Leontief production function

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Also visit my web site ... hostgator1centcoupon.info In descriptive set theory, a tree on a set ${\displaystyle X}$ is a set of finite sequences of elements of ${\displaystyle X}$ that is closed under initial segments.

More formally, it is a subset ${\displaystyle T}$ of ${\displaystyle X^{<\omega }}$, such that if

${\displaystyle ⟨x_0,x_1,\dots ,x_{n-1}⟩\in T}$

and ${\displaystyle 0\le m<n}$,

then

${\displaystyle ⟨x_0,x_1,\dots ,x_{m-1}⟩\in T}$.

In particular, every nonempty tree contains the empty sequence.

A branch through ${\displaystyle T}$ is an infinite sequence

${\displaystyle \overrightarrow{x}\in X^{\omega }}$ of elements of ${\displaystyle X}$

such that, for every natural number ${\displaystyle n}$,

${\displaystyle \overrightarrow{x}|n\in T}$,

where ${\displaystyle \overrightarrow{x}|n}$ denotes the sequence of the first ${\displaystyle n}$ elements of ${\displaystyle \overrightarrow{x}}$. The set of all branches through ${\displaystyle T}$ is denoted ${\displaystyle [T]}$ and called the body of the tree ${\displaystyle T}$.

A tree that has no branches is called wellfounded; a tree with at least one branch is illfounded.

A node (that is, element) of ${\displaystyle T}$ is terminal if there is no node of ${\displaystyle T}$ properly extending it; that is, ${\displaystyle ⟨x_0,x_1,\dots ,x_{n-1}⟩\in T}$ is terminal if there is no element ${\displaystyle x}$ of ${\displaystyle X}$ such that that ${\displaystyle ⟨x_0,x_1,\dots ,x_{n-1},x⟩\in T}$. A tree with no terminal nodes is called pruned.

If we equip ${\displaystyle X^{\omega }}$ with the product topology (treating X as a discrete space), then every closed subset ${\displaystyle C}$ of ${\displaystyle X^{\omega }}$ is of the form ${\displaystyle [T]}$ for some pruned tree ${\displaystyle T}$ (namely, ${\displaystyle T:=\{\overrightarrow{x}|n:n\in \omega ,x\in C\}}$). Conversely, every set ${\displaystyle [T]}$ is closed.

Frequently trees on cartesian products ${\displaystyle X\times Y}$ are considered. In this case, by convention, the set ${\displaystyle (X\times Y{)}^{\omega }}$ is identified in the natural way with a subset of ${\displaystyle X^{\omega }\times Y^{\omega }}$, and ${\displaystyle [T]}$ is considered as a subset of ${\displaystyle X^{\omega }\times Y^{\omega }}$. We may then form the projection of ${\displaystyle [T]}$,

${\displaystyle p[T]=\{\overrightarrow{x}\in X^{\omega }|(\mathrm{\exists }\overrightarrow{y}\in Y^{\omega })⟨\overrightarrow{x},\overrightarrow{y}⟩\in [T]\}}$

Every tree in the sense described here is also a tree in the wider sense, i.e., the pair (T, <), where < is defined by

x<y ⇔ x is a proper initial segment of y,

is a partial order in which each initial segment is well-ordered. The height of each sequence x is then its length, and hence finite.

Conversely, every partial order (T, <) where each initial segment { y: y < x₀ } is well-ordered is isomorphic to a tree described here, assuming that all elements have finite height.

See also

• Laver tree
• Tree (set theory)
• König's lemma

References

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