Patent Grant
7641381
The present invention relates to a mechanical oscillator system comprising a balance and balance spring for use in horological mechanisms (e.g. timekeeping devices) or other precision instruments. It is thought that it will be particularly applicable to the oscillator system in a mechanical watch, although the present invention is not limited to this.
Previous mechanisms use metal alloys, in particular Fe—Ni or Ni, Cu—Be, Au—Cu alloys, for the balance spring and balance. At its most general, in one of its aspects, the present invention proposes that the balance is made of a non-magnetic ceramic material and the balance spring is non-magnetic and is made of a composite material, or a polymer (including thermoset and thermoplastic polymers, esters and phenolic based resins), carbon or (non-magnetic) ceramic material.
In contrast to metals, the above materials are non-susceptible to the effects of magnetism—including electromagnetic damping and magnetically induced change of the Young's modulus. These materials have some intrinsic thermal characteristics which are better than metals and so a mechanical oscillator system having reduced variation of oscillator frequency with temperature can be made. Variation with temperature is discussed below in more detail. A balance spring of the above materials may be less susceptible to internal mechanical (e.g. friction) damping of the Young's Modulus, allowing amplitude to be maintained by the balance and a higher frequency of oscillation and therefore a more accurate horological mechanism or precision instrument than a metal spring.
The balance spring is arranged to oscillate the balance.
Preferably the balance is a balance wheel; the balance spring may be arranged inside the circumference of the balance wheel so as to oscillate the balance wheel back and forth about its axis of rotation as is conventional.
The balance may be coupled to an escapement mechanism for regulating rotation of an escape wheel (which is e.g. coupled to the hands of a watch), as is also conventionally known.
Preferably the balance spring works in flexion to oscillate the balance, most preferably exclusively in flexion. That is the balance spring is preferably not relying on strain or shear properties for the repeated store and release of energy during its (relatively rapid) oscillations. Preferably the balance spring coils are not in contact with each other, i.e. there is a gap between adjacent coils. This eliminates or reduces friction and allows the successive coils to act unhindered by one another.
While the main body of the balance is made of a ceramic material, it may have small appendages of other materials.
Considerations relating to the oscillator frequency and in particular its variation with temperature will now be discussed.
The accuracy of a mechanical watch is dependent upon the specific frequency of the oscillator composed of the balance wheel and balance spring. When the temperature varies, the thermal expansion of the balance wheel and balance spring, as well as the variation of the Young's Modulus of the balance spring, change the specific frequency of the oscillating system, disturbing the accuracy of the watch. The inventor has noticed that in known systems approximately three quarters of the variation is due to thermal or magnetically induced changes in the balance spring. Methods for compensating these variations are based on the consideration that the specific frequency depends exclusively upon the relationship between the torque of the balance spring acting upon the balance and the moment of inertia of the latter as is indicated in the following relationship
T=2π√{square root over (I/G)} [1]
T: the period of oscillation, I: the moment of inertia of the balance wheel, G: the torque of the balance spring.
The moment of inertia of the balance wheel is a function of its masse M and its radius of gyration r.
The torque of the balance spring is a function of its dimensions: length l, height h, thickness e, and of its Young's Modulus E. The length l of the balance spring (which may be helical or spiral form) is the whole length of the spring, end to end, as distinct from e.g. a top to bottom measurement that varies according to the spacing of the coils.
The relationship [1] is therefore written:
T=2π√{square root over (12.M.r2.l/E.h.e3)} [2]
Temperature variations influence T (the period of oscillation) resulting from the effects of expansion and contraction of the system (balance spring and balance wheel) l, h and e for the balance spring, and r for the balance wheel whose mass m remains constant.
It is known how to compensate for the effects of expansion on l, h and e. However the period of oscillation is still subject to variations of r and E in keeping with the relationship expressed by:
r/√{square root over (E)} [3]
These two terms are not in a linear relationship.
It is necessary that this relationship should remain as constant as possible (so as to keep the period T of oscillations constant).
Fe—Ni metal spring alloys render an approximate solution when the alloy is perfectly de-magnetised. However, when the alloy is not perfectly demagnetised, the relationship is no longer constant: √E changes.
The currently employed metal alloys for balance springs show an increase in E (which is considered abnormal) and also in l, for an increase in temperature, over the ambient temperature range up to 40° C. The balance wheels currently employed in precision watches are of an Au—Cu alloy with a coefficient of thermal expansion α between +14 and +17×10−6/K−1 compensate for changes in the Young's modulus of the balance spring.
In summary, the currently used metal alloys despite compensation, only allow for the stability of T (period of oscillation) over a narrow temperature range and only when the balance spring alloy remains un-magnetised. (Any watch currently employing a Fe—Ni balance spring may be stopped by a sufficient magnet).
Preferably the balance spring material comprises continuous fibres extending along the length of the balance spring from one end of said spring to the other end of said spring.
As the fibres are continuous extending along the length of the balance spring from one end to the other, the degree to which the spring expands (or contracts) with an increase in temperature can be controlled fairly accurately by appropriate choice of the fibre material.
Preferably the continuous fibres are part of a composite material, although it is possible to have a balance spring of continuous fibres in a non-composite material (i.e. without a matrix, e.g. long ceramic fibres).
Where the material is a composite material, preferably the matrix phase comprises a polymer (of any of the types discussed above), carbon or a ceramic. In the case of a composite material with ceramic fibres, the fibres may be continuous fibres extending along the length of the spring from one end of the spring to the other as discussed above, or smaller fibres that do not extend all the way along the spring.
Where ceramic fibres are used (with or without a matrix), it is important that the ceramic is a non-magnetic ceramic. Preferably, but not necessarily, the balance spring ceramic is Alumina-Silica-Boria. Fused quartz or silica may also be used for the balance.
Preferably the thermal coefficient of expansion of the balance and the thermal coefficient of expansion of material of the balance spring, in the direction along the length of the balance spring, are of opposite signs and of similar orders of magnitude (i.e. the difference in magnitude between the two is not more than a factor of 6 and one of the α coefficients should not be greater than 1×10−6 K−1). In this way expansion of one can be compensated for by contraction of the other. For example, if said thermal coefficient of expansion of the balance spring is negative and said thermal coefficient of expansion of the balance is positive then with an increase of temperature r increases, but l decreases and in accordance with equation [2] these effects combine to assist in compensating for thermal variation in said period of oscillation T.
Preferably said coefficient of expansion are both very small. For example preferably the coefficient of thermal expansion of the balance is positive and less then 1×10−6K31 1 and the coefficient of thermal expansion of the material of the balance spring in the direction along the length of the balance spring is negative, but greater than −1×10−6/K−1.
The variation of E (Youngs Modulus) with temperature is also important and is determined by the thermoelastic coefficient which is a measure of the unit change in Young's Modulus per unit increase in temperature.
Preferably the thermoelastic coefficient of the material of the balance spring is negative; most preferably 1% in the temperature range 0 to 60 degrees Celsius.
In general, the formula for timekeeping changes (U) consequent upon a rise in temperature of 1° C. is U=α1−3α2/2−δE/2E
Thus U can be made to tend to zero when suitable values of α1 (balance coefficient of thermal expansion), α2 (balance spring coefficient of thermal expansion) and the thermo-elastic coefficient δE/E are selected by selection of appropriate materials.
The tolerances represented by small α1, α2 (e.g. less than 6×10−6 K−1) and a small thermo-elastic value δE/E allow much more readily for U to be kept low.
Preferably the continuous fibres are ceramic fibres or carbon fibres, most preferably carbon fibres having a graphitic carbon structure. Graphitic carbon structure has a negative longitudinal coefficient of thermal expansion. The fibres may for example be produced from a “PITCH” precursor or a polyacrilonitrile “PAN” precursor.
The fibres may be laid parallel to each other along their lengths, or may be twisted together. Twisting the fibres together modulates the coefficient of thermal expansion and Young's Modulus of the balance spring material and may be useful where the fibres have a high and the matrix a low Young's Modulus or coefficient of thermal expansion.
Preferably the coefficient of thermal expansion of the balance spring material in the direction along the length of the balance spring is linear up to 700° Kelvin. This allows the system to be very stable in the ambient range (0-40° C.) and also to compensate for thermal variations over a large range. Preferably said coefficient of thermal expansion is negative.
Preferably the damping of the modulus of elasticity of the balance spring is of the order of 0.001 pa.
Preferably the density of the composite material of the balance spring is less than 3g/cm3.
Preferably the balance is formed by high precision injection moulding.
Further aspects of the present invention also provide a horological mechanism or other precision instrument comprising the above described mechanical oscillator system.
An embodiment of the invention will now be described with reference to the accompanying drawings, in which:
A mechanical oscillating system for use in a horological mechanism or other precision instrument comprises a balance, in the form of a balance wheel, and a balance spring arranged to oscillate said balance around an axis of rotation.
An example of a mechanical oscillator of this general type is shown in
The balance wheel is made of a non-magnetic ceramic for which the coefficient of thermal expansion is, positive and less than +6×10−6 K−1, most preferably less than 1×10−6 K−1. Quartz is one example of a suitable material.
Preferably high purity fused quartz is used, fused quartz has a coefficient of thermal expansion of ≦+0.54×10−6 K−1. Other alternative ceramic materials include Aluminium Nitride (+5.2), Alumino-Silicate-Glass (+5), Boron Carbide (+5.6), Boron Nitride (+1.6), Silica (+0.75), Silicon hot-pressed or reaction bonded (+3.5) and Zirconia (stabilised) (+5); the numbers is brackets indicate the order of magnitude of the coefficient of thermal expansion of these materials in units ×10−6 K−1
The method of fabrication of the balance wheel may preferably be by high precision injection moulding.
The balance spring is shaped into an Archimedes flat spiral or helicoid form. It is made from a composite material comprising continuous carbon fibres which are either twisted or laid parallel to each other, the fibres being continuous lengths of fibres which extend from one end of the spring to the other along the length l of the spring. The fibres are derived according to the stiffness required from the precursor pitch (a mixture of thousands of different species of hydrocarbon and heterocyclic molecules) or polyacrilonitrile ‘PAN’ (derived from a carbon graphitic structure). The fibres are coated and set in a matrix phase of polymer (thermosetting polymer, thermoplastic polymer, ester or phenolic base resin etc), ceramic or carbon. The composite material acts in a flexural manner. The axial modulus of elasticity of the fibres is between 230 and 1000 Gpa. The composite has both a lower density less than 3 g/cm3 and coefficient of damping of its Young's modulus of the order of (0.001 pa), both less than the currently employed metal alloys. Its thermal expansion coefficient (α) in the direction along the length of the spring remains both negative and stable to 700° Kelvin, and is greater than −1×10−6 K−1.
This composite material is non-magnetic and obviates the negative effects of magnetism. The coefficient of thermal expansion α of the spring is negative and acts in parallel with the spring's Young's modulus which decreases linearly with a rise in temperature and is therefore negative (normal).
The values of the coefficients of thermal expansion (the α coefficients) for the spring and the balance are similar, very small and of opposite sign which further assist in the compensation for temperature variation.
The α coefficient of the spring remains the same over a wide temperature range, and the range of its use between 5° and 40° C. represents only 5% at the centre of the total stable temperature range.
Thus, following the relationship:
T=2π√{square root over (12.M.r2.l/E.h.e3)} [2]
the numerator does not increase in value as is the case with the metal alloys when the temperature increases because the α coefficient of the fibre composite in the axial sense l is negative, and therefore it diminishes. The denominator also diminishes when the temperature rises because the thermoelastic coefficient is negative (normal). Furthermore the height (h) and thickness (e) of the carbon fibre-matrix composite balance spring also increase with temperature which also counteracts the decrease in Young's Modulus E with rising temperature.
By this combination of materials and their mechanical properties it is possible to obtain both greater accuracy and stability. The damping effect of the modulus of elasticity is one tenth of the value of the currently employed metal alloy and the reduced energy losses due to the decreased damping and density of the material allow to envisage maintaining stable amplitude and a significant increase in frequency and significantly reduced total energy losses in the oscillator system.
As has been explained above the present invention can be applied to a conventional mechanical oscillator system in a time keeping device such as a watch. An example of a conventional mechanical oscillator system in a time keeping device is illustrated and described on pages 194 to 195 of “How Things Work”, volume 1 published 1972 by Paladin, UK, which is incorporated herein by reference.
| Number | Date | Country | Kind |
|---|---|---|---|
| 02/08802 | Jul 2002 | FR | national |
| Filing Document | Filing Date | Country | Kind | 371c Date |
|---|---|---|---|---|
| PCT/GB03/03000 | 7/10/2003 | WO | 00 | 2/6/2006 |
| Publishing Document | Publishing Date | Country | Kind |
|---|---|---|---|
| WO2004/008259 | 1/22/2004 | WO | A |
| Number | Name | Date | Kind |
|---|---|---|---|
| 209642 | Berlitz | Nov 1878 | A |
| 1974695 | Straumann | Sep 1934 | A |
| 2568326 | Dubois | Sep 1951 | A |
| 3187416 | Tuetey et al. | Jun 1965 | A |
| 3547713 | Steinemann et al. | Dec 1970 | A |
| 3624883 | Baehni | Dec 1971 | A |
| 3683616 | Steinemann et al. | Aug 1972 | A |
| 3735971 | Steinemann | May 1973 | A |
| 3773570 | Steinemann et al. | Nov 1973 | A |
| 3813872 | Nakagawa et al. | Jun 1974 | A |
| 4260143 | Kliger | Apr 1981 | A |
| 4765602 | Roeseler | Aug 1988 | A |
| 5043117 | Adachi et al. | Aug 1991 | A |
| 5678809 | Nakagawa et al. | Oct 1997 | A |
| 5881026 | Baur et al. | Mar 1999 | A |
| 5907524 | Marmy et al. | May 1999 | A |
| 6329066 | Baur et al. | Dec 2001 | B1 |
| 6357733 | Wulz et al. | Mar 2002 | B1 |
| 6705601 | Baur et al. | Mar 2004 | B2 |
| 20020070203 | Serex | Jun 2002 | A1 |
| 20020167865 | Tokoro et al. | Nov 2002 | A1 |
| Number | Date | Country |
|---|---|---|
| 19651320 | Jun 1998 | DE |
| 19651321 | Jun 1998 | DE |
| 19651322 | Jun 1998 | DE |
| 0 393 226 | Oct 1990 | EP |
| 0 732 635 | Sep 1996 | EP |
| 1 039 352 | Sep 2000 | EP |
| 1 256 854 | Nov 2002 | EP |
| 1 302 821 | Apr 2003 | EP |
| 1 351 103 | Oct 2003 | EP |
| 1 422 436 | May 2004 | EP |
| 1 445 670 | Aug 2004 | EP |
| 2 041 152 | Sep 1980 | GB |
| 1006537 | Jan 1989 | JP |
| 1110906 | Apr 1989 | JP |
| 1110907 | Apr 1989 | JP |
| 1110908 | Apr 1989 | JP |
| 1110909 | Apr 1989 | JP |
| 07138067 | May 1995 | JP |
| 09257069 | Sep 1997 | JP |
| 11147769 | Jun 1999 | JP |
| WO 9614519 | May 1996 | WO |
| WO 0101204 | Jan 2001 | WO |
| WO 2004008259 | Jan 2004 | WO |
| WO 2005017631 | Feb 2005 | WO |
| Number | Date | Country | |
|---|---|---|---|
| 20060225526 A1 | Oct 2006 | US |
