Simulation in the aTAM

Informal Description of Simulation

For TAS's \(\mathcal{T}\) and \(\mathcal{S}\), simulation of \(\mathcal{T}\) by \(\mathcal{S}\) can be done according to a simple "block substitution scheme" where equal-size square blocks of tiles in assemblies produced by \(\mathcal{S}\) represent tiles in assemblies produced by \(\mathcal{T}\). Furthermore, since we wish to simulate the entire process of self-assembly, and not only the final result, it is critical that the simulation be such that the "local transition rules" involving intermediate producible (and nonterminal) assemblies of \(\mathcal{T}\) be faithfully represented in the simulation. Simulation has been studied in the context of intrinsic universality^[1][2].

Example

A single tile that assembles a line can be simulation in such a way that each tile of the simulated line is represented by \(2\times 2\) blocks. This basic example is meant to capture the idea of simulation using block representation. In practice, simulation is achieved using block sizes much larger than \(2\times 2\)^[2].

Seeded with a single tile, the tile set consisting of only this tile will assemble a line.

Seeded with a single \(2\times 2\) block representing the single tile \(L\), this tile set will simulate the assembly of the line with \(2\)-block super-tiles.

We can see that each tile of labeled \(L\) is represented by some \(2\times 2\) block.

A TAS with the tile set in the middle can simulate a TAS with tile set consisting of the single tile on the left. Simulation is depicted in the figure on the right.

Formal Definition

Since the notion of simulation is intended to capture not only what is being assembled by a TAS but also how assembly takes place, the definition has been split into two parts: equivalent production and equivalent dynamics. The definition of both of these uses the idea of block representation.

Block Representation

From this point on, let \(T\) be a \(d\)-dimensional tile set, and let \(m\in\mathbb{Z}^+\). An \(m\)-block supertile over \(T\) is a partial function \(\alpha:\mathbb{Z}_m^d \dashrightarrow T\), where \(\mathbb{Z}_m = \{0,1,\ldots,m-1\}\). Note that the dimension of the \(m\)-block is implicitly defined by the dimension of \(T\). Let \(B^T_m\) be the set of all \(m\)-block supertiles over \(T\). The \(m\)-block with no domain is said to be empty. For a general assembly \(\alpha:\mathbb{Z}^d \dashrightarrow T\) and \((x_0,\ldots x_{d-1})\in\mathbb{Z}^d\), define \(\alpha^m_{x_0,\ldots x_{d-1}}\) to be the \(m\)-block supertile defined by \(\alpha^m_{x_0,\ldots, x_{d-1}}(i_0,\ldots, i_{d-1}) = \alpha(mx_0+i_0,\ldots, mx_{d-1}+i_{d-1})\) for \(0 \leq i_0, \ldots, i_{d-1}< m.\) For some tile set \(S\) of dimension \(d' \geq d\), a partial function \(R: B^{S}_m \dashrightarrow T\) is said to be a valid \(m\)-block supertile representation from \(S\) to \(T\) if for any \(\alpha,\beta \in B^{S}_m\) such that \(\alpha \sqsubseteq \beta\) and \(\alpha \in \dom R\), then \(R(\alpha) = R(\beta)\).

Let \(d' \in \{ 2,3 \}\) and \(d \in \{ d' -1, d' \} \). Let \(f: \mathbb{Z}^{d'} \rightarrow \mathbb{Z}^{d}\), where \(f(x_0,\ldots,x_{d'-1}) = (x_0,\ldots,x_{d'-1})\) if \(d'=d\) and \(f(x_0,\ldots,x_{d'-1}) = (x_0,\ldots,x_{d-1},0)\) if \(d = d' -1\), and undefined otherwise. For a given valid \(m\)-block supertile representation function \(R\) from tile set \(S\) to tile set \(T\), define the assembly representation function \(R^*: \mathcal{A}^{S} \rightarrow \mathcal{A}^T\) such that \(R^*(\alpha') = \alpha\) if and only if \(\alpha(x_0,\ldots, x_{d-1}) = R\left(\alpha'^m_{x_0,\ldots, x_{d'-1}}\right)\) for all \((x_0,\ldots x_{d'-1}) \in \Z^{d'-1}\). Note that \(R^*\) is a total function since every assembly of \(S\) represents some assembly of \(T\); the functions \(R\) and \(\alpha\) are partial to allow undefined points to represent empty space. For an assembly \(\alpha' \in \mathcal{A}^{S}\) such that \(R(\alpha') = \alpha\), \(\alpha'\) is said to map cleanly to \(\alpha \in \mathcal{A}^T\) under \(R^*\) if for all non empty blocks \(\alpha'^m_{x_0,\ldots, x_{d'-1}},\) \((f(x_0,\ldots,x_{d'-1})+f(u_0,\ldots,u_{d'-1})) \in \dom \alpha\) for some \(u_0,\ldots, u_{d'-1} \in \{-1,0,1\}\) such that \(u_0^2 + \cdots + u_{d'-1}^2 \leq 1\), or if \(\alpha'\) has at most one non-empty \(m\)-block \(\alpha^m_{0, \ldots, 0}\). In other words, \(\alpha'\) may have tiles on supertile blocks representing empty space in \(\alpha\), but only if that position is adjacent to a tile in \(\alpha\). We call such growth "around the edges" of \(\alpha'\) fuzz and thus restrict it to be adjacent to only valid supertiles, but not diagonally adjacent (i.e. we do not permit diagonal fuzz).

In the following definitions, let \(\mathcal{T} = \left(T,\sigma_T,\tau_T\right)\) be a \(d\)-TAS for \(d \in \{2,3\}\), let \(\mathcal{S} = \left(S,\sigma_S,\tau_S\right)\) be a \(d'\)-TAS for \(d' \geq d\), and let \(R\) be an \(m\)-block representation function \(R:B^S_m \rightarrow T\).

Equivalent production

We say that \(\mathcal{S}\) and \(\mathcal{T}\) have equivalent productions (under \(R\)), and we write \(\mathcal{S} \Leftrightarrow \mathcal{T}\) if the following conditions hold:

1. \(\left\{R^*(\alpha') | \alpha' \in \prodasm{\mathcal{S}}\right\} = \prodasm{\mathcal{T}}\).
2. \(\left\{R^*(\alpha') | \alpha' \in \termasm{\mathcal{S}}\right\} = \termasm{\mathcal{T}}\).
3. For all \(\alpha'\in \prodasm{\mathcal{S}}\), \(\alpha'\) maps cleanly to \(R^*(\alpha')\).

Equivalent dynamics

Follows

We say that \(\mathcal{T}\) follows \(\mathcal{S}\) (under \(R\)), and we write \(\mathcal{T} \dashv_R \mathcal{S}\) if \(\alpha' \rightarrow^\mathcal{S} \beta'\), for some \(\alpha',\beta' \in \mathcal{A}[\mathcal{S}]\), implies that \(R^*(\alpha') \to^\mathcal{T} R^*(\beta')\).

Models

We say that \(\mathcal{S}\) models \(\mathcal{T}\) (under \(R\)), and we write \(\mathcal{S} \models_R \mathcal{T}\), if for every \(\alpha \in \mathcal{A}[\mathcal{T}]\), there exists \(\Pi \subset \mathcal{A}[\mathcal{S}]\) where \(R^*(\alpha') = \alpha\) for all \(\alpha' \in \Pi\), such that, for every \(\beta \in \mathcal{A}[\mathcal{T}]\) where \(\alpha \rightarrow^\mathcal{T} \beta\), (1) for every \(\alpha' \in \Pi\) there exists \(\beta' \in \mathcal{A}[\mathcal{S}]\) where \(R^*(\beta') = \beta\) and \(\alpha' \rightarrow^\mathcal{S} \beta'\), and (2) for every \(\alpha'' \in \mathcal{A}[\mathcal{S}]\) where \(\alpha'' \rightarrow^\mathcal{S} \beta'\), \(\beta' \in \mathcal{A}[\mathcal{S}]\), \(R^*(\alpha'') = \alpha\), and \(R^*(\beta') = \beta\), there exists \(\alpha' \in \Pi\) such that \(\alpha' \rightarrow^\mathcal{S} \alpha''\).

The previous definition essentially specifies that every time \(\mathcal{S}\) simulates an assembly \(\alpha \in \mathcal{A}[\mathcal{T}]\), there must be at least one valid growth path in \(\mathcal{S}\) for each of the possible next steps that \(\mathcal{T}\) could make from \(\alpha\) which results in an assembly in \(\mathcal{S}\) that maps to that next step.

Simulation

We say that \(\mathcal{S}\) simulates \(\mathcal{T}\) (under \(R\)) if \(\mathcal{S} \Leftrightarrow_R \mathcal{T}\) (equivalent productions), \(\mathcal{T} \dashv_R \mathcal{S}\) and \(\mathcal{S} \models_R \mathcal{T}\) (equivalent dynamics).

References