id	sid	tid	token	lemma	pos
ks65h993316	1	1	in	in	ADP
ks65h993316	1	2	geometric	geometric	ADJ
ks65h993316	1	3	stability	stability	NOUN
ks65h993316	1	4	theory	theory	NOUN
ks65h993316	1	5	,	,	PUNCT
ks65h993316	1	6	internality	internality	NOUN
ks65h993316	1	7	plays	play	VERB
ks65h993316	1	8	a	a	DET
ks65h993316	1	9	central	central	ADJ
ks65h993316	1	10	role	role	NOUN
ks65h993316	1	11	,	,	PUNCT
ks65h993316	1	12	as	as	ADP
ks65h993316	1	13	a	a	DET
ks65h993316	1	14	tool	tool	NOUN
ks65h993316	1	15	to	to	PART
ks65h993316	1	16	explore	explore	VERB
ks65h993316	1	17	the	the	DET
ks65h993316	1	18	fine	fine	ADJ
ks65h993316	1	19	structure	structure	NOUN
ks65h993316	1	20	of	of	ADP
ks65h993316	1	21	definable	definable	ADJ
ks65h993316	1	22	sets	set	NOUN
ks65h993316	1	23	.	.	PUNCT
ks65h993316	2	1	studying	study	VERB
ks65h993316	2	2	internal	internal	ADJ
ks65h993316	2	3	types	type	NOUN
ks65h993316	2	4	,	,	PUNCT
ks65h993316	2	5	one	one	NUM
ks65h993316	2	6	often	often	ADV
ks65h993316	2	7	encounters	encounter	VERB
ks65h993316	2	8	uniformly	uniformly	ADV
ks65h993316	2	9	defined	define	VERB
ks65h993316	2	10	families	family	NOUN
ks65h993316	2	11	of	of	ADP
ks65h993316	2	12	internal	internal	ADJ
ks65h993316	2	13	types	type	NOUN
ks65h993316	2	14	.	.	PUNCT
ks65h993316	3	1	this	this	DET
ks65h993316	3	2	thesis	thesis	NOUN
ks65h993316	3	3	is	be	AUX
ks65h993316	3	4	mainly	mainly	ADV
ks65h993316	3	5	concerned	concern	VERB
ks65h993316	3	6	with	with	ADP
ks65h993316	3	7	the	the	DET
ks65h993316	3	8	study	study	NOUN
ks65h993316	3	9	of	of	ADP
ks65h993316	3	10	such	such	ADJ
ks65h993316	3	11	families	family	NOUN
ks65h993316	3	12	,	,	PUNCT
ks65h993316	3	13	both	both	PRON
ks65h993316	3	14	from	from	ADP
ks65h993316	3	15	an	an	DET
ks65h993316	3	16	abstract	abstract	ADJ
ks65h993316	3	17	model	model	NOUN
ks65h993316	3	18	-	-	PUNCT
ks65h993316	3	19	theoretic	theoretic	ADJ
ks65h993316	3	20	perspective	perspective	NOUN
ks65h993316	3	21	and	and	CCONJ
ks65h993316	3	22	in	in	ADP
ks65h993316	3	23	concrete	concrete	NOUN
ks65h993316	3	24	examples.in	examples.in	X
ks65h993316	3	25	the	the	DET
ks65h993316	3	26	first	first	ADJ
ks65h993316	3	27	part	part	NOUN
ks65h993316	3	28	,	,	PUNCT
ks65h993316	3	29	we	we	PRON
ks65h993316	3	30	generalize	generalize	VERB
ks65h993316	3	31	one	one	NUM
ks65h993316	3	32	of	of	ADP
ks65h993316	3	33	the	the	DET
ks65h993316	3	34	fundamental	fundamental	ADJ
ks65h993316	3	35	tools	tool	NOUN
ks65h993316	3	36	of	of	ADP
ks65h993316	3	37	geometric	geometric	ADJ
ks65h993316	3	38	stability	stability	NOUN
ks65h993316	3	39	theory	theory	NOUN
ks65h993316	3	40	,	,	PUNCT
ks65h993316	3	41	type	type	NOUN
ks65h993316	3	42	-	-	PUNCT
ks65h993316	3	43	definable	definable	ADJ
ks65h993316	3	44	binding	binding	ADJ
ks65h993316	3	45	groups	group	NOUN
ks65h993316	3	46	,	,	PUNCT
ks65h993316	3	47	to	to	ADP
ks65h993316	3	48	certain	certain	ADJ
ks65h993316	3	49	families	family	NOUN
ks65h993316	3	50	of	of	ADP
ks65h993316	3	51	internal	internal	ADJ
ks65h993316	3	52	types	type	NOUN
ks65h993316	3	53	,	,	PUNCT
ks65h993316	3	54	which	which	PRON
ks65h993316	3	55	we	we	PRON
ks65h993316	3	56	call	call	VERB
ks65h993316	3	57	relatively	relatively	ADV
ks65h993316	3	58	internal	internal	ADJ
ks65h993316	3	59	.	.	PUNCT
ks65h993316	4	1	we	we	PRON
ks65h993316	4	2	obtain	obtain	VERB
ks65h993316	4	3	,	,	PUNCT
ks65h993316	4	4	instead	instead	ADV
ks65h993316	4	5	of	of	ADP
ks65h993316	4	6	a	a	DET
ks65h993316	4	7	group	group	NOUN
ks65h993316	4	8	,	,	PUNCT
ks65h993316	4	9	a	a	DET
ks65h993316	4	10	type	type	NOUN
ks65h993316	4	11	-	-	PUNCT
ks65h993316	4	12	definable	definable	ADJ
ks65h993316	4	13	groupoid	groupoid	NOUN
ks65h993316	4	14	,	,	PUNCT
ks65h993316	4	15	as	as	ADV
ks65h993316	4	16	well	well	ADV
ks65h993316	4	17	as	as	ADP
ks65h993316	4	18	simplicial	simplicial	ADJ
ks65h993316	4	19	data	datum	NOUN
ks65h993316	4	20	,	,	PUNCT
ks65h993316	4	21	encoding	encode	VERB
ks65h993316	4	22	structural	structural	ADJ
ks65h993316	4	23	properties	property	NOUN
ks65h993316	4	24	of	of	ADP
ks65h993316	4	25	the	the	DET
ks65h993316	4	26	family.in	family.in	NUM
ks65h993316	4	27	the	the	DET
ks65h993316	4	28	second	second	ADJ
ks65h993316	4	29	part	part	NOUN
ks65h993316	4	30	,	,	PUNCT
ks65h993316	4	31	we	we	PRON
ks65h993316	4	32	introduce	introduce	VERB
ks65h993316	4	33	a	a	DET
ks65h993316	4	34	new	new	ADJ
ks65h993316	4	35	strengthening	strengthening	NOUN
ks65h993316	4	36	of	of	ADP
ks65h993316	4	37	internality	internality	NOUN
ks65h993316	4	38	,	,	PUNCT
ks65h993316	4	39	called	call	VERB
ks65h993316	4	40	uniform	uniform	ADJ
ks65h993316	4	41	internality	internality	NOUN
ks65h993316	4	42	.	.	PUNCT
ks65h993316	5	1	we	we	PRON
ks65h993316	5	2	expose	expose	VERB
ks65h993316	5	3	its	its	PRON
ks65h993316	5	4	connection	connection	NOUN
ks65h993316	5	5	with	with	ADP
ks65h993316	5	6	the	the	DET
ks65h993316	5	7	previously	previously	ADV
ks65h993316	5	8	constructed	construct	VERB
ks65h993316	5	9	groupoids	groupoid	NOUN
ks65h993316	5	10	,	,	PUNCT
ks65h993316	5	11	and	and	CCONJ
ks65h993316	5	12	prove	prove	VERB
ks65h993316	5	13	it	it	PRON
ks65h993316	5	14	is	be	AUX
ks65h993316	5	15	a	a	DET
ks65h993316	5	16	strengthening	strengthening	NOUN
ks65h993316	5	17	of	of	ADP
ks65h993316	5	18	preserving	preserve	VERB
ks65h993316	5	19	internality	internality	NOUN
ks65h993316	5	20	,	,	PUNCT
ks65h993316	5	21	a	a	DET
ks65h993316	5	22	notion	notion	NOUN
ks65h993316	5	23	previously	previously	ADV
ks65h993316	5	24	introduced	introduce	VERB
ks65h993316	5	25	by	by	ADP
ks65h993316	5	26	moosa	moosa	PROPN
ks65h993316	5	27	.	.	PUNCT
ks65h993316	6	1	we	we	PRON
ks65h993316	6	2	then	then	ADV
ks65h993316	6	3	explore	explore	VERB
ks65h993316	6	4	examples	example	NOUN
ks65h993316	6	5	in	in	ADP
ks65h993316	6	6	differentially	differentially	ADV
ks65h993316	6	7	closed	close	VERB
ks65h993316	6	8	fields	field	NOUN
ks65h993316	6	9	and	and	CCONJ
ks65h993316	6	10	compact	compact	ADJ
ks65h993316	6	11	complex	complex	NOUN
ks65h993316	6	12	manifolds.in	manifolds.in	NUM
ks65h993316	6	13	the	the	DET
ks65h993316	6	14	last	last	ADJ
ks65h993316	6	15	part	part	NOUN
ks65h993316	6	16	,	,	PUNCT
ks65h993316	6	17	we	we	PRON
ks65h993316	6	18	study	study	VERB
ks65h993316	6	19	a	a	DET
ks65h993316	6	20	structural	structural	ADJ
ks65h993316	6	21	feature	feature	NOUN
ks65h993316	6	22	of	of	ADP
ks65h993316	6	23	stable	stable	ADJ
ks65h993316	6	24	theories	theory	NOUN
ks65h993316	6	25	,	,	PUNCT
ks65h993316	6	26	called	call	VERB
ks65h993316	6	27	the	the	DET
ks65h993316	6	28	canonical	canonical	ADJ
ks65h993316	6	29	base	base	NOUN
ks65h993316	6	30	property	property	NOUN
ks65h993316	6	31	.	.	PUNCT
ks65h993316	7	1	we	we	PRON
ks65h993316	7	2	prove	prove	VERB
ks65h993316	7	3	that	that	SCONJ
ks65h993316	7	4	hrushovski	hrushovski	PROPN
ks65h993316	7	5	,	,	PUNCT
ks65h993316	7	6	palacín	palacín	PROPN
ks65h993316	7	7	and	and	CCONJ
ks65h993316	7	8	pillay	pillay	NOUN
ks65h993316	7	9	's	's	PART
ks65h993316	7	10	counterexample	counterexample	NOUN
ks65h993316	7	11	does	do	AUX
ks65h993316	7	12	not	not	PART
ks65h993316	7	13	transfer	transfer	VERB
ks65h993316	7	14	to	to	ADP
ks65h993316	7	15	positive	positive	ADJ
ks65h993316	7	16	characteristic	characteristic	NOUN
ks65h993316	7	17	.	.	PUNCT
ks65h993316	8	1	elaborating	elaborate	VERB
ks65h993316	8	2	on	on	ADP
ks65h993316	8	3	the	the	DET
ks65h993316	8	4	counterexample	counterexample	NOUN
ks65h993316	8	5	,	,	PUNCT
ks65h993316	8	6	we	we	PRON
ks65h993316	8	7	also	also	ADV
ks65h993316	8	8	provide	provide	VERB
ks65h993316	8	9	an	an	DET
ks65h993316	8	10	abstract	abstract	ADJ
ks65h993316	8	11	configuration	configuration	NOUN
ks65h993316	8	12	violating	violate	VERB
ks65h993316	8	13	the	the	DET
ks65h993316	8	14	canonical	canonical	ADJ
ks65h993316	8	15	base	base	NOUN
ks65h993316	8	16	property	property	NOUN
ks65h993316	8	17	.	.	PUNCT