The present invention relates generally to energy generation, and more specifically to energy generation using nuclear fusion.
While there is no shortage of people desiring to produce energy through controlled fusion, the techniques can be considered to fall into two general classes, namely hot fusion and cold fusion. Hot fusion has a sound theory, and is known to work in a fashion capable of unleashing great amounts of energy in a very short amount of time. In some instances, the energy is released in an uncontrolled manner, rendering the collection of released energy problematical and expensive, possibly prohibitively so. One set of techniques for getting the hot fusion reaction to occur at a controlled pace uses electrostatic confinement. However, extracting more energy than is used to instigate the reaction is extremely difficult, if not impossible, due to the Bremsstrahlung phenomenon. Another set of techniques uses magnetic confinement, although confinement for an extended period of time has problems similar to those that beset electrostatic confinement. Another set of techniques explores impact fusion, but these attempts suffer from problems similar to those bedeviling the other hot fusion methods.
The history of cold fusion is, to say the least, checkered. A workable theory of cold fusion does not appear to have been articulated, and attempts to produce energy using cold fusion have generally not been reproducible and, when excess energy has been generated, have been characterized by rapid destruction of the device cores in which the reactions are occurring.
As understood, current state of the art attempts to produce “cold fusion” rely upon an effect best described as “gross loading.” Gross loading is the process whereby the matrix is saturated with hydrogen nuclei to the point where, per the theory presented in this application, a small amount of phonon energy initiates a nuclear reaction. Unfortunately, the first reaction creates additional phonons that cause a chain reaction that leads to the destruction of the lattice. This approach can create excess energy because the high loading density alone leads to a system with high Hamiltonian energy in the lattice. This higher energy state leads to phonon-moderated nuclear reactions if the loaded matrix is stimulated with additional energy inputs, including additional loading through electrolysis or other stimuli referenced in the Cravens and Letts paper.
[Cravens2003], and the associated research, demonstrate that state of the art researchers have still not recognized the connection between increased lattice energy and heat production. [George1997] describes using ultrasonically induced multi-bubble sonoluminescence to induce fusion events, although because of the gross loading the core is quickly destroyed. In this case the sonoluminescence is both the source of hydrogen production and phonon energy, but there is no mention of any attempt to control phonon production or harness phonons to capture the energy released. [George1999] describes a device that heats a cylinder to 400F, but no control mechanism is mentioned or described. [George1999] also describes excess 4He production from deuterium during contact with nano-particle palladium on carbon at 200° C.
Embodiments of the present invention provide a practical, controllable, source of fusion energy based on the mechanisms outlined below. This source is scalable from the Micro Electronic Mechanical System (MEMS) scale at the milliwatt/watt level to the 100-kilowatt level and possibility beyond in a single core device. In short, embodiments of the invention contemplate inducing and controlling phonon-moderated nuclear reactions.
Another aspect of the present invention provides the understanding required to design and build products based on the core technology, referred to as Quantum Fusion.
All the described implementations of this technology embodying Quantum Fusion include the following four elements.
Associated with embodiments is a heat transfer mechanism, which may be inherent in one or more of the above elements, may be a separate element, or may have attributes of both.
In broad terms, embodiments of the invention are believed to operate as follows. Reactants (e.g., hydrogen ions from water surrounding the core) are introduced into the core (e.g., palladium), and phonons are induced in a controlled manner to provide sufficient energy to convert protons into neutrons via an electron capture mechanism. The phonon-mediated mechanism is sometimes referred to in this application as quantum compression, which is a coined term (to be discussed in detail below). The neutrons, so generated, are of sufficiently low energy to result in high cross sections for neutron-hydrogen reactions.
This generates increasingly high-atomic-weight isotopes of hydrogen, resulting in 4H, which beta decays to 4He. It is noted that the data in the National Nuclear Data Center (“NNDC”) database is all derived from experiments involving multi-MeV colliders leaving the resulting 4H with enough momentum that it is energetically, the path of least resistance to simply eject a neutron. When there is little to no momentum involved, neutron ejection is not a viable decay path as there is no energy to overcome the binding energy no matter how small that energy is. In the NNDC data the neutron is carrying reaction energy away from the system in the form of momentum. The neutron absorptions and the beta decay are exothermic, and result in kinetic energy transfer to the core in the form of phonons, which is dissipated by a suitable heat exchange mechanism (e.g., the water that supplied the reactants).
Another aspect of the present invention is that controlled loading of the core material combined with controlled stimulation of phonon production prevents excess phonon energy build up, which leads to destruction of the core material. This will allow the core to operate for extended lengths of time making it an economically viable source of energy.
Another aspect of the present invention is that the core is preferably constructed to provide a consistent phonon density at the desired reaction points in the core material. This allows control over energy liberated with respect to time and the ability of the core material to dissipate energy to the heat transfer medium. In specific embodiments, the phonon density is controlled so that the fusion reaction occurs primarily near the surface of the core, thus preventing the type of catastrophic damage to the core that has characterized many prior art efforts to produce repeatable, sustainable energy generation.
In some embodiments of the present invention, the reaction may be initiated using current as the phonon initiator mechanism. In other embodiments of the present invention, acoustic energy such as sonic or ultrasonic energy can be used as the phonon initiator mechanism.
In one aspect, apparatus for energy generation comprises: a body, referred to as the core, of a material capable of phonon propagation; a mechanism for introducing reactants into the core; a mechanism for inducing phonons in the core so that reactants, when introduced into the core, undergo nuclear reactions; and a control system, coupled to the mechanism for introducing reactants and to the mechanism for inducing phonons, for controlling the number of nuclear reactions and the depth of the nuclear reactions in the core so as to provide a desired level of energy generation while allowing energy released due to the nuclear reactions to dissipate in a manner that substantially avoids destruction of the core.
In another aspect, a method for energy generation comprises: providing a body, referred to as the core, of a material capable of phonon propagation; introducing reactants into the core; generating phonons in the core to provide energy for said reactants to undergo nuclear reaction; and controlling the rate of reactant introduction and the rate of phonon generation so as to control the number of nuclear reactions and the depth of the nuclear reactions in the core so as to provide a desired level of energy generation while allowing energy released due to the nuclear reactions to dissipate in a manner that substantially avoids destruction of the core.
A further understanding of the nature and advantages of the present invention may be realized by reference to the remaining portions of the specification and the drawings.
The phonon-inducing mechanism may stimulate phonons in the core directly using one or more means such as sonic/ultrasonic waves, current, or heat. Phonon energy causes displacement of the core lattice nuclei from their neutral positions. In the case where this displacement moves lattice nuclei closer together the density increases and is further increased by the presence of hydrogen nuclei (1H (protium), 2H (deuterium), or 3H (tritium)). As the density increases, the Fermi energy of the electrons increases, and so it becomes energetically favorable for an electron and proton to combine to make a neutron and a neutrino. The neutrino escapes from the reactor; however the electron capture results in an overall reduction of system energy by ˜782 KeV.
The resulting low-energy neutron has a high cross section of reaction with other H, D, or T nuclei. The formation of a deuteron from protium releases ˜2.24 MeV, the transition of D to T releases ˜6.26 Mev and the transition to 4H with the subsequent β− decay releases ˜22.36 MeV. Due to the wave nature of phonons and the associated density function driving the electron capture the overall momentum of the resulting 4H is low enough that β− is the decay function. Associated with the reactor is a heat transfer mechanism 45, which may be inherent in one or more of the above elements, may be a separate element, or may have attributes of both.
Control system 40 is shown having bi-directional communication with reactant-loading mechanism 20 via a control channel 50 and with phonon-inducing mechanism 30 via a control channel 55, and additional communication paths are shown. While the communication between the control mechanism and the reactant-loading and phonon-inducing mechanisms will usually be associated with electrical connections, the communication paths are intended to be very general. For example, as noted above, the phonon-generation mechanism may use ultrasonic energy or heat.
Control system 40 is also shown as having bi-directional communication with core 15 and heat transfer mechanism 45 via control channels 60 and 65. These additional control channels would allow an additional ability to control the reaction, but or both may be unnecessary in some embodiments. In some embodiments, these control channels provide signals from pressure and temperature sensors.
Control system 40 is shown as an enlarged detail with specific connections. More specifically, from the point of view of control system 40, control channel 50 is shown as having control outputs 50a and 50b, and a control input 50c. Similarly, control channel 55 is shown as having control outputs 55a, 55b, and 55c, and a control input 55d; control channel 60 is shown as having a control outputs 60a and 60b, and control outputs 60c and 60d; and control channel 65 is shown as having control inputs 65a and 65b, and control outputs 65c and 65d.
The same reference numbers will be used in the different embodiments, with the understanding that what are seen as control inputs and outputs from the point of view of control system 40 will be seen as control outputs and inputs from the point of view of reactant-loading mechanism 20, phonon-inducing mechanism 30, heat transfer mechanism, and core 15. Different embodiments may have different combinations of control inputs and outputs.
Four specific embodiments of a Quantum Fusion reactor are described in detail below. A first embodiment (
The following table sets forth the basic elements of the embodiments, the first four of which were briefly outlined above.
Control system 40 varies and monitors the power associated with both loading current and quantum current. For any given reactor using a quantum current to activate the core, changes in the power level (voltage*current) at any given temperature/current operating point is indicative of changes of the core being monitored. The loading system power (voltage*current) for any given loading current level can also be monitored to provide information on the system status. For reliability purposes the control system designer (during initial development) and the system operator (during routine operation) should run the system to be controlled while varying one parameter at a time to characterize the system. This will build a multi-dimensional control space where different points within the space will indicate problems such as core degradation, low water level, liquid pH problems and or scaling of the core.
Reactant-loading mechanism 20 in
Capacitor C5, FETs U5 and U5A, and FETs U6 and U6A provide for symmetrical quantum current pulses in the clockwise and counterclockwise directions, which aid in uniform loading and reaction rates in the core. Outputs from half-bridge driver U4 drive the gates of the FETs. Capacitor C2 is a high voltage, high capacitance low impedance device several orders of magnitude larger than capacitor C5. The voltage on capacitor C2 is provided on control channel 55. FETs U5 and U5A charge capacitor C5. FETs U6 and U6A discharge the charge stored in capacitor C5, providing an opposite polarity quantum current pulse. The FETs are controlled to control the direction of the quantum current pulse, shown as receiving signals over control channels 55b and 55c in
This type of driving arrangement gives very fast rise time and short duration quantum current pulses, enhancing the skin effect and concentrates reactions at the surface of the core. This helps to prevent damage from deep and excessive loading of the core material. By adjusting the voltage on capacitor C2 (control channel 55a) it is possible to directly control the power of the quantum current pulses. The required current level of the quantum current pulses varies depending on the temperature, core cross-section, core surface area, loading rate, and power generation needs of the system. The power level can also be used to detect a change in status of the core, indicating core integrity issues.
A a shunt resistor R2 is used for measuring the loading current entering the core. The loading power entering the system can be calculated by multiplying the value of current measured on shunt resistor R2 by the voltage across the loading current source. The loading current power measurement allows feedback of such system conditions as water Ph, pressure, and water level. The water can function as the heat transfer mechanism. The anode of the current loading source is preferably made of a material that will not be attacked by oxygen at the desired operating temperatures. The voltage across shunt resistor R2 provides a measure of the quantum current while the voltage across connection points P11 and P12 provides a measure of the voltage. The product provides a measure of the power of the quantum current compression pulses.
Control of the reactant-loading and quantum compression levels can be similar, for example comprising a capacitor with an electronic switch (FET Q4 in
Control system 40 collects information from the loading source feedback via control channel 50c and phonon generator feedback via control channel 55d, as well as other system inputs, to determine the correct inputs to reactant-loading mechanism 20 and determine the correct quantum compression power to be supplied to phonon-inducing system 30. The former is effected via signals on control channels 50a and 50b; the latter via signals on control channel 55a. These are controlled in order to achieve the desired rate of fusion. Due to the lack of quantum current it may be necessary to at least initiate this type of device with deuterium. The advantage if using deuterium is that there is no net neutron production required and thus no net absorption of electrons.
The loading of reactant 25 is dependent on the phase of the reactant. If it is a high-pressure gas, reactant-loading mechanism 20 may be a simple metering device for charging the vessel, and the source of signals over control channel 50c may be a pressure gage. In the pressurized vessel embodiment, the reactant feed (70) works with reactant return line (75) to circulate the reactant through the core to stir the helium out of the core and keep fresh reactant in contact with the core material. This embodiment will likely require the use of deuterium fuel as there is no readily available source of electrons for the creation of neutrons. When using deuterium, there is no net consumption of electrons. Rather, the electrons only act as a catalyst.
As in the embodiments shown in
The Source of the Observed Energy in So Called “Cold Fusion”
Unlike the common assumptions involved in “Cold Fusion,” it is believed that the energy released in these reactions is the result of neutron capture by hydrogen isotopes and the beta decay of 4H to 4He. The energy released by neutron capture and beta decay is given by the following equations relating the masses of reacting components to products:
An additional alternative reaction path is a 2H undergoing an electron capture event and combining with a passing 2H to form 4He.
The Source of the Free Neutrons
The neutrons participating in these reactions are the product of flavor change of protons that have been loaded into the core lattice (while the current implementation contemplates a crystalline core, other implementations may use ceramic cores or powder beds). The flavor change represents the transmutation of the proton into a neutron by a process similar to electron capture. Neutron generation requires a crystal lattice capable of generating phonons, capable of loading hydrogen ions, and which can supply valence or conduction band electrons, providing the ˜511 KeV electron mass. The required system is one that can achieve a total Hamiltonian energy of ˜782 KeV. This value represents the difference in mass between the proton-electron combination and the mass of the neutron. This combination leads to the transformation of a proton and electron into a neutron. This is an endothermic reaction that leads to an overall lower system energy level. The system is converting only enough energy (mass) to affect an electron capture, leaving the resulting neutron at an extremely low energy level. The resulting low energy neutron has a high cross section of reaction with respect to (1-3)H nuclei in the lattice. This neutron capture is similar to the process leading to a neutron star as discussed in [Baym1971], and applies to the H, D and T caught in the lattice and further enhanced by the quantum currents which allows the lower loading in this system.
It is believed that that energy is transferred to the protons through superposition of multiple phonon wave functions within the lattice of the core. This energy grows very rapidly as the non-bonded energy is extremely asymmetric. As mentioned in [NIH_Guide], “Repulsion is modeled by an equation that is designed to rapidly blow up at close distances (1/r12 dependency).” Additional energy beyond the phonon energy is realized from atomic band state confinement of ions. When local loading of the lattice is high, hydrogen ions take up positions at the octahedral points of vacant S(n+1) electron orbitals between the PnS(n+1) orbital wave function energy levels in transition metals. This wave function energy level occupation provides confinement necessary for what is referred to as Quantum Compression, a property arising out of the Heisenberg Uncertainty Principle.
Because both the electron and proton are fermions, the ions so trapped experience confinement effects. This confinement energy effect is a function of the Heisenberg Uncertainty Principle as stated in the form Δρ≧(h/2π)/Δx and can be enhanced through increased electron density causing occupation of adjacent bands. The conversion of a proton to a neutron is a natural energy reduction mechanism (it requires the addition of ˜1.253×10−13 J), converting energy to the mass difference between the proton-electron combination and the mass of a neutron while simultaneously eliminating a positive charge between the compressing nuclei. Because the transmutation is endothermic in nature, the system achieves higher entropy through the transmutation. The transmutation results in low-energy neutrons that have a high cross-section with respect to other hydrogen nuclei, giving an elevated reaction probability.
Energy released in the neutron absorptions interacts with lattice phonons in such a way that it is translated into kinetic energy in the lattice where it is dissipated into the surrounding environment (heat exchange mechanism).
It is the understanding of the reaction at the quantum level that reveals how to obtain the control and reliability required for commercial applications. Below is an outline of the steps involved in the reaction. By understanding the underlying mechanism that initiates a Quantum Fusion reaction it will be possible to use the knowledge contained in this patent to meet most of the world's energy needs today and for the foreseeable future. Phonon-Moderated Nuclear Reactions proceed most efficiently in the following way:
A loading pulse causes dissociation of reactant into ions by electrolysis, and the electrolysis drives free reactants into the core substance. The loading pulse also increases the ion density at the surface of the core. [Davis2001] notes that “An investigation of catalytic dissociation of gas molecules has found that dissociation can follow several paths, e.g., direct reactions and the formation of transient states, as discussed in the article by J. Jellinek entitled “Theoretical Dynamical Studies of Metal Clusters and Cluster-Ligand Systems,” (Metal-Ligand Interactions: Structure and Reactivity, N. Russo (ed.), Kluwer Dordrecht, 1995.). Electric fields, which are extremely strong at the surface of the reaction material, serve to attract these dissociated molecules to the material's surface. Advantageously, some of the hydrogen piles up at the material's surface, and then enters the material due to kinetic energy directed along electric field lines.”
The core is a material, (magnesium, chromium, iron, cobalt, nickel, molybdenum, palladium, silver, tungsten some ceramics, etc.) capable of propagating phonons, loading reactants, and supplying valence or conduction band electrons. The following are descriptions of possible methods for achieving quantum compression. The quantum compression method allows the Quantum Fusion reaction to be initiated near the surface of the core, avoiding the core destruction inherent with deep loading.
The electrons provide ˜511 KeV of mass. The required core system is able to achieve a total Hamiltonian energy of ˜782 KeV at reactant trapping points. This phonon energy, in combination with the electron and its associated momentum, supply the total mass required to convert a proton to a neutron. The resulting neutron is at an extremely low energy level. The low energy level provides an extremely high cross section allowing neutrons to accumulate and eventually leading to beta decay resulting in the formation of 4He.
The present invention can provide the additional energy required for the transmutation in one of two ways. The first way is by synchronizing an electrical current through the cathode (quantum current) with the electrolysis (loading) pulse. The high current, high frequency-content pulse through the matrix induces the creation of required phonon energy. Second, this energy may also be supplied by inducing phonons using a sonic or ultrasonic transmitter suitably coupled to the core material. Without a source of electrons for neutron capture it is necessary to use deuterium as fuel. The reason deuterium does not require reaction electrons is that after a capture event by a deuteron and subsequent merger with another deuteron, an electron (beta particle) is emitted resulting in no net electron absorption.
It is the inter-atomic energy caused by “phonons” that is the closest description of what is happening known to Applicant at this time. The quantum pulses are far in excess of what the wire is able to handle for any length of time. Standard “phonons” in palladium are ˜50 meV but that is not going to displace the atoms and cause electro-migration of the atoms. The quantum pulses do appear to cause electro-migration in order to achieve the required compression energy providing 782 KeV. I have now run single pulses as high as 35 A down the 0.05 mm wire and that does not appear to be a typical phonon (50 meV phonons are unlikely to add up to provide 768 KeV. With a fast enough edge and short enough width, much lower amplitudes are enough to provide the 782 KeV necessary to the 6-atom unit cell where the electron capture takes place.
Protons loaded into the crystal lattice occupy positions in the conduction band of lattice atoms and obey Bloch's Theorem. A Bloch wave or Bloch state is the wave function of a particle placed in a periodic potential (a lattice). It consists of the product of a plane wave and a periodic function unk(r) which has the same periodicity as the potential:
ψnk(r)=eik.runk(r)
The plane wave vector k multiplied by Planck's constant is the particle's crystal momentum. It can be shown that the wave function of a particle in a periodic potential must have this form by proving that translation operators (by lattice vectors) commute with the Hamiltonian. This result is called Bloch's Theorem. The H nuclei in these locations come under extremely high field pressure from the surrounding lattice nuclei. When phonon displacement energy reaches a magnitude of ≈782 KeV in the vicinity of an H nucleus it becomes energetically favorable for an electron capture event. The resulting neutron is in a very low energy state with a correspondingly high cross section of interaction with existing H nuclei.
According to quantum field theory, the potential energy of the Hamiltonian can be expressed in terms of fermion and boson creation and annihilation operators such that a set of processes is defined in which a fermion in a given eigenstate either absorbs or emits a boson (phonon), thereby being pushed into a different eigenstate. The change in eigenstate is the change of an Up quark to a down quark, which changes a proton to a neutron.
The hypothesis of the core operation asserts that it is through the creation and absorption of phonons (bosons) that the energy induced as vibrations in the atomic lattice is translated to the nuclear scale, and by which the nuclear energy released by neutron absorption and transmutation is being dispersed as kinetic energy in the lattice. The phonons provide the scale coupling between electromagnetic force-level stimuli in the atomic lattice and the subatomic level increases in momentum.
In systems using hydrogen as the reactant, proton occupation of limited positions within the lattice and augmented by octahedral points between the PnS(n+1)Dn orbital wave function energy levels in the core transition metal provides additional confinement points. There has been a fair amount of discussion within the cold fusion community of the octahedral points within the lattice being pinning points for the hydrogen ions. One of the key points missing in these discussions is a consideration of the octahedral points between the PnS(n+1)Dn orbital structures in the transition metals that seem to work. It is in these available orbital wave function energy levels that the hydrogen ion wave functions may be sufficiently confined to undergo the transmutation.
The quantum current pulse initiates the phonons and provides the reacting electrons that lead to neutron production before excessive absorbed hydrogen has had the opportunity to migrate very deeply into the lattice. Deep loading to a high density can lead to the gross loading condition of current cold fusion technology. In this condition the first reaction initiates a chain reaction of all nearby trapped H nuclei. Such a chain reaction liberates so much energy that lattice bonds break, causing disintegration of the core.
The proton drift current induced by the quantum current exerts a motivational force on the reactants within the lattice increasing the potential of nuclear interaction with the newly created low-energy neutrons or neutron rich material.
In systems using hydrogen as the reactant, the binding energy released in the creation of a 2H nucleus (deuteron) is ˜2.229 MeV. Deuterons are neutralized in the same process as single protons and the resulting 2N mass interacts with a 2H. The transition from 2H to 4H releases ˜3.386 MeV. The largest yield of energy comes from the transition of 4H via beta decay to 4He yielding a total of ˜22.965 MeV in the form of phonon creation and alpha particle radiation.
As shown schematically in
Additional embodiments of useful reactors could include using a thermally but not electrically conductive support with a conductive core. By placing a gas source of reactant on the exposed side of the core and using electrolytic loading, the reaction could be initiated with resistive current heating of the core, with quantum currents, or a combination there of. A significant benefit of having a current flow in the core is the ability to use protium as the primary reactant. The core support would act as the heat sink and transfer the energy to what ever is desired, e.g., direct thermal conversion or a working fluid. The working fluid could be any gas or liquid down to and including the sea of electrons as discussed in [Kolawa2004].
Typical parameters are discussed, with specific quantities being described for a current demonstration reactor. The demonstration reactor is run at atmospheric pressure and uses a solution of sodium hydroxide in order to reduce the loading voltage requirement. A pressurized reactor would most likely eliminate the need for sodium hydroxide. This section frequently discusses a 10 nS timing resolution. This is because the current demonstration reactor uses a 100 MHz processor in the control system and this represents the available resolution. There is nothing fundamental about the 10 ns resolution.
The Quantum Fusion reactor implemented by electrolysis and quantum current control is driven by the stimulation of phonons in a crystal lattice. Phonon stimulation is accomplished by stimulation event cycles consisting of a loading pulse and zero or more quantum current stimulation pulses.
Event Cycles
An event cycle consists of a loading pulse and zero or more quantum current stimulation pulses. Loading pulses cause dissociation of the water into hydrogen and oxygen and promote the migration of hydrogen nuclei into the reaction matrix. Quantum current pulses stimulate phonons in the reaction matrix and ensure presence of electrons for electron capture. It may also be possible to use reverse polarity electrolysis pulsed to supply the reaction electrons if the core temperature is high enough to supply the required phonons without quantum current.
Number of Events—0-250 (or Free-Run)
In the initial reactor prototype the number of events is determinable by user configuration to allow optimization of the reaction characteristics and core start-up. Free run allows the reactor to proceed according to currently configured parameters (pursuant to the implementation of a feedback system).
Event Period—10 μs-10,000,000 μs (10 μs Resolution)
This parameter allows the length of time between event cycles to be controlled. This time period allows for the dissipation of fusion-induced phonon energy. Longer event periods will allow more time between loading pulses and subsequent Quantum Fusion events. Currently due to hardware/software in use, events are being run at 1518.8 Hz or 658 μS. This represents a 16-bit PWM with a 99.5328 MHz clock.
Number of Quantum Pulses Per Event—0-250
This parameter allows optimization of energy production for various loading pulse amplitudes, durations, and temperature profiles. Varying the number of quantum pulses per event, allows the ratio of Quantum Fusion reaction rate and loading rate to be adjusted relative to one another. An analogy would be with multiple injection events per combustion cycle in an internal combustion direct injection engine. The current software/hardware implementing the reaction process is only capable of 140 pulses per event. The current demonstration reactor samples the loading current just after half of the number of pulses in the event have been instigated, in order to obtain the most accurate loading current used for calculation of the next pulse width setting.
The Loading Pulse
The loading pulse causes dissociation of water into hydrogen and oxygen and promotes the migration of hydrogen nuclei into the reaction crystal matrix. Varying the pulse width relative to the amplitude allows the rate of dissociation to be controlled independent of the rate of loading.
Loading Pulse Width—0.1%-100% (10 ns Resolution)
The pulse width determines the length of time loading occurs. This is an indirect control on the density and depth of loading in the reaction matrix. This is roughly analogous to a choke or mixture setting on a carbureted engine. With the materials currently available for demonstration reactors, the process only produces easily detectable excess heat when run at 80+% loading duty cycle. It is expected that efficiency of mass conversion will be much higher under increased pressure and temperature and thereby require the greatly extended range specified above.
Loading Pulse Amplitude—0-102.375 V (0.025V Resolution)
The pulse amplitude determines the rate of dissociation, and thus, the rate of fuel availability. As discussed above, the loading pulse under open container conditions must be in excess of 80% duty cycle. The current demonstration reactor is isolating quantum pulses while the loading is at the same reference as the reactor control processor. The loading energy/current and duty cycle can be controlled by adjusting the loading voltage. The demonstration reactor is using sodium hydroxide and distilled water to provide a lower loading voltage requirement.
Loading Pulse Offset—0-250,000 ns (25 ns Resolution)
This offset allows the start of the loading pulse to be varied relative to the start of the quantum pulse(s). This is roughly analogous to the spark timing in an internal combustion engine. This capability is still present in the current demonstration reactor but the reality is that the loading duty cycle in combination with the current quantum pulses being created must be at least 80% to achieve detectable amounts of excess heat. Current device appears to be converting on the order of 0.00014% or less of the H liberated in the electrolysis process. This is still easily detectable as the energy liberated at a loading current of 1.2 A is in excess of 10 W at that conversion rate.
The Quantum Pulses
The ultimate purpose of the quantum current is the creation of free, low-energy, high-cross-section neutrons. The quantum pulses are responsible for initiating phonons in the reaction matrix, imparting additional energy to the system, filling available conduction and valance band orbitals to effect quantum compression, and increasing the density of electrons available for electron capture, and consequent low-energy, high-cross-section neutrons.
According to quantum field theory, the potential energy of the Hamiltonian can be expressed in terms of fermion and boson creation and annihilation operators such that a set of processes is defined in which a fermion in a given eigenstate either absorbs or emits a boson (phonon), thereby being pushed into a different eigenstate. The change in eigenstate is the change of an Up quark to a Down quark, which changes a proton to a neutron.
It is believed on the basis of the standard model theory that it is through the creation and absorption of phonons (bosons) that the energy induced as vibrations in the atomic lattice is translated to the nuclear scale, and by which the nuclear energy released by neutron absorption and transmutation is being dispersed as kinetic energy in the lattice. The phonons provide the scale coupling between electromagnetic force-level stimuli in the atomic lattice and the subatomic level increases in momentum.
Quantum current supplies valence or conduction band electrons, providing the ˜511 KeV electron mass. The quantum current is also responsible for raising the Hamiltonian energy of the reaction sites to the required ˜782 KeV necessary for electron capture. This value represents the difference in mass between the proton-electron combination and the mass of the neutron.
It is the intersection of these free neutrons with available hydrogen nuclei that comprises the fusion reaction path. The closest academically accepted reaction paths are the R-process and S-process, which occur in stars.
A relatively low duty cycle of the quantum current pulses is typically required because effective quantum current pulse amplitude for a longer duty cycle would typically vaporize the core. There may be exceptions.
Quantum Pulse Rate—3 KHz-300 KHz (10 ns Resolution) and Quantum Pulse Amplitude—0-400 V (0.2V Resolution)
The individual quantum pulses can be adjusted to tune the phonon creation and energy level. Phonons will also be generated as a product of Quantum Fusion events, leading to a lower phonon stimulation energy input requirement. The energy level requirement is a function of the macro temperature of the core as a whole, the loading rate, the geometry of the core, and the duration of the loading pulse, which partially determines loading depth. As seen in
Quantum Pulse Dead Time—3.3 μs-333 μs (10 ns Resolution)
This parameter is a function of the circuit used to implement the quantum pulses and the loading rate. The pulse dead time also represents a division between quantum pulses whose direction through the core are alternated. This quantum pulse direction alternation provides for uniform loading of the core. Unidirectional quantum pulsing results in proton migration in the core, leading to a potential gradient in the core and non-uniform heating. It could also result in the eventual destruction of a metallic core as effective quantum pulses cause electro-migration of the atoms in order to generate the required Hamiltonian energy necessary to cause electron capture events/neutron generation. If the electro-migration is unidirectional the core will likely break.
Quantum Pulse Offset—100 ns-5000 ns (10 ns Resolution)
This offset allows the start of the loading pulse to be varied relative to the start of the quantum pulse(s). This is roughly analogous to the spark timing in an internal combustion engine. It also allows the accurate collection of loading current data that is disturbed by the quantum pulses. This parameter has been replaced in the current demonstration reactor by limiting the frequency of quantum pulses although it could represent a delay factor of one pulse to enable the accurate collection of loading current data.
Feedback parameters allow a commercially useful application of the reactor to be constructed with reaction parameters being adjusted in real time according to the dictates of energy demand on the system, changing pressure and temperature inside the reactor vessel.
Temperature and Pressure
This is standard boiler feedback and is used solely for process control.
Loading Pulse Power
Loading pulse power feedback provides information on the water (sodium hydroxide solution in the current demonstration reactor) and inter-electrode environment. A large increase in loading pulse power can be indicative of excess phonon generation leading to a vapor envelope around the core impacting heat transfer away from the core. Operating under a constant loading power method aids in control of this problem. By sampling the loading current at the start of each cycle, the value may be overstated due to the nature of charge storage systems. It is better to collect this data in the middle of the cycle for calculating the loading power of the current cycle and use it to adjust future cycle widths.
Quantum Pulse Power
The quantum pulse power feedback provides information on the state of core loading and possible core damage. The impedance of the core will change dependent upon the percentage of saturation of reactant in the core. Possible core damage will also lead to a persistent increase in quantum current energy due to increased resistance of the core. Impedance rise due to excessive loading density may necessitate a greater number of quantum pulses relative to loading pulses to alleviate the excessive loading condition. Sustained excess loading could lead to core degradation and/or destruction, through chained reactions leading to excess buildup of phonon energy.
Power Supply Voltage (Loading Pulse)
This sets the loading current magnitude (an earlier embodiment used a pulse transformer for loading, and this referred to the voltage on the primary of the pulse transformer). Pulse amplitude determines the rate of dissociation, and thus, the rate of fuel availability. There are upper limits to this function and care should be taken to not cause spallation of the core surface due to excessive instantaneous loading power. In palladium that appears to be ˜4 A/mm2 although sustained loading of significantly less than this will cause destruction of a palladium core. The above number was found under conditions of loading current RMS values of less than 20 mA/mm2.
In an open container the lower end of effective loading appears to be 240 mA/mm2 RMS. Care must also be taken in consideration of total electrical heating of the core and how it is mounted in the electrolytic solution. For example, the ends of the core should be insulated to prevent the solution from attacking the support structure, to prevent the support structure from absorbing the loading energy, and to prevent the effective removal of heat from the core material.
Quantum Pulse Transformer Primary Voltage
This voltage allows the quantum current magnitude to be set from the primary side. The primary side is used to maintain isolation between the quantum current and the loading current. Using a center tapped magnetic device to couple the Quantum current energy to the core allows the core to be uniformly loaded. It is important to select a core able to handle the 500 MHz and above frequency content of effective quantum compression waveforms.
RF transmission line transformers (TLTs) with a center-tapped secondary work well. In the demonstration reactor T8 of
Another method of using the reaction could include using a porous ceramic structure such as those offered by Foster Miller (see Karandikar1999, Karandikar1999-2). The shape of the porosity as well as the net shape can be specified. This material could be plated with the desired core material. It is believed that the best results using this type material would be achieved with a porosity designed to provide a uniform cross section for a quantum current activation. With this type of core the Quantum Fusion reaction will likely initiate at the points of maximum current density but spread as the temperature rises to the level necessary to supply the remaining phonons required for proton to neutron conversion in the rest of the core. This type of core material could be installed in a sealed container along the lines of those found in radioisotope thermoelectric generator (RTG), but without the dangerously radioactive core.
One aspect of the present invention, alluded to in the preceding paragraph, is that a significant portion of the mechanical and thermodynamic infrastructure can be based on existing, commercially available technology. For example, a conventional 3-phase-electrode steam boiler, such as those available from Electric Steam Generator Corporation, 600 S. Oak St. (P.O. Box 21) Buchanan, Mich. 49107 Toll Free: (800) 714-7741, can be retrofitted with a Quantum Fusion core in the following manner: using a 3-phase electrode boiler, use two of the 3-phase electrodes for cathode connection, mounting a Quantum Fusion reactor core between them, allowing quantum current stimulation, and use the third electrode as the anode. Surprisingly, this is the only necessary mechanical modification to the device.
Experimental Setup
The first subsystem is provided with the active core and the second subsystem is provided with a joule heater, and the subsystems are activated with the overall input electric power is controlled to be equal for both subsystems, and the temperatures of the two reaction vessels are measured over a period of time.
It is expected that the temperatures in the two reaction vessels will begin to rise, if for no other reason, joule heating of the liquid. Both the active core and the dummy core act as immersion heaters. Due to heat losses arising from conduction and convection, the temperature of the liquid in each vessel ultimately reaches an equilibrium value.
If joule heating were the only mechanism in play, the two vessels would be expected to reach the same equilibrium temperature given that they were being provided the same amount of electrical energy. If the first subsystem reached a higher equilibrium temperature, that could be considered an indication that excess heat beyond that attributable to the electrical energy being converted to heat was being generated.
Experimental Data
Table 1 below shows experimental data acquired during the month of December 2006.
The first three columns (excluding the date column) describe the quality of the quantum compression (abbreviated as “Q” in the table) waveforms. For the runs shown in the chart, the core was 0.05 mm diameter palladium wire. The core diameter is important in the determination of sizing and edge speed requirements for the quantum compression pulses. Instantaneous loading amps/mm2 and RMS loading amps/mm2 are the loading requirements and total amps are related to the surface area of the core in use.
The power to the reactor and the joule heater were maintained at equal levels for comparison. Measuring the joule heater power was effected by using a standard power meter. Measuring the reactor power was done computationally, with separate computations for the loading power and the quantum compression power. In general, the bulk (75-90%) of the power to the reactor is the power of the loading portion of the circuit, with a smaller fraction for the quantum compression.
The second December 5 run had no quantum pulses applied to the core, and the joule heater raised the water to a higher temperature. This reflects the fact that the joule heater transfers more of the input electrical power to the solution than does the loading circuit. The results of the December 18 and December 20 runs, which had sharper pulses than the first December 5 run, are encouraging in that they strongly suggest the generation of excess heat due to the quantum compression pulses.
The following references are hereby incorporated by reference:
While the above is a complete description of specific embodiments of the invention, the above description should not be taken as limiting the scope of the invention as defined by the claims.
This application is a continuation of U.S. patent application Ser. No. 11/617,632, filed Dec. 28, 2006 for “Energy Generation Apparatus and Method” (Robert E. Godes), which claims priority from U.S. Provisional Patent Application No. 60/755,024, filed Dec. 29, 2005 for “Energy Generation Apparatus and Method” (Robert E. Godes). The entire disclosures of the above-named applications (including all attached documents) are hereby incorporated by reference for all purposes.
Number | Date | Country | |
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60755024 | Dec 2005 | US |
Number | Date | Country | |
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Parent | 11617632 | Dec 2006 | US |
Child | 12911586 | US |