MOTOR-FREE METHOD TO 3D MONOLAYER COATINGS

Abstract

A method is disclosed of three-dimensional (3D) free-form printing for coating free-form objects, the method including: arranging a free-form object in a Langmuir-Blodgett (LB) trough filed with a liquid, the LB trough designed based on a shape of the free-form object; arranging an LB film comprising a plurality of colloidal nanospheres on a surface of the liquid within the LB trough; and draining the liquid from the LB trough to form a self-assemble film of the colloidal nanoparticles on a surface of the free-form object.

Claims

1. A method of three-dimensional (3D) free-form printing for coating free-form objects, the method comprising: arranging a free-form object in a Langmuir-Blodgett (LB) trough filed with a liquid, the LB trough designed based on a shape of the free-form object; arranging an LB film comprising a plurality of colloidal nanospheres on a surface of the liquid within the LB trough; and draining the liquid from the LB trough to form a self-assemble film of the colloidal nanoparticles on a surface of the free-form object.

2. The method according to claim 1, further comprising: draining the LB trough through a bottom drip.

3. The method according to claim 2, wherein the LB trough is a drainage basin having a radius R(z)=r(z)+R(z), and wherein r(z) is a radius of the free-form object to be coated and R(z) is a radial distance between the free-form object to be coated and the drainage basin.

4. The method according to claim 3, wherein the drainage basin is designed so that a change in a surface area of the LB film is a change in a surface area of the self-assembled film, and wherein if r(z) is the radius of the object as a function of z, and wherein the surface area of the coating at z for thickness dz is a change in an area of the LB film in the drainage basin as follows: $\frac{\mathrm{dSA}\left(z\right)}{\mathrm{dz}}=2?r\left(z\right).$

5. The method according to claim 4, wherein, if R(z) is the inner radius of the drainage basin as a function of z, then the area of the film layer at a location z is: $A\left(z\right)={?\left[r\left(z\right)+R\left(z\right)\right]}^2-{?\left[r\left(z\right)\right]}^2;$ the change in the surface area of the object is the derivative of: $\frac{d\left[A\left(z\right)\right]}{\mathrm{dz}}=2?\left[r\left(z\right)+R\left(z\right)\right]\left[\frac{\mathrm{dr}}{\mathrm{dz}}+\frac{\mathrm{dR}}{\mathrm{dz}}\right]-2?r\left(z\right)\frac{\mathrm{dr}}{\mathrm{dz}};$ wherein the change in object surface area would be equal to the negative change in drainage area, wherein R=r+R, and $-r\left(z\right)\left(1-\frac{\mathrm{dr}}{\mathrm{dz}}\right)=R^{}\left(z\right)\frac{{\mathrm{dR}}^{}}{\mathrm{dz}};$ and if one integrates both sides $-?r\left(z\right)\mathrm{dz}+\frac{{r\left(z\right)}^2}{2}=\frac{{R^{}\left(z\right)}^2}{2}+C;$ then one will have the condition that R.sub.0=R(z=0), which yields the following: $R^{}\left(z\right)=\sqrt{R_0^2-2{?}_0^{z}r\left(z^{}\right){\mathrm{dz}}^{}+{r\left(z\right)}^2}$ and if the colloid solution is minimized in a no-waste scenario, and wherein for the free-form object of length z.sub.0, R(z.sub.0)=0, and $R_0=\sqrt{2{?}_0^{z_0}r\left(z\right)\mathrm{dz}}.$

6. The method according to claim 1, wherein the particles are colloidal nanospheres, and the method further comprises: coating the free-form object with a monolayer of colloidal nanospheres.

7. The method according to claim 6, wherein the colloidal nanospheres comprises a plurality of photonic crystal particles.

8. The method according to claim 7, wherein the monolayer of colloidal nanospheres are carboxylic acid group (COOH) modified polystyrene nanospheres.

9. The method according to claim 8, wherein the carboxylic acid group modified polystyrene nanospheres have sizes from 250 nm to 2 ?m.

10. The method according to claim 8, further comprising: placing the carboxylic acid group modified polystyrene nanospheres at an interface of air and the liquid with a syringe.

11. The method according to claim 10, further comprising: performing the placing of the carboxylic acid group modified polystyrene nanospheres at a rate of 0.1 ml/min to 0.3 ml/min.

12. The method according to claim 1, wherein the liquid is a mixture of water/ethanol in a 1:1 volume ratio.

13. The method according to claim 1, wherein the particles are hydrophilic nanoparticles, and the liquid includes butanol.

14. The method according to claim 13, wherein the hydrophilic nanoparticles are selected from one or more of silica nanoparticles, gold nanoparticles, and silver nanoparticles.

15. The method according to claim 8, further comprising: coating the PS nanospheres on one or more of glass, silicon wafer, indium tin oxide coated substrate, quartz, polyethylene terephthalate (PET) and polydimethylsiloxane (PDMS).

16. A Langmuir-Blodgett (LB) trough, the LB trough comprising: a drainage basin having a radius R(z)=r(z)+R(z), and wherein r(z) is a radius of a free-form object to be coated and R(z) is a radial distance between the free-form object to be coated and the drainage basin.

17. The LB trough according to claim 16, wherein the drainage basin includes a bottom drip.

18. The LB trough according to claim 16, wherein the drainage basin is designed so that a change in a surface area of the LB film is a change in a surface area of the self-assembled film, and wherein if r(z) is the radius of the object as a function of z, and wherein the surface area of the coating at z for thickness dz is a change in an area of the LB film in the drainage basin as follows: $\frac{\mathrm{dSA}\left(z\right)}{\mathrm{dz}}=2?r\left(z\right).$

Description

BRIEF DESCRIPTION OF THE DRAWINGS

[0018] FIG. 1A is an illustration of parameters for drainage basin design. The radius of the drainage basin can be easily calculated based on the average object radius r(z). The basin shown has an initial basin radius R.sub.0 that minimizes the amount of unused surface material that is lost in the procedure.

[0019] FIG. 1B is an illustration of the process where the object is coated as the liquid drains, and wherein the film is compressed by the basin shape.

[0020] FIGS. 2A-2C are illustrations of a process of customizing the drainage basin for random shapes, wherein FIG. 2A is a basin geometry is calculated so that the distance of the object's edge to the wall of the bowl is always decreasing as the water drains and the polystyrene (PS) is deposited onto the object; FIG. 2B is a basin generated in SolidWorks for 3D printing (here it is shown with a quarter of the basin cut out); and FIG. 2C is a basin position with respect to the object is fixed as the water with monolayer is drained, and wherein the an open base, the basin is placed above a funnel with flow-control valve.

[0021] FIGS. 3A-3D are illustrations of analytic functions for drainage basin radius R(z) of the given r(z) for axicon (FIG. 3A), upwards flaring parabola (FIG. 3B), sphere (FIG. 3C), and parabolic cone (FIG. 3D). Above and below are images of equation-rendered 3D models for the object and basin (with a quarter cut-out to illustrate the shape or R(z)). In these drawings, R.sub.0 is constant and chosen so that the basin bottom is not closed. As a result, some colloidal solution will not be used in the coating process. This basin design would be modular and rest on a separate funnel and flow-control valve system as shown in FIG. 2C.

[0022] FIG. 4 is a schematic of a LB bench top method and mechanism with (1) inner and outer bowl stacking, (2) wire hold, (3) wide mouth basin for water collection, (4) clamp to hold coating object where the object is denoted with a dotted line, and (5) a syringe pump in accordance with an exemplary embodiment.

[0023] FIGS. 5A-5D are PS coatings on different glass objects, and wherein FIG. 5A is a jar (4.2-cm diameter, 2.0-cm height) illuminated from LED light from above and inside of the jar; FIG. 5B is a bulb (3.0-cm diameter, 2.2-cm height) illuminated with background fluorescent lights; and FIGS. 5C and 5D are compressor tubes (5.82-mm diameter, 19.47-cm swirl diameter, 35.17-mm height, 2.5-mm gap between tubes), illuminated by the flash of the camera.

[0024] FIG. 6 is a microscope image of the 2-?m diameter PS film that coats an outer edge of the compressor tube (box, left), and a high degree of order and monolayer packing of the film is shown. Scale bar: 10 ?m.

DETAILED DESCRIPTION

[0025] Set forth below with reference to the accompanying drawings is a detailed description of embodiments of methods of 3D free-form printing strategies for coating arbitrary free-form objects. Note that since embodiments described below are preferred specific examples of the present disclosure, although various technically preferable limitations are given, the scope of the present disclosure is not limited to the embodiments unless otherwise specified in the following descriptions.

[0026] Langmuir-Blodgett (LB) troughs provide an excellent system to deposit monolayer films onto flat and curved substrates. However, most trough designs use motorized barriers to compact the film, and it is difficult to fully eliminate the capillary waves and striations on deposited films caused by motorized barriers. Here, an inexpensive design is presented for a benchtop LB trough that compresses the film without motorized barriers; instead, it is the trough's geometry that compresses the film in a drainage basin. In accordance with an embodiment, this method is demonstrated with a 3D printed drainage basin and with self-assembled polystyrene (PS) colloidal films on a range of 3D glass substrates that include, for example, a jar, a bulb, and a compressor tube. A mathematical formalism is provided to coat 3D objects with arbitrary size and shape, for example, especially with facile 3D printing, and wherein the concept may be extended in a relatively inexpensive and modular approach.

Introduction

[0027] There remains significant interest in the solution-processed deposition of monolayer films, including photonic crystal structures for smart sensing. The inverse structures that are produced via the directed and templated assembly around such films also exhibit a range of intriguing light-matter interactions. Photonic crystal films composed of colloids are often produced via the transfer of self-assembled films at the gas-liquid interface, well-known as Langmuir-Blodgett (LB) films. LB troughs provide an excellent way to deposit monolayer films onto substrates and generally involve an external barrier that continually compresses or compacts the interfacial film as the film is removed to a substrate. A variety of trough designs have been proposed in previous decades, however LB trough designs have yet to fully eliminate the capillary waves and striations on deposited films caused by the vibration of motorized stages. Irregularities in the deposited film are associated with two types of movement of the barriers: (1) the longitudinal bobbing of the barriers on the water's surface create capillary waves and/or collapse of the film, and (2) the uneven lateral motion of the barriers cause striations of the film as it collects on the substrate.

[0028] Significant research on LB troughs have often focused on scaling production, for example, using a moving barrier design to increase the total surface area of the film deposition in roll-to-roll methods and incorporating convective assembly, whereby the compaction of the colloidal film occurs via solvent-driven densification, i.e., a combination of contact-line pinning and evaporation of a volatile solvent. The convective assembly of these layers have been studied along with the effect of temperature control and gravity (i.e., angle of the surface), and a robotic arm with feedback may even be employed to produce precise structures. The deposition of LB films directly onto 2D and 3D (as in curved or wavy) substrates with a commercial LB trough with a sliding barrier are known. Commercial systems can provide smooth, precisely controlled, and vibration-free film deposition and motor-vibration dampening for 2D and 3D substrates, however these commercial systems are generally expensive.

[0029] Here, a poor-man's LB trough design is disclosed and demonstrated that deposits close-packed colloidal films directly onto a range of complex-shaped 3D substrates. A solvent-driven densification is employed without the need for a continuous deposition of colloidal nanospheres in a promising vertical drainage geometry. Moreover, the method continually condenses the film mechanically without the need for motorized barriers. Instead, the films are compacted by the geometry of a 3D-printed drainage basin. A mathematical formalism is provided to coat 3D objects with arbitrary size and shape to show that this approach may be extended in a relatively inexpensive and modular approach. As proof-of-concept, LB films composed of 2-?m diameter polystyrene beads drained through a hemispherical trough with continuous draining were demonstrated. In accordance with an embodiment, the films are made without a vibration-stabilized bench and deposit close-packed films, for example, on a cylindrical jar, spherical bulb, and spiral compressor tubes. The results indicate curvature-based opportunities to study the role of defects and voids in self-assembled LB films: while the crystallinity of the colloidal layers is reduced on curved substrates, desirable close-packed monolayer structures can be achieved. In accordance with an embodiment, the method will enable a variety of educational opportunities and practical applications.

[0030] In accordance with an exemplary embodiment, a method is disclosed that generates monolayer polycrystalline nanoparticle assembly on 3D objects with relatively flat and highly curved surfaces. The curvature of the object is in the range of add value of curvatures.

[0031] In accordance with an embodiment, the method can be used for carboxylic acid groups (COOH) modified polystyrene (PS) nanospheres with sizes from 250 nm to 2 ?m. The nanospheres, can be, for example, nanospheres purchased from Bangs Laboratories, Inc. The original nanosphere dispersion contains small amount of Tween 20 or sodium dodecyl sulfate as surfactants. The nanospheres are washed to remove these chemicals (i.e., the small amount of Tween 20 and sodium dodecyl). Carboxylic acid surface modification prevents particles from aggregation and is necessary for ordered assembly. DLVO theory shows that the electrostatic repulsion between charged spheres prevents the particles from aggregation:

[00001]${?}_{\mathrm{total}}={?}_{\mathrm{attractive}}+{?}_{\mathrm{repulsive}}=-\mathrm{Ar}/\left(12?d\right)+2{\mathrm{??}}_0{?}_{r}r{?}^2\exp \left(-?d\right)$

where A, d, r, ?.sub.0, ?.sub.r, ?, and ?.sup.?1 are denoted as the Hamaker constant, the particle separation, radius of the particles, the permittivity of the vacuum, relative permittivity, the zeta potential, and the Debye length, respectively. The PS nanospheres can be dispersed in a mixture, for example, of water/ethanol=1:1 volume ratio. The concentration of solid can be, for example, 5 wt %.

[0032] The PS nanoparticles can be injected via a syringe. The needle of the syringe is positioned close to the air-water interface, forming a meniscus that helps particles move along it and helps prevent the particles from sinking. A syringe pump can be used to control the injection rate of the PS nanoparticles into the drainage basin of the LB trough. The injection rate can be, for example, 0.1 ml/min to 0.3 ml/min. A high injection rate, for example, greater than 0.3 ml/min can result in amorphous assembly. The method can be carried out at room temperature.

[0033] The method, for example, can be applicable for hydrophilic nanoparticles by replacing the solvent with butanol. Butanol is less soluble in water compared with ethanol, which prevents the particles from sinking to the water phase. Examples of hydrophilic nanoparticles include silica nanoparticles, gold, and silver nanoparticles.

[0034] In accordance with an embodiment, the method can be used to coat PS nanospheres on different materials including glass, silicon wafer, indium tin oxide coated substrate, quartz, polyethylene terephthalate (PET) and polydimethylsiloxane (PDMS).

Mathematical Design of the Drainage Basin

[0035] In accordance with an embodiment, a method is disclosed where the geometry of the drainage basin is designed to compress the LB film. The basin geometry is drawn as radially symmetric for ease of illustration in this work. In FIGS. 1A and 1B, the analytic geometry of the drainage basin are shown with radius R(z)=r(z)+R(z), where r(z) is the radius of the object to be coated and R(z) is the radial distance between the object and the basin.

[0036] In accordance with an embodiment, the basin is designed so that the change in the surface area of the film is the change in the surface coating. That is, if r(z) is the radius of the object as a function of z, then the surface area of the coating at z for thickness dz is also the change in the film area in the cup:

[00002]$\begin{array}{cc}\frac{\mathrm{dSA}\left(z\right)}{\mathrm{dz}}=2?r\left(z\right)& \left(1\right)\end{array}$

[0037] If R(z) is the inner radius of the drainage basin as a function of z, then the area of the film layer at a location z is:

[00003]$\begin{array}{cc}A\left(z\right)={?\left[r\left(z\right)+R\left(z\right)\right]}^2-{?\left[r\left(z\right)\right]}^2& \left(2\right)\end{array}$

[0038] And the change in the surface area of the object is the derivative of that written above:

[00004]$\begin{array}{cc}\frac{d\left[A\left(z\right)\right]}{\mathrm{dz}}=2?\left[r\left(z\right)+R\left(z\right)\right]\left[\frac{\mathrm{dr}}{\mathrm{dz}}+\frac{\mathrm{dR}}{\mathrm{dz}}\right]-2?r\left(z\right)\frac{\mathrm{dr}}{\mathrm{dz}}& \left(3\right)\end{array}$

[0039] Thus, the change in object surface area would be equal to the negative change in cup area. Let R=r+R. Then,

[00005]$\begin{array}{cc}-r\left(z\right)\left(1-\frac{\mathrm{dr}}{\mathrm{dz}}\right)=R^{}\left(z\right)\frac{{\mathrm{dR}}^{}}{\mathrm{dz}}& \left(4\right)\end{array}$

[0040] If one integrates both sides

[00006]$\begin{array}{cc}-?r\left(z\right)\mathrm{dz}+\frac{{r\left(z\right)}^2}{2}=\frac{{R^{}\left(z\right)}^2}{2}+C& \left(5\right)\end{array}$

[0041] Then one will have the condition that R.sub.0=R(z=0). This yields the nice result:

[00007]$\begin{array}{cc}{R}^{}\left(z\right)=\sqrt{R_0^2-2{?}_0^{z}r\left(z^{}\right){\mathrm{dz}}^{}+{r\left(z\right)}^2}& \left(6\right)\end{array}$

[0042] If the colloid solution is minimized in the no-waste scenario, then for an object of length z.sub.0, R(z.sub.0)=0, and

[00008]$\begin{array}{cc}{R}_0=\sqrt{2{?}_0^{z_0}r\left(z\right)\mathrm{dz}}& \left(7\right)\end{array}$

[0043] This choice of R.sub.0 such that R(z.sub.0)=0 (Eq. 7) is illustrated in FIGS. 1A and 1B but is not necessary. Alternatively, a basin geometric curve for a sphere with larger, fixed R.sub.0 is possible. In this case, there remains additional material in the apparatus after the 3D object is coated. In FIGS. 2A-2C, a 3-D printed basin is shown that is open at its bottom and resting on a separate funnel and flow-control valve system. A few objects and curves for R(z) and r(z) as well as the equation-rendered 3D drawings are shown in FIGS. 3A-3D.

Demonstration of the Concept

[0044] Two (2) 5-cm radius hemisphere bowls are printed with 1.75-mm radius PLA filament on a Creality 3D printer. The bowls represent the geometry in FIG. 3C. One bowl has a 1-mm diameter hole centered at the bottom. The bowl with the hole can be stacked inside an intact bowl as shown in FIG. 4. The stack is subsequently placed on a wire stand so that the stack and wire stand can be suspended above a wide mouth basin. The object to be coated can be cleaned with a sonicator in water and ethanol. A clamp holds the object from above, suspending it slightly above the bottom of the inner bowl to ensure the bottom of the object would be coated, and the draining of the bowl would not be blocked.

[0045] The inner bowl was filled with water, submerging the object. The outer bowl held the water dripping from the inner bowl long enough for the PS layer (5 wt %2-?m PS in 1:1 ethanol, water) to be deposited on the water's surface via a syringe pump. As the water dripped out of the hole in the inner bowl, the water weight on the outer bowl increased until it was large enough to push through the walls of the plastic and drip into the basin. This allowed for slow and consistent draining the inner bowl. Inside the inner bowl, the PS layer attached to the hydrophilic glass, following the water meniscus, while repelling against the hydrophobic walls of the bowl. As the water level slowly decreases, and more PS deposits onto the object, the circumference of the wall decreases, compressing the remaining PS. Using the meniscus of water, the PS is able to coat the variable surfaces of the objects, with excellent coverage of the underside. In accordance with an embodiment, a glass jar, bulb, and compressor tube were coated as shown in FIGS. 5A-6.

[0046] In accordance with an exemplary embodiment, an inexpensive approach to free-form object coating with LB films that can be implemented with a drainage basin instead of motorized compression barriers. The drainage basin can be 3D printed with equation-based computer-aided design.

[0047] The detailed description above describes embodiments of methods of 3D free-form printing strategies for coating arbitrary free-form objects. The invention is not limited, however, to the precise embodiments and variations described. Various changes, modifications and equivalents may occur to one skilled in the art without departing from the spirit and scope of the invention as defined in the accompanying claims. It is expressly intended that all such changes, modifications and equivalents which fall within the scope of the claims are embraced by the claims.