id	author	title	date	pages	extension	mime	words	sentences	flesch	summary	cache	txt
cord-031396-cb97rcbk	Saratha, S. R.	Solving Black–Scholes equations using fractional generalized homotopy analysis method	2020-09-04		.txt	text/plain	3411	252	58	Tables 7 and 8 provide the pricing option derivatives using fractional parameter α = 0.75, α = 0.5, and depict a good agreement among the results of FGHAM, MFDTM, RPS, and CFADM, respectively. Table 12 provides the pricing option derivatives using fractional parameter α = 1, which depicts a good agreement among the results of FGHAM, the exact solution, RPS, and CFADM, respectively. Table 12 provides the pricing option derivatives using fractional parameter α = 1, which depicts a good agreement among the results of FGHAM, the exact solution, RPS, and CFADM, respectively. Table 12 provides the pricing option derivatives using fractional parameter α = 1, which depicts a good agreement among the results of FGHAM, the exact solution, RPS, and CFADM, respectively. Homotopy perturbation method for fractional Black-Scholes European option pricing equations using Sumudu transform Exact solution of fractional Black-Scholes European option pricing equations	./cache/cord-031396-cb97rcbk.txt	./txt/cord-031396-cb97rcbk.txt