texmath-0.13.1.2: test/reader/tex/13.test
<<< tex
{}_pF_q(a_1,\dots,a_p;c_1,\dots,c_q;z)
= \sum_{n=0}^\infty
\frac{(a_1)_n\cdots(a_p)_n}{(c_1)_n\cdots(c_q)_n}
\frac{z^n}{n!}
>>> native
[ ESub (EGrouped []) (EIdentifier "p")
, ESub (EIdentifier "F") (EIdentifier "q")
, ESymbol Open "("
, ESub (EIdentifier "a") (ENumber "1")
, ESymbol Pun ","
, ESymbol Ord "\8230"
, ESymbol Pun ","
, ESub (EIdentifier "a") (EIdentifier "p")
, ESymbol Pun ";"
, ESub (EIdentifier "c") (ENumber "1")
, ESymbol Pun ","
, ESymbol Ord "\8230"
, ESymbol Pun ","
, ESub (EIdentifier "c") (EIdentifier "q")
, ESymbol Pun ";"
, EIdentifier "z"
, ESymbol Close ")"
, ESymbol Rel "="
, EUnderover
True
(ESymbol Op "\8721")
(EGrouped [ EIdentifier "n" , ESymbol Rel "=" , ENumber "0" ])
(ESymbol Ord "\8734")
, EFraction
NormalFrac
(EGrouped
[ ESymbol Open "("
, ESub (EIdentifier "a") (ENumber "1")
, ESub (ESymbol Close ")") (EIdentifier "n")
, ESymbol Ord "\8943"
, ESymbol Open "("
, ESub (EIdentifier "a") (EIdentifier "p")
, ESub (ESymbol Close ")") (EIdentifier "n")
])
(EGrouped
[ ESymbol Open "("
, ESub (EIdentifier "c") (ENumber "1")
, ESub (ESymbol Close ")") (EIdentifier "n")
, ESymbol Ord "\8943"
, ESymbol Open "("
, ESub (EIdentifier "c") (EIdentifier "q")
, ESub (ESymbol Close ")") (EIdentifier "n")
])
, EFraction
NormalFrac
(ESuper (EIdentifier "z") (EIdentifier "n"))
(EGrouped [ EIdentifier "n" , ESymbol Ord "!" ])
]