Semantic limits of dense combinatorial objects

Coregliano, Leonardo Nagami; Razborov, Alexander A.

doi:10.1070/rm9956

Cited by 13 publications

(74 citation statements)

References 50 publications

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“…The edge coloring and the orientation between

x \neq y

are read from the first coordinate

i

in which

x_{i} \neq y_{i}

. Further,

normalΩ

is equipped with the measure that is the product of uniform measures on

V (H), V (R)

and all this structure turns

normalΩ

into a

T

‐on ([8, Definition 3.2]). Hence we also have ([8, Theorem 6.3]) the corresponding algebra homomorphism

ϕ \in {Hom}^{+} false(A^{0} [T], double-struckR false)

; its values are computed as obvious integrals over

normalΩ

.…”

Section: Proof Of Asymptotic Resultsmentioning

confidence: 99%

“…Further,

normalΩ

is equipped with the measure that is the product of uniform measures on

V (H), V (R)

and all this structure turns

normalΩ

into a

T

‐on ([8, Definition 3.2]). Hence we also have ([8, Theorem 6.3]) the corresponding algebra homomorphism

ϕ \in {Hom}^{+} false(A^{0} [T], double-struckR false)

; its values are computed as obvious integrals over

normalΩ

. In particular,

ϕ (R)

is given by the ‘expected’ formula

ϕ false(R false) = \frac{{false(s false)}_{k}}{s^{k}} i false(R; H false) + \frac{a_{k}}{s^{k - 1}} .

Along with Theorem 3.1, this leads us, after a bit of manipulations, to the bound

(\frac{0pt}{s}) i false(R; H false) ⩽ \frac{s^{k} - s}{k^{k} - k} .

When

s

is a power of

k

, the right‐hand side here is exactly

g_{k} false(s false)

(by an obvious induction).

□

…”

Section: Proof Of Asymptotic Resultsmentioning

confidence: 99%

See 1 more Smart Citation

Polynomial to exponential transition in Ramsey theory

Mubayi

Razborov

2020

Proc. London Math. Soc.

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“…The edge coloring and the orientation between

x \neq y

are read from the first coordinate

i

in which

x_{i} \neq y_{i}

. Further,

normalΩ

is equipped with the measure that is the product of uniform measures on

V (H), V (R)

and all this structure turns

normalΩ

into a

T

‐on ([8, Definition 3.2]). Hence we also have ([8, Theorem 6.3]) the corresponding algebra homomorphism

ϕ \in {Hom}^{+} false(A^{0} [T], double-struckR false)

; its values are computed as obvious integrals over

normalΩ

.…”

Section: Proof Of Asymptotic Resultsmentioning

confidence: 99%

“…Further,

normalΩ

is equipped with the measure that is the product of uniform measures on

V (H), V (R)

and all this structure turns

normalΩ

into a

T

‐on ([8, Definition 3.2]). Hence we also have ([8, Theorem 6.3]) the corresponding algebra homomorphism

ϕ \in {Hom}^{+} false(A^{0} [T], double-struckR false)

; its values are computed as obvious integrals over

normalΩ

. In particular,

ϕ (R)

is given by the ‘expected’ formula

ϕ false(R false) = \frac{{false(s false)}_{k}}{s^{k}} i false(R; H false) + \frac{a_{k}}{s^{k - 1}} .

Along with Theorem 3.1, this leads us, after a bit of manipulations, to the bound

(\frac{0pt}{s}) i false(R; H false) ⩽ \frac{s^{k} - s}{k^{k} - k} .

When

s

is a power of

k

, the right‐hand side here is exactly

g_{k} false(s false)

(by an obvious induction).

□

…”

Section: Proof Of Asymptotic Resultsmentioning

confidence: 99%

Polynomial to exponential transition in Ramsey theory

Mubayi

Razborov

2020

Proc. London Math. Soc.

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“…We will be working in the framework of [CR20], in which combinatorial objects are encoded as models of a canonical theory. We will also be using the same notation as in [CR20] with some small additions.…”

Section: Model Theory and Limit Theorymentioning

confidence: 99%

“…First and foremost, we view this paper as a continuation of [Raz07,CR20], which in particular implies that we require qualifying properties to be formulated in an uniform way for arbitrary universal theories in a finite relational language. For examples of what can be expressed in that language see [CR20, Sct.…”

Section: Introductionmentioning

confidence: 99%

“…We have deliberately decided against attempting to state our properties in the language of finite combinatorial objects and their asymptotic behavior -it is probably possible but the result might be rather ugly and disappointing. Instead, we use the language of graphons [LS06], hypergraphons [ES12] and theons [CR20] for the geometric view of our objects and that of flag algebras [Raz07] for a concise algebraic description. We remark that we are not the first authors to make this election, and the advantages of using the continuous setting are illustrated by the fact that such proofs are often more elegant and less technical than their finite world counterparts [Jan11, KP13,Tow17].…”

Section: Introductionmentioning

confidence: 99%

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Natural quasirandomness properties

Coregliano¹,

Razborov²

2020

Preprint

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The theory of quasirandomness has greatly expanded from its inaugural graph theoretical setting to several different combinatorial objects such as hypergraphs, tournaments, permutations, etc. However, these quasirandomness variants have been done in an ad-hoc case-by-case manner. In this paper, we propose three new hierarchies of quasirandomness properties that can be naturally defined for arbitrary combinatorial objects. Our properties are also "natural" in more formal sense: they are preserved by local combinatorial constructions (encoded by open interpretations). We show that our quasirandomness properties have several different but equivalent characterizations that are similar to hypergraph quasirandomness properties. We also prove several implications and separations comparing them to each other and to what has been known for hypergraphs.The main notion explored by our statements and proofs is that of unique coupleability: two limit objects are uniquely coupleable if there is a unique limit object in the combined theory that is an alignment (i.e., a coupling) of these two objects.

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Natural quasirandomness properties

Coregliano

Razborov

2023

Random Struct Algorithms

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The theory of quasirandomness has greatly expanded from its inaugural graph theoretical setting to several different combinatorial objects such as hypergraphs, tournaments, permutations and so forth. However, these quasirandomness variants have been done in an ad‐hoc case‐by‐case manner. In this article, we propose three new hierarchies of quasirandomness properties that can be naturally defined for arbitrary combinatorial objects. Our properties are also “natural” in more formal sense: they are preserved by local combinatorial constructions. Similarly to hypergraph quasirandomness properties, we show that our quasirandomness properties have several different but equivalent characterizations. We also prove several implications and separations comparing them to each other and to what has been known for hypergraphs. The main notion explored is that of unique coupleability: two limit objects are uniquely coupleable if there is only one way to align (i.e., couple) them.

show abstract

Semantic limits of dense combinatorial objects

Cited by 13 publications

References 50 publications

Polynomial to exponential transition in Ramsey theory

Polynomial to exponential transition in Ramsey theory

Natural quasirandomness properties

Natural quasirandomness properties

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