id	sid	tid	token	lemma	pos
xs55m904c4k	1	1	we	we	PRON
xs55m904c4k	1	2	produce	produce	VERB
xs55m904c4k	1	3	a	a	DET
xs55m904c4k	1	4	large	large	ADJ
xs55m904c4k	1	5	class	class	NOUN
xs55m904c4k	1	6	of	of	ADP
xs55m904c4k	1	7	generalized	generalized	ADJ
xs55m904c4k	1	8	cluster	cluster	NOUN
xs55m904c4k	1	9	structures	structure	NOUN
xs55m904c4k	1	10	on	on	ADP
xs55m904c4k	1	11	the	the	DET
xs55m904c4k	1	12	drinfeld	drinfeld	PROPN
xs55m904c4k	1	13	doubles	double	NOUN
xs55m904c4k	1	14	of	of	ADP
xs55m904c4k	1	15	gln	gln	PROPN
xs55m904c4k	1	16	and	and	CCONJ
xs55m904c4k	1	17	sln	sln	NOUN
xs55m904c4k	1	18	compatible	compatible	ADJ
xs55m904c4k	1	19	with	with	ADP
xs55m904c4k	1	20	a	a	DET
xs55m904c4k	1	21	large	large	ADJ
xs55m904c4k	1	22	class	class	NOUN
xs55m904c4k	1	23	of	of	ADP
xs55m904c4k	1	24	poisson	poisson	NOUN
xs55m904c4k	1	25	brackets	bracket	NOUN
xs55m904c4k	1	26	given	give	VERB
xs55m904c4k	1	27	by	by	ADP
xs55m904c4k	1	28	belavin	belavin	PROPN
xs55m904c4k	1	29	-	-	PUNCT
xs55m904c4k	1	30	drinfeld	drinfeld	PROPN
xs55m904c4k	1	31	classification	classification	NOUN
xs55m904c4k	1	32	.	.	PUNCT
xs55m904c4k	2	1	this	this	DET
xs55m904c4k	2	2	work	work	NOUN
xs55m904c4k	2	3	is	be	AUX
xs55m904c4k	2	4	a	a	DET
xs55m904c4k	2	5	part	part	NOUN
xs55m904c4k	2	6	of	of	ADP
xs55m904c4k	2	7	the	the	DET
xs55m904c4k	2	8	grand	grand	ADJ
xs55m904c4k	2	9	research	research	NOUN
xs55m904c4k	2	10	project	project	NOUN
xs55m904c4k	2	11	led	lead	VERB
xs55m904c4k	2	12	by	by	ADP
xs55m904c4k	2	13	misha	misha	PROPN
xs55m904c4k	2	14	gekhtman	gekhtman	PROPN
xs55m904c4k	2	15	,	,	PUNCT
xs55m904c4k	2	16	misha	misha	PROPN
xs55m904c4k	2	17	shapiro	shapiro	PROPN
xs55m904c4k	2	18	and	and	CCONJ
xs55m904c4k	2	19	alek	alek	PROPN
xs55m904c4k	2	20	vainshtein	vainshtein	PROPN
xs55m904c4k	2	21	,	,	PUNCT
xs55m904c4k	2	22	who	who	PRON
xs55m904c4k	2	23	aim	aim	VERB
xs55m904c4k	2	24	at	at	ADP
xs55m904c4k	2	25	proving	prove	VERB
xs55m904c4k	2	26	the	the	DET
xs55m904c4k	2	27	following	follow	VERB
xs55m904c4k	2	28	conjecture	conjecture	NOUN
xs55m904c4k	2	29	:	:	PUNCT
xs55m904c4k	2	30	for	for	ADP
xs55m904c4k	2	31	any	any	DET
xs55m904c4k	2	32	given	give	VERB
xs55m904c4k	2	33	simple	simple	ADJ
xs55m904c4k	2	34	poisson	poisson	NOUN
xs55m904c4k	2	35	-	-	PUNCT
xs55m904c4k	2	36	lie	lie	NOUN
xs55m904c4k	2	37	group	group	NOUN
xs55m904c4k	2	38	endowed	endow	VERB
xs55m904c4k	2	39	with	with	ADP
xs55m904c4k	2	40	a	a	DET
xs55m904c4k	2	41	poisson	poisson	NOUN
xs55m904c4k	2	42	bracket	bracket	NOUN
xs55m904c4k	2	43	from	from	ADP
xs55m904c4k	2	44	the	the	DET
xs55m904c4k	2	45	belavin	belavin	PROPN
xs55m904c4k	2	46	-	-	PUNCT
xs55m904c4k	2	47	drinfeld	drinfeld	PROPN
xs55m904c4k	2	48	classification	classification	NOUN
xs55m904c4k	2	49	,	,	PUNCT
xs55m904c4k	2	50	there	there	PRON
xs55m904c4k	2	51	exists	exist	VERB
xs55m904c4k	2	52	a	a	DET
xs55m904c4k	2	53	compatible	compatible	ADJ
xs55m904c4k	2	54	generalized	generalized	ADJ
xs55m904c4k	2	55	cluster	cluster	NOUN
xs55m904c4k	2	56	structure	structure	NOUN
xs55m904c4k	2	57	.	.	PUNCT
xs55m904c4k	3	1	the	the	DET
xs55m904c4k	3	2	program	program	NOUN
xs55m904c4k	3	3	naturally	naturally	ADV
xs55m904c4k	3	4	extends	extend	VERB
xs55m904c4k	3	5	to	to	ADP
xs55m904c4k	3	6	poisson	poisson	NOUN
xs55m904c4k	3	7	duals	dual	NOUN
xs55m904c4k	3	8	and	and	CCONJ
xs55m904c4k	3	9	drinfeld	drinfeld	PROPN
xs55m904c4k	3	10	doubles	double	NOUN
xs55m904c4k	3	11	of	of	ADP
xs55m904c4k	3	12	simple	simple	ADJ
xs55m904c4k	3	13	poisson	poisson	NOUN
xs55m904c4k	3	14	-	-	PUNCT
xs55m904c4k	3	15	lie	lie	NOUN
xs55m904c4k	3	16	groups	group	NOUN
xs55m904c4k	3	17	.	.	PUNCT