Patent Grant
8347561
None
1. Field of Invention
The field is structural members for use in building construction, and in particular geodesic domes and strut attachment hubs for use in such domes.
2. Prior Art
The term “geodesic” means the shortest line between two points on any geometrically defined surface, and a geodesic structure is one made of structural elements that are held in place by a collection of hubs. I.e., the ends of such structural elements are attached by strut attachment hubs; the entire arrangement usually forms a geodesic dome.
In U.S. Pat. No. 3,844,664 (1974), Hogan shows a disc-like hub for an icosahedron (20-sided) structure. The attachment points for Hogan's struts are all equidistant from the center of the hub.
In U.S. Pat. No. 4,534,672 (1985), Christian shows a hub for a geodesic dome with wooden struts. The hub has six connection points, each comprising a pair of metal straps that sandwich the end of a strut. The six pair of straps are joined to each other at their inner ends. The straps each have a hole for holding a bolt that is inserted through the straps and the strut. The straps are arranged to accommodate struts of three different lengths, A, B, and C.
Reber, in U.S. Pat. No. 4,703,594 (1987), shows a hub with radially equidistant connection points; therefore struts of differing lengths are required by his design.
Ziegler, in U.S. Pat. No. 5,230,196 (1993), shows a polyhedron construction system with a hub for connecting cables and struts.
In U.S. Pat. No. 5,996,288 (1999), Aiken shows a geodesic dome with a hub for wood struts having connection points equally spaced from the center.
In U.S. Pat. No. 6,296,415 (2001), Johnson et al. show a hub for holding the struts of a structure where the ends of the struts are ball-shaped. The hub has sockets for holding the ball-ends. The distance between the ends of the balls of coaxially-aligned struts can be adjusted to accommodate different fabrics laid over the struts by rotating the hub.
In published U.S. patent application 2004/0158999, Trantow shows struts for geometric modeling with end connectors.
The prior-art hubs described above all provide structural integrity in structures constructed of struts. In the case of geodesic domes, struts of differing lengths have previously been fitted to hubs at a series of connection points, each of which is located at the same distance from the center of the hub.
3. Prior-Art—Geodesic Structures—
Geodesic domes are well known in the art. The underlying principle in the construction of such domes is the subdivision of spherical surfaces into triangles or other geometric figures. This is usually done by projecting the sides of a polyhedron (multiple-sided figure) onto the surface of a sphere circumscribed about the apexes of the polyhedron. The polyhedron usually is usually one of the five Platonic solids, namely a convex, regular polyhedron with four, six, eight, twelve, or twenty sides, i.e., a tetrahedron, a cube, an octahedron, a dodecahedron, or an icosahedron. This can be achieved by several methods with varying results. In general, the strongest structures are made using a polyhedron with equilateral triangular sides. Thus the cube and dodecahedron, which don't have equilateral triangular sides, are less important in structural design than the three remaining Platonic solids.
As stated, all of the apexes of the polyhedron lie on the surface of a circumscribed sphere. When the edges of the tetrahedron, octahedron, or icosahedron are projected onto the surface of the sphere they define great circle arcs. Careful examination reveals that any further subdivisions and projection of these solids (which, as stated, have equilateral triangular sides) onto a sphere creates isosceles triangles (two equal-length sides) and not the desired equilateral triangles (three equal-length sides). This can more readily be understood by examining a group of equilateral triangles, each sharing an edge with the next and clustered about a single point. Three equilateral triangles clustered thusly form a tetrahedron. Four clustered thusly form one half of an octahedron. Five form one portion of an icosahedron, but when six are arrayed in this manner they are planar, and when projected onto the surface of a sphere it becomes clear that some of the edges must elongate before they can conform to the spherical curvature. I.e., the projected edges of the solid with equilateral triangular sides have differing lengths on the sphere.
However it is desirable for the lengths of the projected geodesic edges to be as equal as possible. There are two reasons for this. First is the matter of structural efficiency: if the same cross section is used for all elements, that cross section must be sufficient for the strength of the longest of those elements and therefore more substantial than required for the shorter elements. This leads to an over building of some components and a consequent inefficiency of material utilization.
The second reason for uniformity of edge lengths is important is for simplification of construction. This is especially true in portable structures that must be assembled and disassembled frequently. It becomes even more important when those who are to assemble the domes are not trained specifically in their construction. Military tents are frequently set up by untrained infantry personnel, and emergency relief tents are frequently set up by the very civilians who must use them for shelter. Thus it can be seen that it is highly desirable to reduce the complexity of this type of geodesic dome.
In U.S. Pat. No. 2,682,235 (1954), Fuller shows the construction of a geodesic dome. Struts of differing lengths are used in the assembly of the dome.
In his structure, Fuller refers to the lines forming the triangles as struts. He approximates sphere 200 (
In Fuller's structure, each of triangles 105 is subdivided further, or tessellated, into smaller triangles 300 (
A two-frequency structure designed using the Triacon Method requires fewer struts than its Alternate Method equivalent. Using either method, two different strut lengths are required to form a small structure such as a tent for use in camping. In the Triacon Method, the difference in strut lengths is about 13 percent. This increases the cost of the structure since several sets of struts, each having different lengths, must be provided. In addition, the assembly of a structure with different-length struts is relatively complex, especially when untrained workers perform the assembly.
Thus prior-art geodesic structures require struts of at least two and possibly more than 56 different lengths. This is undesirable because, as stated, it creates increased cost, structural inefficiency, and complexity of construction.
In accordance with an aspect of one embodiment, a geodesic dome comprises struts and interconnecting hubs, where the hubs include strut end connection points at more than one radial distance from the center of the hubs. The difference in such radial distances compensates for the prior-art difference in lengths required for struts at various points in the structure. Thus a geodesic dome can be constructed from struts that are all of the same length. The resulting structure is easier to build and lower in cost than the prior-art versions.
Structure 500 comprises 39 identical struts 505, two different types of hubs 510 and 515, two hangers 525, a number of ground attachment points 540, four portal fasteners 530, each comprising a triangular frame 531 and a short length of strut material 532, and an optional floor 535. Struts 505 are joined at the vertices of structure 500 by hubs 510 and 515. An open entrance or portal 520 is formed using two additional struts 505 anchored at the top and bottom of entrance 520 by a hanger 525 and fasteners 530, respectively. Hanger 525 is suspended from one of hubs 510 by a piece of sturdy material (not shown) such as wire, plastic, or even twine. Alternatively, hanger 525 can be secured to hub 510 by a bolt or screw (not shown).
Structure 500 has four each of hubs 510 and 515 and two each of hangers 525. A larger structure can include more hubs with same-length struts, longer struts and fewer hubs, or a combination.
Floor 535 completes structure 500. All of the lower struts 505 are fastened to floor 505 at attachment points 540 using stakes, screws, clips, or pins. Struts 505 are initially straight and made of a flexible material. When they are in use, they are springably bent into a curved shape. When structure 500 is assembled, struts 505 hold floor 535 in tension by virtue of being restrained at its edges. Floor 535 is therefore flat and structure 500 is self-supporting.
In the prior-art version of structure 500 (
In hub 515 (
Hub 515 holds six struts, while hub 510 holds 5 struts. This is a consequence of the both the triangular and the Triacon divisions of icosahedron 100 (
The skeleton of tent or structure 500 (
Hubs 510, 515, and 525 can be sewn into cover 1101, if desired. Otherwise, the hubs can be provided separately.
The above discussion describes hubs that compensate for designs that anticipate two different strut lengths. In a prior-art structure with a higher-frequency Geodesic subdivision, the number of different anticipated strut lengths will usually be greater than two. In practice, hubs can be made to compensate for any number of anticipated strut lengths.
In some Geodesic designs that anticipate more than one strut length, many different hubs may be required. Alternatively, the use of struts of more than one length can be traded against the use of hubs of more than one design. In other designs, not all slots in a hub are occupied with a strut, but can be vacant instead.
To assemble the dome of
If tent 500 has a cover that incorporates hubs 510 and 515, the placement of the hubs is predetermined by the tent manufacturer and insertion and fastening of struts 505 is a straightforward matter. Otherwise hubs 510 and 515 can be secured to cover 1101 (
Instead of being attached to bottom 535, attachment points 540 can take the form of stakes driven in the ground at predetermined locations. In this case, floor 535 is not required.
Thus by providing hubs that each have connection points with different radial spacings, the hubs will enable all equal-length struts (or struts with fewer different lengths) to be used to connect the hubs, despite a plurality of different hub-to-hub distances. I.e., by employing hubs with connection points with different radial spacings a geodesic dome can be constructed with all struts of equal length (or with fewer lengths), even though the dome has a plurality of different distances between adjacent hubs that would otherwise require virtual or anticipated struts of two or more different lengths.
Each section 1400 includes two connection points consisting of slots 800 with optional fingers 810 for locking struts (not shown) in place, as described above in connection with
An optional guide or template 1525 has radial arms 1530 that slidably fit into channels 1510 of hub 1500. Arms 1530 further include a hole 1535 for guidance in placement of the ends of struts 505 and selection of the proper connection point for a strut 505. Template 1525 can be secured to arms 1530 by an adhesive, if desired.
In use, template 1525 is slidably inserted into channels 1510 in hub 1500. One of holes 1535 in template 1525 is aligned with one of holes 1515 in hub 1500. The distance of each hole in template 1525 from the center of hub 1500 is determined by the design of the geodesic structure (not shown) being built.
During assembly of the structure, a hole 600 in each strut 505 is aligned with hole 1535 in template 1525 and one of holes 1515 in arm 1505 of hub 1500. A screw 1532 is inserted into hole 600 of strut 505, passed through hole 1535 of template 1525 and the mating hole 1515 in arm 1505, then secured by a nut 1535. Thus holes at various predetermined locations in template 1525 determine the compensating length of each strut position, thereby permitting various geodesic structures to be made from struts all of one length.
Hub 1500 can have two or more arms 1505 positioned at any desired, predetermined angle. Hub 1500 can be made of plastic, a composite material, metal, or wood. Struts 505 have approximately the same width as those described above. Hub 1500 and template 1525 scale accordingly. Screws 1532 and nuts 1535 are typically U.S. National fine thread standard size 8-32, although another size can be used. In lieu of a screw, a rivet, pin, or other fastener can be used. Template 1525 is made of plastic, metal, wood, or a composite material and is approximately 0.8 mm thick, although other thicknesses can be used.
In an alternative aspect, some geodesic designs efficiently use two or more strut lengths. With its numerous hole positions, hub 1500 can accommodate struts of more than one length, if desired.
The embodiments shown greatly simplify erection of a domed structure. All struts used in the structure are identical. Thus the structure is easier to construct and less expensive than previous designs. Some structure designs require only two hub designs. Others that anticipate using struts of many lengths will require hubs of more than two designs. Each of the hubs includes extensions that replace the additional length of strut anticipated in the structure. In one aspect, a universal hub accommodates a wide variety of anticipated or virtual strut lengths.
While the above description contains many specificities, these should not be considered limiting but merely exemplary. Many variations and ramifications are possible.
Instead of a tent, a larger structure such as a shelter or a smaller structure such as a pet house can be built. Instead of a plastic or fabric cover, a metal cover can be secured to the skeleton. Instead of doorways, the structure can be entered through the floor. Instead of springable fingers that allow removal of struts and disassembly of the structure, glue can be used to permanently cement the struts in the hubs. Instead of rectangular in cross-section, the struts and the slots into which they are installed can be square, oval, hexagonal, diamond-shaped, star-shaped, or round. Instead of equal angles between the slots in the hubs, one or more slots can be oriented at a different angle in the same plane. Instead of all slots lying in the same plane, one or more slots can be oriented at an angle to the plane of the hub. Instead of all slots being filled with struts, one or more slots can be vacant.
While the present system employs elements which are well known to those skilled in the art of structural dome design, it combines these elements in a novel way which produces one or more new results not heretofore discovered. Accordingly the scope of this invention should be determined, not by the embodiments illustrated, but by the appended claims and their legal equivalents.
| Number | Name | Date | Kind |
|---|---|---|---|
| 2682235 | Fuller | Jun 1954 | A |
| 3145441 | Strandrud | Aug 1964 | A |
| 3844664 | Hogan | Oct 1974 | A |
| 3990195 | Gunther | Nov 1976 | A |
| 4097043 | Rudy | Jun 1978 | A |
| 4187613 | Ivers et al. | Feb 1980 | A |
| 4194851 | Littlefield | Mar 1980 | A |
| 4498800 | Sielaff | Feb 1985 | A |
| 4511278 | Robinson | Apr 1985 | A |
| 4703594 | Reber | Nov 1987 | A |
| 4844649 | Vandenboom | Jul 1989 | A |
| 5230196 | Zeigler | Jul 1993 | A |
| 5437515 | Kuramoto et al. | Aug 1995 | A |
| 5797695 | Prusmack | Aug 1998 | A |
| 5996288 | Aiken | Dec 1999 | A |
| 6296415 | Johnson et al. | Oct 2001 | B1 |
| 20040158999 | Trantow | Aug 2004 | A1 |
| Number | Date | Country | |
|---|---|---|---|
| 20080307720 A1 | Dec 2008 | US |
