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Random self-similar trees and their applications
Ilya Zaliapin
Department of Mathematics and StatisticsUniversity of Nevada, Reno
Frontier Probability DaysMarch 31, 2018
Co-author: Yevgeniy Kovchegov (Mathematics, Oregon State U)
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Introduction Trees in Nature
Trees in Nature
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Introduction Trees in Nature
Trees in Nature
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Introduction Binary trees with edge lengths
Rooted binary tree
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Introduction Binary trees with edge lengths
Rooted binary tree
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Introduction Binary trees with edge lengths
Rooted binary tree
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Introduction Binary trees with edge lengths
Rooted binary tree
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Introduction Binary trees with edge lengths
Rooted binary tree
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Introduction Binary trees with edge lengths
Rooted binary tree
Lplane - space of finite unlabeled rooted reduced binary trees with edgelengths, including an empty tree φ = {ρ} comprised of a root vertex ρ and noedges.
d(x , y): the length of the minimal path within T between x and y .
The length of a tree T is the sum of the lengths of its edges:
length(T ) =
#T∑i=1
li .
The height of a tree T is the maximal distance between the root and a vertex:
height(T ) = max1≤i≤#T
d(vi , ρ).
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Introduction Binary trees with edge lengths
Galton-Watson trees
A Galton-Watson process is a simple (Markov) model of population growth.
The process starts with a single progenitor at time t = 0.
At each integer instant t > 0 each member terminates and leaves a randomnumber k of offspring according to a distribution {pk}, k = 0, 1, . . . .
If p0 + p2 = 1 (only zero or two offspring are possible), the process is calledbinary.
If E(k) = 1 (constant expected progeny), the process is called critical.
A Galton-Watson tree describes a trajectory of the process.
A Galton-Watson tree with i.i.d. exponential edge lengths with parameter λis called exponential GW tree GW(λ).
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Introduction Binary trees with edge lengths
Galton-Watson trees
A Galton-Watson process is a simple (Markov) model of population growth.
The process starts with a single progenitor at time t = 0.
At each integer instant t > 0 each member terminates and leaves a randomnumber k of offspring according to a distribution {pk}, k = 0, 1, . . . .
If p0 + p2 = 1 (only zero or two offspring are possible), the process is calledbinary.
If E(k) = 1 (constant expected progeny), the process is called critical.
A Galton-Watson tree describes a trajectory of the process.
A Galton-Watson tree with i.i.d. exponential edge lengths with parameter λis called exponential GW tree GW(λ).
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Introduction Binary trees with edge lengths
Galton-Watson trees
A Galton-Watson process is a simple (Markov) model of population growth.
The process starts with a single progenitor at time t = 0.
At each integer instant t > 0 each member terminates and leaves a randomnumber k of offspring according to a distribution {pk}, k = 0, 1, . . . .
If p0 + p2 = 1 (only zero or two offspring are possible), the process is calledbinary.
If E(k) = 1 (constant expected progeny), the process is called critical.
A Galton-Watson tree describes a trajectory of the process.
A Galton-Watson tree with i.i.d. exponential edge lengths with parameter λis called exponential GW tree GW(λ).
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Introduction Binary trees with edge lengths
Galton-Watson trees
A Galton-Watson process is a simple (Markov) model of population growth.
The process starts with a single progenitor at time t = 0.
At each integer instant t > 0 each member terminates and leaves a randomnumber k of offspring according to a distribution {pk}, k = 0, 1, . . . .
If p0 + p2 = 1 (only zero or two offspring are possible), the process is calledbinary.
If E(k) = 1 (constant expected progeny), the process is called critical.
A Galton-Watson tree describes a trajectory of the process.
A Galton-Watson tree with i.i.d. exponential edge lengths with parameter λis called exponential GW tree GW(λ).
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Introduction Binary trees with edge lengths
Galton-Watson trees
A Galton-Watson process is a simple (Markov) model of population growth.
The process starts with a single progenitor at time t = 0.
At each integer instant t > 0 each member terminates and leaves a randomnumber k of offspring according to a distribution {pk}, k = 0, 1, . . . .
If p0 + p2 = 1 (only zero or two offspring are possible), the process is calledbinary.
If E(k) = 1 (constant expected progeny), the process is called critical.
A Galton-Watson tree describes a trajectory of the process.
A Galton-Watson tree with i.i.d. exponential edge lengths with parameter λis called exponential GW tree GW(λ).
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Introduction Binary trees with edge lengths
Galton-Watson trees
A Galton-Watson process is a simple (Markov) model of population growth.
The process starts with a single progenitor at time t = 0.
At each integer instant t > 0 each member terminates and leaves a randomnumber k of offspring according to a distribution {pk}, k = 0, 1, . . . .
If p0 + p2 = 1 (only zero or two offspring are possible), the process is calledbinary.
If E(k) = 1 (constant expected progeny), the process is called critical.
A Galton-Watson tree describes a trajectory of the process.
A Galton-Watson tree with i.i.d. exponential edge lengths with parameter λis called exponential GW tree GW(λ).
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Introduction Prune invariance
Prune invariance results
Neveu (1986): established invariance of an exponential critical andsub-critical binary Galton-Watson tree GW(λ) with respect to the treeerasure (a.k.a. leaf-length pruning, trimming).
Burd, Waymire, and Winn (2000): established invariance of the critical binaryGalton-Watson tree (with no edge lengths) with respect to Horton pruning(cutting the tree leaves).
Burd, Waymire, and Winn (2000): established that Horton prune invarianceis a characteristic property of the critical binary tree, in the space of (notnecessarily binary) Galton-Watson trees with no edge lengths.
Duquesne and Winkel (2012): established invariance of the Galton-Watson(non-binary) trees with respect to hereditary reduction.
Next: give a unified description of various pruning operations and generalize theinvariance results.
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Generalized dynamical pruning Definition
Partial order on trees
∆x,T is the subtree descendant to point x ∈ T .
Partial order: T1 � T2 if and only if ∃ an isometry f : (T1, d)→ (T2, d).
ρ1
T1
T2
Δx,T
x
T
(b) Isometry(a) Descendant tree
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Generalized dynamical pruning Definition
Generalized dynamical pruning
Consider a monotone non-decreasing ϕ : Lplane → R+, i.e. ϕ(T1) ≤ ϕ(T2)whenever T1 � T2.
Generalized dynamical pruning operator
St(ϕ,T ) : Lplane → Lplane
induced by ϕ at any t ≥ 0 cuts all subtrees ∆x,T for which the value of ϕ isbelow threshold t.
Formally,
St(ϕ,T ) := ρ ∪{x ∈ T \ ρ : ϕ
(∆x,T
)≥ t}.
Here, Ss(ϕ,T ) � St(ϕ,T ) whenever s ≥ t.
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Generalized dynamical pruning Definition
Generalized dynamical pruning
Informally,
Consider a function ϕ : T → R+, that is non-decreasing along every pathfrom a leaf to the root.
Generalized dynamical pruning operator St(ϕ,T ) induced by ϕ at any t ≥ 0cuts all points x ∈ T for which the value of ϕ is below threshold t.
IIIIII
Generic stages in dynamical pruning of a tree: an example.
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Generalized dynamical pruning Examples
Example 1: Pruning by tree height (tree erasure)
Let the function ϕ(T ) equal the height of T :
ϕ(T ) = height(T ).
Semigroup property: St ◦ Ss = St+s for any t, s ≥ 0.
It coincides with the tree erasure introduced by Neveu (1986), and furtherexamined by Le Jan (1991), Duquesne and Winkel (2007, 2012), Evans,Pitman and Winter (2006), and others.
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Generalized dynamical pruning Examples
Example 2: Pruning by tree length
Let the function ϕ(T ) equal the total lengths of T :
ϕ(T ) = length(T ).
No semigroup property.
Closely related to the dynamics of a particular Hamilton-Jacobi equation.
VIVIIIIII
ab
c
a-t
b-t b-t
c c c a+b+c-t
a+b <t <a+b+cb ≤ t ≤ a+ba ≤ t < b0 < t < at = 0
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Generalized dynamical pruning Examples
Example 3: Horton pruning
Letϕ(T ) = k(T )− 1,
where the Horton-Strahler order k(T ) is the minimal number of Hortonprunings R (cutting the tree leaves and applying series reduction) necessaryto eliminate all points in tree T except ρ.
Semigroup property with St = Rbtc.The Horton-Strahler order k(T ) is known as the register number as it equalsthe minimum number of memory registers necessary to evaluate anarithmetic expression described by a tree T .
Studied by Burd, Waymire, and Winn (2000).
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Generalized dynamical pruning Prune invariance of Galton-Watson trees
Prune invariance for Galton-Watson trees
Theorem (Arnold, Kovchegov, IZ [2017] )
Let Td= GW(λ) be an exponential critical binary Galton-Watson tree with
parameter λ > 0. Then, for any monotone non-decreasing functionϕ : Lplane → R+, the pruned tree T t conditioned on surviving is an exponentialcritical binary Galton-Watson tree with parameter
Et(λ, ϕ) = λpt(λ, ϕ).
Formally,
T t :={St(ϕ,T )|St(ϕ,T ) 6= φ
} d= GW(λpt
(λ, ϕ)
),
where pt(λ, ϕ) = P(St(ϕ,T ) 6= φ).
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Generalized dynamical pruning Prune invariance of Galton-Watson trees
Prune invariance results
Moreover,
Theorem (Arnold, Kovchegov, Z [2017] )
(a) If ϕ(T ) equals the total length of T (ϕ = length(T )), then
Et(λ, ϕ) = λe−λt[I0(λt) + I1(λt)
].
(b) If ϕ(T ) equals the height of T (ϕ = height(T )), then
Et(λ, ϕ) =2λ
λt + 2.
(c) If ϕ(T ) + 1 equals the Horton-Strahler order of the tree T , then
Et(λ, ϕ) = λ2−btc.
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Generalized prune invariance Definition
Generalized prune-invariance
Definition (Prune-invariance)
Consider a probability measure µ on Lplane such that µ(φ) = 0. Let
ν(T ) = µ ◦ S−1t (T ) = µ
(S−1t (T )
).
Measure µ is called invariant with respect to the pruning operator St(ϕ,T ) if forany tree T ∈ Lplane we have
µ(T ) = ν(T |T 6= φ).
Also need the invariance of the distribution of edge lengths in the pruned treeTt := St(ϕ,T ). Kovchegov & Z [2017] - arXiv:1608.05032
A weaker mean invariance only preserves the means of selected branchstatistics.
Open question: finding and classifying all the invariant probability measures µ onLplane.
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Horton pruning
Horton pruning
Pruning R(T ) of a finite tree T cuts the leaves and degree-2 chainsconnected to leaves.
Nodes cut at k-th pruning, Rk−1(T ) \ Rk(T ), have order k, k ≥ 1.
A chain of the same order vertices is called branch.
Let Nk is the number of branches of order k ; and Nij is the number ofinstances when an order-i branch merges an order-j branch.
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Horton pruning
Horton pruning
Pruning R(T ) of a finite tree T cuts the leaves and degree-2 chainsconnected to leaves.
Nodes cut at k-th pruning, Rk−1(T ) \ Rk(T ), have order k, k ≥ 1.
A chain of the same order vertices is called branch.
Let Nk is the number of branches of order k ; and Nij is the number ofinstances when an order-i branch merges an order-j branch.
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Horton pruning
Horton pruning
Pruning R(T ) of a finite tree T cuts the leaves and degree-2 chainsconnected to leaves.
Nodes cut at k-th pruning, Rk−1(T ) \ Rk(T ), have order k, k ≥ 1.
A chain of the same order vertices is called branch.
Let Nk is the number of branches of order k ; and Nij is the number ofinstances when an order-i branch merges an order-j branch.
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Horton pruning
Horton pruning
Pruning R(T ) of a finite tree T cuts the leaves and degree-2 chainsconnected to leaves.
Nodes cut at k-th pruning, Rk−1(T ) \ Rk(T ), have order k, k ≥ 1.
A chain of the same order vertices is called branch.
Let Nk is the number of branches of order k ; and Nij is the number ofinstances when an order-i branch merges an order-j branch.
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Horton pruning
Horton pruning
Pruning R(T ) of a finite tree T cuts the leaves and degree-2 chainsconnected to leaves.
Nodes cut at k-th pruning, Rk−1(T ) \ Rk(T ), have order k, k ≥ 1.
A chain of the same order vertices is called branch.
Let Nk is the number of branches of order k ; and Nij is the number ofinstances when an order-i branch merges an order-j branch.
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Horton pruning
Horton pruning
Pruning R(T ) of a finite tree T cuts the leaves and degree-2 chainsconnected to leaves.
Nodes cut at k-th pruning, Rk−1(T ) \ Rk(T ), have order k, k ≥ 1.
A chain of the same order vertices is called branch.
Let Nk is the number of branches of order k ; and Nij is the number ofinstances when an order-i branch merges an order-j branch.
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Horton pruning
Horton pruning
Pruning R(T ) of a finite tree T cuts the leaves and degree-2 chainsconnected to leaves.
Nodes cut at k-th pruning, Rk−1(T ) \ Rk(T ), have order k, k ≥ 1.
A chain of the same order vertices is called branch.
Let Nk is the number of branches of order k ; and Nij is the number ofinstances when an order-i branch merges an order-j branch.
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Horton pruning
Horton pruning
Tree T has order k(T ) = 3 since it is eliminated in three prunings.
T R2(T) R3(T) R(T)
Cutting
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Horton pruning Statistical approach to prune invariance
Statistical approach to prune invariance[Kovchegov and Z, Fractals, 2016]
The Tokunaga coefficient Tij is the average number of branches of order ithat merge with a branch of order j :
Tij =E[Nij ]
E[Nj ], 1 ≤ i < j ≤ K .
The coefficients Tij form the Tokunaga matrix
TK =
0 T1,2 T1,3 . . . T1,K
0 0 T2,3 . . . T2,K
0 0. . .
. . ....
......
. . . 0 TK−1,K
0 0 0 0 0
.
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Horton pruning Statistical approach to prune invariance
Statistical approach to prune invariance
Theorem ( Kovchegov and Z [2016] )
(Subject to some conditions) a probability measure µ on Lplane is mean Hortoninvariant if and only if
Ti,i+k = Tk for all i , k > 0
for some sequence Tk ≥ 0.
The Tokunaga matrix becomes Toeplitz
TK =
0 T1 T2 . . . TK−1
0 0 T1 . . . TK−2
0 0. . .
. . ....
......
. . . 0 T1
0 0 0 0 0
.
Burd, Waymire and Winn [2000] established this for Galton-Watson trees.
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Horton pruning Geometric branching process
Geometric branching processKovchegov and Z [2017, 2018]
A Geometric Branching Process (GBP) produces prune-invariant trees forarbitrary Tokunaga sequences {Tk}.A special class of critical Tokunaga processes appears with
Tk = (c − 1)ck−1, c ≥ 1.
(The case c = 2 corresponds to the critical binary GW tree.)
The critical Tokunaga property is equivalent to the time shift invariance ofthe GBP.
The critical Tokunaga trees are characterized by the property that each oftheir sub-trees (properly defined) has the same distribution as a random tree.
A more general property Tk = a ck−1 is equivalent to the asymptotic (inbranch order) time shift invariance of the GBP.
Interestingly, the Tokunaga trees with Tk = a ck−1 are well known in appliedliterature...
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Horton pruning Geometric branching process
Geometric branching processKovchegov and Z [2017, 2018]
A Geometric Branching Process (GBP) produces prune-invariant trees forarbitrary Tokunaga sequences {Tk}.A special class of critical Tokunaga processes appears with
Tk = (c − 1)ck−1, c ≥ 1.
(The case c = 2 corresponds to the critical binary GW tree.)
The critical Tokunaga property is equivalent to the time shift invariance ofthe GBP.
The critical Tokunaga trees are characterized by the property that each oftheir sub-trees (properly defined) has the same distribution as a random tree.
A more general property Tk = a ck−1 is equivalent to the asymptotic (inbranch order) time shift invariance of the GBP.
Interestingly, the Tokunaga trees with Tk = a ck−1 are well known in appliedliterature...
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![Page 38: University of Nevada, Renofiras/FPD18/Talks/Zaliapin.pdfUniversity of Nevada, Reno Frontier Probability Days March 31, 2018 Co-author: Yevgeniy Kovchegov (Mathematics, Oregon State](https://reader034.vdocuments.site/reader034/viewer/2022051906/5ff83b65d7d2ec1a371e9cda/html5/thumbnails/38.jpg)
Horton pruning Geometric branching process
Geometric branching processKovchegov and Z [2017, 2018]
A Geometric Branching Process (GBP) produces prune-invariant trees forarbitrary Tokunaga sequences {Tk}.A special class of critical Tokunaga processes appears with
Tk = (c − 1)ck−1, c ≥ 1.
(The case c = 2 corresponds to the critical binary GW tree.)
The critical Tokunaga property is equivalent to the time shift invariance ofthe GBP.
The critical Tokunaga trees are characterized by the property that each oftheir sub-trees (properly defined) has the same distribution as a random tree.
A more general property Tk = a ck−1 is equivalent to the asymptotic (inbranch order) time shift invariance of the GBP.
Interestingly, the Tokunaga trees with Tk = a ck−1 are well known in appliedliterature...
Ilya Zaliapin (UNR) Self-Similar Trees 03/31/2018 (OSU-FPD) 21 / 33
![Page 39: University of Nevada, Renofiras/FPD18/Talks/Zaliapin.pdfUniversity of Nevada, Reno Frontier Probability Days March 31, 2018 Co-author: Yevgeniy Kovchegov (Mathematics, Oregon State](https://reader034.vdocuments.site/reader034/viewer/2022051906/5ff83b65d7d2ec1a371e9cda/html5/thumbnails/39.jpg)
Horton pruning Geometric branching process
Geometric branching processKovchegov and Z [2017, 2018]
A Geometric Branching Process (GBP) produces prune-invariant trees forarbitrary Tokunaga sequences {Tk}.A special class of critical Tokunaga processes appears with
Tk = (c − 1)ck−1, c ≥ 1.
(The case c = 2 corresponds to the critical binary GW tree.)
The critical Tokunaga property is equivalent to the time shift invariance ofthe GBP.
The critical Tokunaga trees are characterized by the property that each oftheir sub-trees (properly defined) has the same distribution as a random tree.
A more general property Tk = a ck−1 is equivalent to the asymptotic (inbranch order) time shift invariance of the GBP.
Interestingly, the Tokunaga trees with Tk = a ck−1 are well known in appliedliterature...
Ilya Zaliapin (UNR) Self-Similar Trees 03/31/2018 (OSU-FPD) 21 / 33
![Page 40: University of Nevada, Renofiras/FPD18/Talks/Zaliapin.pdfUniversity of Nevada, Reno Frontier Probability Days March 31, 2018 Co-author: Yevgeniy Kovchegov (Mathematics, Oregon State](https://reader034.vdocuments.site/reader034/viewer/2022051906/5ff83b65d7d2ec1a371e9cda/html5/thumbnails/40.jpg)
Horton pruning Geometric branching process
Geometric branching processKovchegov and Z [2017, 2018]
A Geometric Branching Process (GBP) produces prune-invariant trees forarbitrary Tokunaga sequences {Tk}.A special class of critical Tokunaga processes appears with
Tk = (c − 1)ck−1, c ≥ 1.
(The case c = 2 corresponds to the critical binary GW tree.)
The critical Tokunaga property is equivalent to the time shift invariance ofthe GBP.
The critical Tokunaga trees are characterized by the property that each oftheir sub-trees (properly defined) has the same distribution as a random tree.
A more general property Tk = a ck−1 is equivalent to the asymptotic (inbranch order) time shift invariance of the GBP.
Interestingly, the Tokunaga trees with Tk = a ck−1 are well known in appliedliterature...
Ilya Zaliapin (UNR) Self-Similar Trees 03/31/2018 (OSU-FPD) 21 / 33
![Page 41: University of Nevada, Renofiras/FPD18/Talks/Zaliapin.pdfUniversity of Nevada, Reno Frontier Probability Days March 31, 2018 Co-author: Yevgeniy Kovchegov (Mathematics, Oregon State](https://reader034.vdocuments.site/reader034/viewer/2022051906/5ff83b65d7d2ec1a371e9cda/html5/thumbnails/41.jpg)
Horton pruning Geometric branching process
Geometric branching processKovchegov and Z [2017, 2018]
A Geometric Branching Process (GBP) produces prune-invariant trees forarbitrary Tokunaga sequences {Tk}.A special class of critical Tokunaga processes appears with
Tk = (c − 1)ck−1, c ≥ 1.
(The case c = 2 corresponds to the critical binary GW tree.)
The critical Tokunaga property is equivalent to the time shift invariance ofthe GBP.
The critical Tokunaga trees are characterized by the property that each oftheir sub-trees (properly defined) has the same distribution as a random tree.
A more general property Tk = a ck−1 is equivalent to the asymptotic (inbranch order) time shift invariance of the GBP.
Interestingly, the Tokunaga trees with Tk = a ck−1 are well known in appliedliterature...
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Horton pruning Tokunaga trees
River networks
[Shreve 1966, 1969; Tokunaga, 1978; Peckham, 1995; Burd et al., 2000; Z et al., 2009;
Zanardo et al., 2013]
http://wwf.panda.org
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Horton pruning Tokunaga trees
Hillslope drainage networks
[Z et al., 2009]
Makalu Everest
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Horton pruning Tokunaga trees
Vein structure of botanical leaves
[Newman et al., 1997; Turcotte et al., 1998]
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Horton pruning Tokunaga trees
Earthquake aftershock clusters
[Yoder et al., 2011]
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Horton pruning Tokunaga trees
Diffusion limited aggregation
[Ossadnik, 1992; Masek and Turcotte, 1993]
http://markjstock.org/dla3d/images/save47c_e.png
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Horton pruning Tokunaga trees
Two dimensional site percolation
[Turcotte et al., 1999; Yakovlev et al., 2005; Z et al., 2006]
http://www.opencourse.info/anderson/l1024pc.png
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Horton pruning Tokunaga trees
Dynamics of billiards
[Gabrielov et al., 2008; Patterson et al., 2016]
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Tree representation of a function
Tree representation of a function, level(Xt)Z and Kovchegov, 2012
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Tree representation of a function
Tree representation of a function, level(Xt)Z and Kovchegov, 2012
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Tree representation of a function
Tree representation of a function, level(Xt)Z and Kovchegov, 2012
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Tree representation of a function
Tree representation of a function, level(Xt)Z and Kovchegov, 2012
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Tree representation of a function
Tree representation of a function, level(Xt)Z and Kovchegov, 2012
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Tree representation of a function
Tree representation of a function, level(Xt)Z and Kovchegov, 2012
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Tree representation of a function
Tree representation of a function, level(Xt)Z and Kovchegov, 2012
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Tree representation of a function
Tree representation of a function, level(Xt)Z and Kovchegov, 2012
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Tree representation of a function
Tree representation of a function, level(Xt)Z and Kovchegov, 2012
Local maxima Local minima
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Tree representation of a function
Tree representation of a function
(a) Tree T (b) Harris path HT
Theorem (J. Neveu and J. Pitman [1989], J. F. Le Gall [1993] )
The level-set tree level(Xt) is an exponential critical binary Galton-Watson treeGW(λ) if and only if the rises and falls of Xt , excluding the last fall, are i.i.d.exponential random variables with parameter λ/2.
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Tree representation of a function
Pruning time series
Proposition ( Z and Kovchegov [2012])
1 The transition from a time series Xk to the time series Xmink of its local
minima corresponds to the Horton pruning of the level-set tree level(X ).
2 A symmetric random walk in discrete time corresponds to a critical Tokunagatree with c = 2 (i.e., Tk = 2k−1). In particular, the critical Galton-Watsontree corresponds a symmetric exponential random walk.
Open problem: Finding all the time series models invariant with respect to Hortonpruning.
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Summary
Summary
Generalized dynamical pruning encompasses a number of continuous anddiscrete pruning operations.
Horton prune invariance is equivalent to the existence of Tokunagacoefficients Tk := Ti,i+k (under some natural conditions).
Geometric Branching Model generates prune-invariant trees for an arbitrarysequence Tk .
Tokunaga trees, Tk = ack−1, is a subclass widely seen in observations. It isequivalent to the time shift invariance.
Future: A possibility to study non-linear wave dynamics as a dynamicalpruning (proof-of-concept results for Hamilton-Jacobi systems).
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Summary
Summary
Generalized dynamical pruning encompasses a number of continuous anddiscrete pruning operations.
Horton prune invariance is equivalent to the existence of Tokunagacoefficients Tk := Ti,i+k (under some natural conditions).
Geometric Branching Model generates prune-invariant trees for an arbitrarysequence Tk .
Tokunaga trees, Tk = ack−1, is a subclass widely seen in observations. It isequivalent to the time shift invariance.
Future: A possibility to study non-linear wave dynamics as a dynamicalpruning (proof-of-concept results for Hamilton-Jacobi systems).
Ilya Zaliapin (UNR) Self-Similar Trees 03/31/2018 (OSU-FPD) 32 / 33
![Page 62: University of Nevada, Renofiras/FPD18/Talks/Zaliapin.pdfUniversity of Nevada, Reno Frontier Probability Days March 31, 2018 Co-author: Yevgeniy Kovchegov (Mathematics, Oregon State](https://reader034.vdocuments.site/reader034/viewer/2022051906/5ff83b65d7d2ec1a371e9cda/html5/thumbnails/62.jpg)
Summary
Summary
Generalized dynamical pruning encompasses a number of continuous anddiscrete pruning operations.
Horton prune invariance is equivalent to the existence of Tokunagacoefficients Tk := Ti,i+k (under some natural conditions).
Geometric Branching Model generates prune-invariant trees for an arbitrarysequence Tk .
Tokunaga trees, Tk = ack−1, is a subclass widely seen in observations. It isequivalent to the time shift invariance.
Future: A possibility to study non-linear wave dynamics as a dynamicalpruning (proof-of-concept results for Hamilton-Jacobi systems).
Ilya Zaliapin (UNR) Self-Similar Trees 03/31/2018 (OSU-FPD) 32 / 33
![Page 63: University of Nevada, Renofiras/FPD18/Talks/Zaliapin.pdfUniversity of Nevada, Reno Frontier Probability Days March 31, 2018 Co-author: Yevgeniy Kovchegov (Mathematics, Oregon State](https://reader034.vdocuments.site/reader034/viewer/2022051906/5ff83b65d7d2ec1a371e9cda/html5/thumbnails/63.jpg)
Summary
Summary
Generalized dynamical pruning encompasses a number of continuous anddiscrete pruning operations.
Horton prune invariance is equivalent to the existence of Tokunagacoefficients Tk := Ti,i+k (under some natural conditions).
Geometric Branching Model generates prune-invariant trees for an arbitrarysequence Tk .
Tokunaga trees, Tk = ack−1, is a subclass widely seen in observations. It isequivalent to the time shift invariance.
Future: A possibility to study non-linear wave dynamics as a dynamicalpruning (proof-of-concept results for Hamilton-Jacobi systems).
Ilya Zaliapin (UNR) Self-Similar Trees 03/31/2018 (OSU-FPD) 32 / 33
![Page 64: University of Nevada, Renofiras/FPD18/Talks/Zaliapin.pdfUniversity of Nevada, Reno Frontier Probability Days March 31, 2018 Co-author: Yevgeniy Kovchegov (Mathematics, Oregon State](https://reader034.vdocuments.site/reader034/viewer/2022051906/5ff83b65d7d2ec1a371e9cda/html5/thumbnails/64.jpg)
Summary
Summary
Generalized dynamical pruning encompasses a number of continuous anddiscrete pruning operations.
Horton prune invariance is equivalent to the existence of Tokunagacoefficients Tk := Ti,i+k (under some natural conditions).
Geometric Branching Model generates prune-invariant trees for an arbitrarysequence Tk .
Tokunaga trees, Tk = ack−1, is a subclass widely seen in observations. It isequivalent to the time shift invariance.
Future: A possibility to study non-linear wave dynamics as a dynamicalpruning (proof-of-concept results for Hamilton-Jacobi systems).
Ilya Zaliapin (UNR) Self-Similar Trees 03/31/2018 (OSU-FPD) 32 / 33
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Summary
References
Y. Kovchegov and I. Zaliapin (2018)
Tokunaga self similarity arises naturally from time invariance
arxiv:1803.03741
Y. Kovchegov and I. Zaliapin (2017)
Horton self-similarity of Kingman’s coalescent tree
Annales de l’Institut Henri Poincare (B) Probability and Statistics, 53(3), 1069-1107.
M. Arnold, Y. Kovchegov and I. Zaliapin (2017)
Dynamical pruning of binary trees with applications to inviscid Burgers equation
arxiv:1707.01984
Y. Kovchegov and I. Zaliapin (2016)
Horton Law in Self-Similar Trees
Fractals, 24, 1650017
Y. Kovchegov and I. Zaliapin (2016)
Random self-similar trees and a hierarchical branching process
arxiv:1608.05032, in review
I. Zaliapin and Y. Kovchegov (2012)
Tokunaga and Horton self-similarity for level set trees of Markov chains
Chaos, Solitons, and Fractals, 45, 358-372.Ilya Zaliapin (UNR) Self-Similar Trees 03/31/2018 (OSU-FPD) 33 / 33