} F_ {3} ( x, y)} {qisman xpartial y}} + [c- (a_ {1} + b_ {1} +1) x] {frac {qisman F_ {3} (x, y)} {qisman x}} - a_ {1} b_ {1} F_ {3} (x, y) = 0}](https://wikimedia.org/api/rest_v1/media/math/render/svg/424d663fa4f5968774d6161e1e71b0b266e9e32d)
![{displaystyle y (1-y) {frac {qisman ^ {2} F_ {3} (x, y)} {qisman y ^ {2}}} + x {frac {qisman ^ {2} F_ {3} ( x, y)} {qisman xpartial y}} + [c- (a_ {2} + b_ {2} +1) y] {frac {qisman F_ {3} (x, y)} {qisman y}} - a_ {2} b_ {2} F_ {3} (x, y) = 0}](https://wikimedia.org/api/rest_v1/media/math/render/svg/6536613b1adff04079e9165521549cf56d2dabdf)
![{displaystyle x (1-x) {frac {qisman ^ {2} F_ {4} (x, y)} {qisman x ^ {2}}} - y ^ {2} {frac {qisman ^ {2} F_ {4} (x, y)} {qisman y ^ {2}}} - 2xy {frac {qisman ^ {2} F_ {4} (x, y)} {qisman xpartial y}} + [c_ {1} - (a + b + 1) x] {frac {qisman F_ {4} (x, y)} {qisman x}} - (a + b + 1) y {frac {qisman F_ {4} (x, y )} {qisman y}} - abF_ {4} (x, y) = 0}](https://wikimedia.org/api/rest_v1/media/math/render/svg/84c1762747b2fa7376e0fb2c8021f60a750a0531)
![{displaystyle y (1-y) {frac {qisman ^ {2} F_ {4} (x, y)} {qisman y ^ {2}}} - x ^ {2} {frac {qisman ^ {2} F_ {4} (x, y)} {qisman x ^ {2}}} - 2xy {frac {qisman ^ {2} F_ {4} (x, y)} {qisman x qismli y}} + [c_ {2} - (a + b + 1) y] {frac {qisman F_ {4} (x, y)} {qisman y}} - (a + b + 1) x {frac {qisman F_ {4} (x, y )} {qisman x}} - abF_ {4} (x, y) = 0}](https://wikimedia.org/api/rest_v1/media/math/render/svg/d908adf62352b754c3f772f24b2a81e342a67ddc)
