Difference between revisions of "Gemstone-like molecular element"

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= General properties of DMEs =
 
= General properties of DMEs =
  
[Todo: slim down this page by split up to other pages]
+
To get a better picture how DMEs behave mechanically
 +
and in general how everything else behaves at this size range
 +
one can look at the [[scaling laws]] which describe how physical quantities scale with size.
  
 
DMEs with carbon, silicon carbide or silicon as core material can be can have internal structure like
 
DMEs with carbon, silicon carbide or silicon as core material can be can have internal structure like
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Spheres are rather rather hard to approximate. [to investigate: feasability of ball joints]
 
Spheres are rather rather hard to approximate. [to investigate: feasability of ball joints]
 
== Forces from compressive and tensile stresses  ==
 
 
It can be helpful or at least satisfying to get something of an '''intuitive understanding for the consistence or "feel" of DME components'''.
 
 
As the size of a rod of any material shrinks linearly (in all three dimensions) the area of the cross section shrinks quadratically.
 
Consequently when keeping tension/compression stress constant the forces fall quadratically and one arrives at very low forces.
 
'''[Sacling law: longitudinal force ~ length^2]'''
 
This can be seen nicely in the low seeming inter-atomic spring constants.
 
E.g. the equilibrium position spring constant of an bond in diamond (sp3 carbon-carbon-bond) is about 440nN/nm or 0.44daN/cm (1daN~1kg).
 
 
In order to get a feel for these forces one can transform atomic spring constants unchanged to the macrocosm.
 
This can be done by letting the number of parallel and serial bonds grow equally so that the changement of stiffness through [http://en.wikipedia.org/wiki/Series_and_parallel_springs serial and parallel] connection of bonds compensate.
 
Here for convenience 10,000,000,000 bonds are assumed to be chained serially.
 
We must apply this scaling to the number of parallel bonds too but here it divides up in each dimension of the cross-section sqrt(10^10) = 100,000.
 
With the diamond bond (C-C sp3) length of 1.532Amstrong and area per bond of 6.701Amstrong^2 = (2.59Amstrong)^2 one gets a diamond string (with square cross-section) of 1.532m length and 25.9um thickness side to side (half a hair) that retains the atomic spring constant of 440N/m or 0.44daN/cm (1daN~1kg)
 
If you bind up a half liter bottle of water with that (somewhat dangerous knife like) string it will bend around 1cm.
 
 
Putting one end of the sting in a vacuum filled square piston that seals tightly shows how little effect everyday pressures have at the micro and nanocosmos.
 
Taking 1bar = 10^5N/m^2 ambient pressure the string experiences a force of only 67.1µN and elongates 0.152µm an invisible amount.
 
 
'''Though''' as seen '''bonds are rather compliable DMEs are still hard diamond since''' [//en.wikipedia.org/wiki/Hardness hardness] is closely related to
 
'''tensile and compressive stress''' which '''is scale invariant'''.
 
The small force representation of high pressures might be a bit counterintuitive and hard to grasp.
 
 
By making the compliance at the nanolevel experiencable
 
the model with the weight on the ''one bond equivalent diamond string'' should make one (maybe obvious) '''practical thing''' clear.
 
That '''it is very effective to focus forces'''.
 
 
In [[mechanosynthesis]] conical tips can easily focus forces down to a more compliable size level. Not much of a size difference is needed.
 
Nanoscale manipulators in the [[machine phase]] can hold back on their supporting structures they're mounted to.
 
It is easy to create DMEs with high internal strains such as strained shell cylindrical structures, press fittings, structures under high tensile stress and more.
 
'''Great amounts of elastic energy can be stored''' (permanently or temporarily).
 
 
Example of safely usable pressures from [[Nanosystems]] section 2.3.2.:
 
Assuming ~1% strain the required stress is ~1% of diamonds young modulus.
 
10nN/nm^2 = 10GPa = 1000daN/mm^2 (1daN~1kg)
 
this is 20% of the tensile strength of macro-scale diamond with natural flaws.
 
Flawless [[mechanosynthesis|mechanosynthetically]] assembled diamond will be capable of handling more stress.
 
 
[Todo: add info about shearing stress]
 
 
== Surfaces ==
 
 
When viewing the thickness of a surface as the distance from the point of maximally attractive VdW force to the point of equally repulsive VdW force (experienced by some probing tip) the thickness of the surface relative to the thickness of the diamondoid part is enormous.
 
This makes DMEs somewhat soft in compressibility but not all that much as can be guessed by the compressibility of [http://en.wikipedia.org/wiki/HOPG single crystalline graphite] which is a stack of graphene sheets.
 
 
[Todo: add further relevant scaling laws & example calculation]
 
  
 
== VdW sticking ==
 
== VdW sticking ==

Revision as of 15:19, 27 January 2014

Diamondoid molecular elements (DMEs) are structural elements or machine elements at the lower physical size limit. They are produced via mechanosynthesis and are often are highly symetrical. Since metals are unsuitable (they lack directed bonds and tend to diffuse) diamondoid materials must be used. Diamondoid molecular elements are central in technology level III and technology level II.

  • DM machine elements (DMMEs) (examples) like e.g. bearigs and gears have completely passivated surfaces.
  • DM structural elements (DMSEs) (example) are minimally sized structural building blocks that are only partially passivated. They expose multiple radicals on some of their surfaces that act as AP welding interfaces to complementary surfaces. The step of connecting surface interfaces is done in assembly level II and is irreversible.

Name suggestion: since DMEs are somewhat of a cross between crystals and molecules why not call them "crystolecules"

  • DME ... Diamodoid Molecular Element (stiff - small - minimal)
  • DMME ... D.M. Machine Element
  • DMSE ... D.M. Structural Element

Diamondoid molecular machine elements

Images of some examples can be found here: [1].

Types

Bearings

DMME bearings exhibit superlubrication. In the case of diamondoid rotative bearings this looks like described here: E.Drexler's blog: Symmetric molecular bearings can exhibit low energy barriers that are insensitive to details of the potential energy function.

The occurring friction is orders of magnitude lower than the one occurring when liquid lubricants are used in macro ore microscopic (non AP) bearings E.Drexler's blog: Phonon drag in sleeve bearings can be orders of magnitude smaller than viscous drag in liquids.

DMME bearings can be built such that the force between bearing and axle is anti-compressive further lowering dynamic drag but also lowering stiffness possibly down to zero. E.Drexler's blog: Bearings can be stable despite attractive interactions between their surfaces

If badly chosen the combined symmetry of bearing and axle can create a bistable tristable or an other low symmetry configuration. This should usually be avoided. Some symmetry considerations can be found here: Zyvex; Ralph C. Merkle: A Proof About Molecular Bearings and iirc on the Nanoengineer-1 developer wiki which went missing. :(

A tutorial on bearing design can be found here: A Low-Friction Molecular Bearing Assembly Tutorial, v1

Friction elements

Interlocking teeth with low stiffness can snap back and thermalize energy. E.Drexler's blog: Softly supported sliding atoms can undergo abrupt transitions in energy This can serve as a break (analog to an electrical resistor in an electrical circuit)

Gears

Single rows of protruding atoms can be used as gear teeth. Considerations about stiffness as in superlubrication for DMME bearings are relevant [more details needed]. A simple pair of inter-meshing straight bevel-gears have higher bumpiness than well designed DMME bearings. This can be reduced by making the gears helical. Example designs are needed. Using more than one row for a gear tooth will lead to more "bumpiness" but also potentially higher transmittable torque. Further investigation needed

Fasteners

Details can be found on the locking mechanisms page.
Enclosed radicals could be used to make very compact reversible connectors (name suggestion: covaconns - for covalent connectors)

  • expanding ridge joint

Pumps

There is a model of a single atom neon pump which to some degree acts as a filter too. Positive displacement pumps like piston pumps scroll pumps or progressing cavity pumps have not yet been designed.

Others

[Todo: telescoptc rods; joints; hinges .... ball joints -> issues lack of ball curvature?]

Sets

Minimal set of compatible DMMEs

In electric circuits there is one topological and three kinds of basic passive elements.
Adding an active switching element one can create a great class of circuits.
0) fork node; 1) capacitors; 2) inductors; 3) resistors

Those passive elements have a direct correspondences in rotative or reciprocating mechanics namely:
0) planetary or differential gearbox [*]; 1) springs; 2) inertial masses; 3) friction elements
[*] and analogons for reciprocating mechanics

But there are limits to the electric-mechanic analogy. Some mechanic elements often differ significantly from their electric counterparts in their qualitative behavior. Two examples of elements quite different in behaviour are:

  • transistors & locking pins
  • transformers & gearboxes

With creating a set of standard sizes of those elements and a modular building block system to put them together creating rather complex systems can be done in a much shorter time.
Like in electronics one can first create a schematics and subsequently the board.

To do: Create a minimal set of minimal sized DMMEs for rotative nanomechanics. Modular housing structures standard bearings and standard axle redirectioning are also needed.

To investigate: how can reciprocating mechanics be implemented considereng the passivation bending issue

Diamondoid molecular structural elements

An example of a diamondoid molecular structural element (DMSE). The bright red spots are open bonds.

sets

  • standardized building block systems
  • housing structures
  • standard corner pieces connecting the various crystallographic planes
  • in edge passivation with hydrogen can be problematic
  • issue of non androgynous sinterfaces
  • brackets for sub bond length positioning [[2]]
  • standard pipe and channel segments - the passivation bending issue is of relevance

Molecular transport elements

Elements that create one dimensional structures for the logistic transport of different media are a bit of a cross between machine elements and structural elements.

data transmission

For transmission of data in Nanosystems polyyine rods where proposed. They constitute the thinnest physically possible rod manufacturable and consist out of sp hybridized carbon which must be mechanosynthesizable for their construction which goes beyond minimal necessary capabilities. Handling of sp carbon is involved in already analyzed tooltip chemistry though and thus likely to be available. Polyyne rods obviously are rather susceptible to radiation damage thus it might be wise to use chains of benzene rings which are more stable. With the first few additional ring widths the event of non self healing catastrophic damage becomes drastically more unlikely per unit of time. [Todo: calculate estimations] Still two of those ribbons like to fuse under UV irradiation (see: anthracene) Going to cyclohexan chains and bigger diamondoid rods makes the surface a lot more bumpy and the housings a lot more bulky.

energy transmission

For power transmission strained shell near cylindrical diamondoid axles are a good possibility reciprocative movement may be better for high power densities.

heat transport

For thermal drain water works well because of its very high heat capacity. To drastically reduce friction one should pass it around enclosed in diamond pellets to get it in either one needs to use very high pressure (sealing might be difficult; thermal conductance may suffer) or the insides are made hydrophobic by adding -OH insted of -H surface terminations. In the latter case mechanosynthetic oxygen placement capabilities are needed which go beyond minimal necessary capabilities. Pipes are easily creatable but work better at the macroscale. It may be possible to use the phase trasition ice water to keep the the factory at constant tempertaure but note that superclean water (that occurs as waste see below) does not necessarily freeze when supercooled and the melting point might be significantly altered in small possibly hydrophobic encapsulation.

raw material supply

For supply of solvated raw material the same method as for the cooling solvent can be used.

waste removal

A waste that always occurs at a low rate comes from oxidation of excess hydrogen - atomically clean water. Water can be drained via pipes or enclosed in pellets [more investigation of existing literature needed]

Beside that depending on how much self repair capability is included waste can be constituted out of shunned microcomponents because they are irreparable or likely to be broken or dirt contaminated. (see: "microcomponent tagging") or out of dysfunctional DMEs caused by assembly errors. ...

General properties of DMEs

To get a better picture how DMEs behave mechanically and in general how everything else behaves at this size range one can look at the scaling laws which describe how physical quantities scale with size.

DMEs with carbon, silicon carbide or silicon as core material can be can have internal structure like

Due to the lack of defects the ultimate tensile strength of larger DMEs lies above diamond of thermodynamic origin.

Strained shell structures

To form cylindrical or helical structures with high to maximal rotational symmetries for their size (good axles for superlubrication) one usually constructs wedge shaped segments and put them together until they naturally turn around 360 degree. Bending can be induced from internal structure or surface passivation (since passivation atoms haven't got the exact same bond length like the internal atoms, see: passivation bending issue). If 360° are exactly met the structures bending results from internal unstrained structure the whole structure is unstrained - a goal to aim for. If not bending to a strained shell is required. For thin tubes of high diameter a completely unstrained lattice of the used diamondoid material can be bent around. A note on bending tools can be found on the "mechanosynthesis" page.

Spheres are rather rather hard to approximate. [to investigate: feasability of ball joints]

VdW sticking

[Todo: add calculation of how much surface is needed to securely overcome the characteristic thermal energy (100kT?) -- to locking mechanisms?? -- techlevel I related too ...]
[Todo: link to force estimation]

Acceleration tolerance

[Todo: add calculation of a block on a neck model - for "intuitive" understanding]

External links