English-Language Arts Course Listings and Textbook Matrix

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leçon - matière potentielle : steck - vaughn 2.5 ii
cours - matière potentielle : number courses
cours - matière potentielle : holt
cours - matière : english
expression écrite
leçon - matière potentielle : scholastic 2.5 ii
cours - matière potentielle : language arts

English-Language Arts Course Listings and Textbook Matrix Course Number Courses and Related Textbook Options Publisher or Author Credit Value Level N/A Primary English-Language Arts Collections for Young Scholars, Volume 2, Books 1 and 2 Open Court Publishing N/A 1-3 Phonics A Steck-Vaughn N/A K Phonics B Steck-Vaughn N/A K Target Spelling, 180 and 360 Steck-Vaughn N/A 1-2 Grade level appropriate literature N/A Kindergarten English-Language Arts Phonics A Steck-Vaughn N/A K Phonics B Steck-Vaughn N/A K N/A Grade One English-Language Arts

sadlier oxford
literature 10 mcdougal-littell
mcdougal-littell 5.0 hs
prep elements
college prep
hs
literature
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Publié par	mochug
Nombre de lectures	88
Langue	English

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Introduction Pop’s problem Decidability Deﬁnability Preview
Deﬁnability in ﬁelds
Lecture 1:
Undecidabile arithmetic, decidable geometry
Thomas Scanlon
University of California, Berkeley
5 February 2007
Model Theory and Computable Model Theory
Gainesville, Florida
Thomas Scanlon University of California, Berkeley
Deﬁnability in ﬁelds Lecture 1: Undecidabile arithmetic, decidable geometryIntroduction Pop’s problem Decidability Deﬁnability Preview
Structures from logic
Question
What do we study when we examine mathematical structures from
the perspective of logic?
What formal sentences are true inM?
What sets are deﬁnable inM?
Thomas Scanlon University of California, Berkeley
Deﬁnability in ﬁelds Lecture 1: Undecidabile arithmetic, decidable geometryIntroduction Pop’s problem Decidability Deﬁnability Preview
Structures from logic
Question
What do we study when we examine mathematical structures from
the perspective of logic?
Given anL-structureM we might ask:
What formal sentences are true inM?
What sets are deﬁnable inM?
Thomas Scanlon University of California, Berkeley
Deﬁnability in ﬁelds Lecture 1: Undecidabile arithmetic, decidable geometryIntroduction Pop’s problem Decidability Deﬁnability Preview
Structures from logic
Question
What do we study when we examine mathematical structures from
the perspective of logic?
Given anL-structureM we might ask:
What formal sentences are true inM?
What sets are deﬁnable inM?
Thomas Scanlon University of California, Berkeley
Deﬁnability in ﬁelds Lecture 1: Undecidabile arithmetic, decidable geometryIntroduction Pop’s problem Decidability Deﬁnability Preview
Structures from logic
Question
What do we study when we examine mathematical structures from
the perspective of logic?
Given anL-structureM we might ask:
What formal sentences are true inM? That is, what is
Th (M) :={ϕ|M|= ϕ}.L
What sets are deﬁnable inM?
Thomas Scanlon University of California, Berkeley
Deﬁnability in ﬁelds Lecture 1: Undecidabile arithmetic, decidable geometryIntroduction Pop’s problem Decidability Deﬁnability Preview
Structures from logic
Question
What do we study when we examine mathematical structures from
the perspective of logic?
Given anL-structureM we might ask:
What formal sentences are true inM? That is, what is
Th (M) :={ϕ|M|= ϕ}. Perhaps more importantly, howL
do we decide which sentences are true inM?
What sets are deﬁnable inM?
Thomas Scanlon University of California, Berkeley
Deﬁnability in ﬁelds Lecture 1: Undecidabile arithmetic, decidable geometryIntroduction Pop’s problem Decidability Deﬁnability Preview
Structures from logic
Question
What do we study when we examine mathematical structures from
the perspective of logic?
Given anL-structureM we might ask:
What formal sentences are true inM? That is, what is
Th (M) :={ϕ|M|= ϕ}. Perhaps more importantly, howL
do we decide which sentences are true inM?
What sets are deﬁnable inM?
Thomas Scanlon University of California, Berkeley
Deﬁnability in ﬁelds Lecture 1: Undecidabile arithmetic, decidable geometryIntroduction Pop’s problem Decidability Deﬁnability Preview
Structures from logic
Question
What do we study when we examine mathematical structures from
the perspective of logic?
Given anL-structureM we might ask:
What formal sentences are true inM? That is, what is
Th (M) :={ϕ|M|= ϕ}. Perhaps more importantly, howL
do we decide which sentences are true inM?
What sets are deﬁnable inM? That is, describe the setS∞Def(M) := Def (M) wherenn=0
Def (M) :={ϕ(M)| ϕ(x ,...,x )∈L} andn 1 n
nϕ(M) :={a∈ M |M|= ϕ(a)}.
Thomas Scanlon University of California, Berkeley
Deﬁnability in ﬁelds Lecture 1: Undecidabile arithmetic, decidable geometryIntroduction Pop’s problem Decidability Deﬁnability Preview
Which question should we ask?
Traditionally, logicians focus on decidability of theories.
From the standpoint of logic, we can only discern a diﬀerence
between structures if they satisfy diﬀerent sentences. That is,
elementary equivalence,M≡N⇔ Th (M) = Th (N), isL L
the right logical notion of two structures being the same.
The complexity of the theory of a structure is expressed by the
complexity of Def(M).
Thomas Scanlon University of California, Berkeley
Deﬁnability in ﬁelds Lecture 1: Undecidabile arithmetic, decidable geometryIntroduction Pop’s problem Decidability Deﬁnability Preview
Which question should we ask?
Traditionally, logicians focus on decidability of theories.
From the standpoint of logic, we can only discern a diﬀerence
between structures if they satisfy diﬀerent sentences. That is,
elementary equivalence,M≡N⇔ Th (M) = Th (N), isL L
the right logical notion of two structures being the same.
The complexity of the theory of a structure is expressed by the
complexity of Def(M).
Thomas Scanlon University of California, Berkeley
Deﬁnability in ﬁelds Lecture 1: Undecidabile arithmetic, decidable geometry

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