id	sid	tid	token	lemma	pos
6682x34915g	1	1	the	the	DET
6682x34915g	1	2	category	category	NOUN
6682x34915g	1	3	of	of	ADP
6682x34915g	1	4	perverse	perverse	ADJ
6682x34915g	1	5	sheaves	sheaf	NOUN
6682x34915g	1	6	is	be	AUX
6682x34915g	1	7	known	know	VERB
6682x34915g	1	8	to	to	PART
6682x34915g	1	9	be	be	AUX
6682x34915g	1	10	an	an	DET
6682x34915g	1	11	abelian	abelian	ADJ
6682x34915g	1	12	and	and	CCONJ
6682x34915g	1	13	artinian	artinian	ADJ
6682x34915g	1	14	category	category	NOUN
6682x34915g	1	15	.	.	PUNCT
6682x34915g	2	1	as	as	ADP
6682x34915g	2	2	a	a	DET
6682x34915g	2	3	result	result	NOUN
6682x34915g	2	4	,	,	PUNCT
6682x34915g	2	5	we	we	PRON
6682x34915g	2	6	can	can	AUX
6682x34915g	2	7	talk	talk	VERB
6682x34915g	2	8	about	about	ADP
6682x34915g	2	9	the	the	DET
6682x34915g	2	10	length	length	NOUN
6682x34915g	2	11	and	and	CCONJ
6682x34915g	2	12	decomposition	decomposition	NOUN
6682x34915g	2	13	factors	factor	NOUN
6682x34915g	2	14	of	of	ADP
6682x34915g	2	15	a	a	DET
6682x34915g	2	16	perverse	perverse	ADJ
6682x34915g	2	17	sheaf	sheaf	NOUN
6682x34915g	2	18	.	.	PUNCT
6682x34915g	3	1	in	in	ADP
6682x34915g	3	2	this	this	DET
6682x34915g	3	3	thesis	thesis	NOUN
6682x34915g	3	4	we	we	PRON
6682x34915g	3	5	look	look	VERB
6682x34915g	3	6	at	at	ADP
6682x34915g	3	7	a	a	DET
6682x34915g	3	8	class	class	NOUN
6682x34915g	3	9	of	of	ADP
6682x34915g	3	10	perverse	perverse	ADJ
6682x34915g	3	11	sheaves	sheaf	NOUN
6682x34915g	3	12	arising	arise	VERB
6682x34915g	3	13	from	from	ADP
6682x34915g	3	14	local	local	ADJ
6682x34915g	3	15	systems	system	NOUN
6682x34915g	3	16	on	on	ADP
6682x34915g	3	17	a	a	DET
6682x34915g	3	18	complement	complement	NOUN
6682x34915g	3	19	of	of	ADP
6682x34915g	3	20	a	a	DET
6682x34915g	3	21	hyperplane	hyperplane	NOUN
6682x34915g	3	22	arrangement	arrangement	NOUN
6682x34915g	3	23	and	and	CCONJ
6682x34915g	3	24	give	give	VERB
6682x34915g	3	25	a	a	DET
6682x34915g	3	26	concrete	concrete	ADJ
6682x34915g	3	27	(	(	PUNCT
6682x34915g	3	28	combinatorial	combinatorial	ADJ
6682x34915g	3	29	)	)	PUNCT
6682x34915g	3	30	formula	formula	NOUN
6682x34915g	3	31	to	to	PART
6682x34915g	3	32	identify	identify	VERB
6682x34915g	3	33	the	the	DET
6682x34915g	3	34	simple	simple	ADJ
6682x34915g	3	35	ones	one	NOUN
6682x34915g	3	36	;	;	PUNCT
6682x34915g	3	37	that	that	ADV
6682x34915g	3	38	is	is	ADV
6682x34915g	3	39	,	,	PUNCT
6682x34915g	3	40	those	those	PRON
6682x34915g	3	41	of	of	ADP
6682x34915g	3	42	length	length	NOUN
6682x34915g	3	43	one	one	NUM
6682x34915g	3	44	.	.	PUNCT
6682x34915g	4	1	by	by	ADP
6682x34915g	4	2	the	the	DET
6682x34915g	4	3	riemann	riemann	PROPN
6682x34915g	4	4	-	-	PUNCT
6682x34915g	4	5	hilbert	hilbert	PROPN
6682x34915g	4	6	correspondence	correspondence	NOUN
6682x34915g	4	7	,	,	PUNCT
6682x34915g	4	8	there	there	PRON
6682x34915g	4	9	is	be	VERB
6682x34915g	4	10	an	an	DET
6682x34915g	4	11	equivalence	equivalence	NOUN
6682x34915g	4	12	of	of	ADP
6682x34915g	4	13	categories	category	NOUN
6682x34915g	4	14	between	between	ADP
6682x34915g	4	15	perverse	perverse	ADJ
6682x34915g	4	16	sheaves	sheaf	NOUN
6682x34915g	4	17	and	and	CCONJ
6682x34915g	4	18	regular	regular	ADJ
6682x34915g	4	19	holonomic	holonomic	ADJ
6682x34915g	4	20	d	d	NOUN
6682x34915g	4	21	-	-	NOUN
6682x34915g	4	22	modules	module	NOUN
6682x34915g	4	23	.	.	PUNCT
6682x34915g	5	1	therefore	therefore	ADV
6682x34915g	5	2	,	,	PUNCT
6682x34915g	5	3	we	we	PRON
6682x34915g	5	4	also	also	ADV
6682x34915g	5	5	obtain	obtain	VERB
6682x34915g	5	6	the	the	DET
6682x34915g	5	7	analogous	analogous	ADJ
6682x34915g	5	8	criterion	criterion	NOUN
6682x34915g	5	9	for	for	ADP
6682x34915g	5	10	a	a	DET
6682x34915g	5	11	class	class	NOUN
6682x34915g	5	12	of	of	ADP
6682x34915g	5	13	regular	regular	ADJ
6682x34915g	5	14	holonomic	holonomic	ADJ
6682x34915g	5	15	d	d	NOUN
6682x34915g	5	16	-	-	NOUN
6682x34915g	5	17	modules	module	NOUN
6682x34915g	5	18	on	on	ADP
6682x34915g	5	19	the	the	DET
6682x34915g	5	20	complement	complement	NOUN
6682x34915g	5	21	of	of	ADP
6682x34915g	5	22	a	a	DET
6682x34915g	5	23	hyperplane	hyperplane	NOUN
6682x34915g	5	24	arrangement.the	arrangement.the	DET
6682x34915g	5	25	above	above	ADJ
6682x34915g	5	26	result	result	NOUN
6682x34915g	5	27	is	be	AUX
6682x34915g	5	28	obtained	obtain	VERB
6682x34915g	5	29	by	by	ADP
6682x34915g	5	30	studying	study	VERB
6682x34915g	5	31	the	the	DET
6682x34915g	5	32	cohomology	cohomology	NOUN
6682x34915g	5	33	jump	jump	NOUN
6682x34915g	5	34	loci	locus	NOUN
6682x34915g	5	35	on	on	ADP
6682x34915g	5	36	the	the	DET
6682x34915g	5	37	complement	complement	NOUN
6682x34915g	5	38	of	of	ADP
6682x34915g	5	39	a	a	DET
6682x34915g	5	40	hyperplane	hyperplane	NOUN
6682x34915g	5	41	arrangement	arrangement	NOUN
6682x34915g	5	42	and	and	CCONJ
6682x34915g	5	43	relating	relate	VERB
6682x34915g	5	44	it	it	PRON
6682x34915g	5	45	with	with	ADP
6682x34915g	5	46	the	the	DET
6682x34915g	5	47	support	support	NOUN
6682x34915g	5	48	of	of	ADP
6682x34915g	5	49	sabbah	sabbah	PROPN
6682x34915g	5	50	's	's	PART
6682x34915g	5	51	specialization	specialization	NOUN
6682x34915g	5	52	complex	complex	NOUN
6682x34915g	5	53	,	,	PUNCT
6682x34915g	5	54	which	which	PRON
6682x34915g	5	55	generalizes	generalize	VERB
6682x34915g	5	56	the	the	DET
6682x34915g	5	57	nearby	nearby	ADJ
6682x34915g	5	58	cycles	cycle	NOUN
6682x34915g	5	59	complex	complex	NOUN
6682x34915g	5	60	of	of	ADP
6682x34915g	5	61	deligne	deligne	PROPN
6682x34915g	5	62	.	.	PUNCT