The underlying mechanisms of the fundamental electric and magnetic forces are not clear in curren... more The underlying mechanisms of the fundamental electric and magnetic forces are not clear in current models; they are mainly mathematical constructs. This study examines the underlying physics from a classical viewpoint to explain Coulomb's electric force and Lorentz's magnetic force. This is accomplished by building upon already established physics. Although no new physics is introduced, extension of existing models is made by close examination. We all know that an electron carries a bound cylindrical B-field (CBF) as it translates. Here, we show how the electron CBF plays an intrinsic role in the generation of the electric and magnetic forces. FOR A BETTER ONLINE VIEW OF ARTICLE, SEE HERE; https://www.sciencedirect.com/science/article/pii/S2211379717325871
An overview and a discussion on how quantum theory and classical theory of particles are related,... more An overview and a discussion on how quantum theory and classical theory of particles are related, and how they perform different functions; thus, making both theories necessary.
"Hadronization", based on recent experimental results from RHIC and LHC, is examined. From thi... more "Hadronization", based on recent experimental results from RHIC and LHC, is examined. From this study, previously proposed models and dynamics of hadrons, such as the proton and neutron, are shown to be consistent with the recent experimental results.
General overview of the mathematics used to derive the electron model in "New Physics Framework",... more General overview of the mathematics used to derive the electron model in "New Physics Framework", which was recently uploaded.
This article called “Unveiling of the Electron with a Pictorial View” (Post #1) is excerpted from... more This article called “Unveiling of the Electron with a Pictorial View” (Post #1) is excerpted from a book called “New Physics Framework” (Post #5). To see how the the electric force is generated go to this link at "Science Direct":
https://www.sciencedirect.com/science/article/pii/S2211379717325871
The modeled electron in Figure 2 is equivalent to the cylindrical B-field described by the Biot-Savart law for point charge. (In the Figure: z, h, and θ are the longitudinal axis coordinate, radial coordinate, and angular coordinate, respectively.) However, since there is a gradient in the intensity of Bθ as measured along the z-axis of such cylindrical B-field (∂Bθ/∂z is non-zero), said cylindrical B-field must oscillate inward and outward along its z-axis, as required per Maxwell’s calculus. Thus, the cylindrical B-field of a translating electron translates and oscillates, while such field of an at-rest electron just oscillates. The oscillating cylindrical B-field of an at-rest electron is immeasurable due to the constant reversals of its rotational directions as it oscillates; whereas for a translating electron, there is a net rotational direction of the cylindrical B-field that is attributable to the translation. This part of Bθ is measurable and is given by the Biot-Savart law for point charge.
It should be noted that in this article – “Unveiling of the Electron with a Pictorial View” (Post #1) – the heat fiber in “Figure 1” is a photon as described in “Footnote 1”. You will also notice that the electron only consists of a cylindrical B-field (no electric field) as shown in “Figure 2”.
“UNVEILING of the ELECTRON with a Pictorial View” (Post #1) was recently posted; it gave a gener... more “UNVEILING of the ELECTRON with a Pictorial View” (Post #1) was recently posted; it gave a general introduction and view of the electron. In this post, a mathematical derivation of such electron is given.
The modeled electron in Figure 2 is equivalent to the cylindrical B-field described by the Biot-Savart law for point charge. (In the Figure: z, h, and θ are the longitudinal axis coordinate, radial coordinate, and angular coordinate, respectively.) However, since there is a gradient in the intensity of Bθ as measured along the z-axis of such cylindrical B-field (∂Bθ/∂z is non-zero), said cylindrical B-field must oscillate inward and outward along its z-axis, as required per Maxwell’s calculus. Thus, the cylindrical B-field of a translating electron translates and oscillates, while such field of an at-rest electron just oscillates. The oscillating cylindrical B-field of an at-rest electron is immeasurable due to the constant reversals of its rotational directions as it oscillates; whereas for a translating electron, there is a net rotational direction of the cylindrical B-field that is attributable to the translation. This part of Bθ is measurable and is given by the Biot-Savart law for point charge.
From this electron model, we show how and why the following electron properties work in "New Physics Framework" (Post #5); these include its magnetic moment, magnetic B-field, electric charge, energy, mass, and gravitational potential.
POST #1 & POST #2 were recently uploaded. Post #1 gave a general introduction and view of the ele... more POST #1 & POST #2 were recently uploaded. Post #1 gave a general introduction and view of the electron. Post #2 gave a mathematical derivation of such electron. In this post, we show what constitutes the electron charge. It should be pointed out that the radial heat fiber, referred to in this article, is a photon, which can be viewed and is described in Post #1 or Post #2.
The modeled electron in Figure 2 is equivalent to the cylindrical B-field described by the Biot-Savart law for point charge. (In the Figure: z, h, and θ are the longitudinal axis coordinate, radial coordinate, and angular coordinate, respectively.) However, since there is a gradient in the intensity of Bθ as measured along the z-axis of such cylindrical B-field (∂Bθ/∂z is non-zero), said cylindrical B-field must oscillate inward and outward along its z-axis, as required per Maxwell’s calculus. Thus, the cylindrical B-field of a translating electron translates and oscillates, while such field of an at-rest electron just oscillates. The oscillating cylindrical B-field of an at-rest electron is immeasurable due to the constant reversals of its rotational directions as it oscillates; whereas for a translating electron, there is a net rotational direction of the cylindrical B-field that is attributable to the translation. This part of Bθ is measurable and is given by the Biot-Savart law for point charge.
From this electron model, we show how and why other electron properties work in "New Physics Framework" (Post #5); these include its magnetic moment, energy, mass, gravitational potential, and radiation.
POST #1, POST #2 & POST #3 were recently uploaded to this site; Post #1 gave a general introducti... more POST #1, POST #2 & POST #3 were recently uploaded to this site; Post #1 gave a general introduction and view of the electron. Post #2 gave a mathematical derivation of such electron. Post #3 explained how the electron charge worked. In this short post, comments are made to clarify what the electron’s electric field is. Related comments on EM waves are also included.
Posts #1 to #4 were recently uploaded to this site. These posts gave an introduction and derivati... more Posts #1 to #4 were recently uploaded to this site. These posts gave an introduction and derivation of the electron. The four posts were excerpted from a book titled "New Physics Framework". Now, the Japanese version of the book is posted here as Post #5J.
Utilizing the electron model (given in Posts #1 to #4) as shown in the book, it now becomes possible to physically understand how and why the following phenomena work: these include the magnetic dipole moment, electromagnetic radiation, electric force, heat, movement of radiation into and out of hydrogen atoms, Pauli's exclusion principle, Lenz's law, the Lamb shift, gravitation, and mass and its increase with velocity. Understanding whether dark matter and energy are relevant is also studied.
Classical logic, in lieu of the very productive quantum logic, was utilized in the book. This was found to be possible because physical models were used to establish mathematical models for particles and forces. Hence, the new framework is presented without the requirement of abstract models described by complex and abstract mathematics. Merging of quantum mechanics with general relativity, which are based on separate unrelated theories, is not required in the new framework, where the four fundamental forces work at the atomic level and gravity works at large scales as well.
The underlying mechanisms of the fundamental electric and magnetic forces are not clear in curren... more The underlying mechanisms of the fundamental electric and magnetic forces are not clear in current models; they are mainly mathematical constructs. This study examines the underlying physics from a classical viewpoint to explain Coulomb's electric force and Lorentz's magnetic force. This is accomplished by building upon already established physics. Although no new physics is introduced, extension of existing models is made by close examination. We all know that an electron carries a bound cylindrical B-field (CBF) as it translates. Here, we show how the electron CBF plays an intrinsic role in the generation of the electric and magnetic forces. FOR A BETTER ONLINE VIEW OF ARTICLE, SEE HERE; https://www.sciencedirect.com/science/article/pii/S2211379717325871
An overview and a discussion on how quantum theory and classical theory of particles are related,... more An overview and a discussion on how quantum theory and classical theory of particles are related, and how they perform different functions; thus, making both theories necessary.
"Hadronization", based on recent experimental results from RHIC and LHC, is examined. From thi... more "Hadronization", based on recent experimental results from RHIC and LHC, is examined. From this study, previously proposed models and dynamics of hadrons, such as the proton and neutron, are shown to be consistent with the recent experimental results.
General overview of the mathematics used to derive the electron model in "New Physics Framework",... more General overview of the mathematics used to derive the electron model in "New Physics Framework", which was recently uploaded.
This article called “Unveiling of the Electron with a Pictorial View” (Post #1) is excerpted from... more This article called “Unveiling of the Electron with a Pictorial View” (Post #1) is excerpted from a book called “New Physics Framework” (Post #5). To see how the the electric force is generated go to this link at "Science Direct":
https://www.sciencedirect.com/science/article/pii/S2211379717325871
The modeled electron in Figure 2 is equivalent to the cylindrical B-field described by the Biot-Savart law for point charge. (In the Figure: z, h, and θ are the longitudinal axis coordinate, radial coordinate, and angular coordinate, respectively.) However, since there is a gradient in the intensity of Bθ as measured along the z-axis of such cylindrical B-field (∂Bθ/∂z is non-zero), said cylindrical B-field must oscillate inward and outward along its z-axis, as required per Maxwell’s calculus. Thus, the cylindrical B-field of a translating electron translates and oscillates, while such field of an at-rest electron just oscillates. The oscillating cylindrical B-field of an at-rest electron is immeasurable due to the constant reversals of its rotational directions as it oscillates; whereas for a translating electron, there is a net rotational direction of the cylindrical B-field that is attributable to the translation. This part of Bθ is measurable and is given by the Biot-Savart law for point charge.
It should be noted that in this article – “Unveiling of the Electron with a Pictorial View” (Post #1) – the heat fiber in “Figure 1” is a photon as described in “Footnote 1”. You will also notice that the electron only consists of a cylindrical B-field (no electric field) as shown in “Figure 2”.
“UNVEILING of the ELECTRON with a Pictorial View” (Post #1) was recently posted; it gave a gener... more “UNVEILING of the ELECTRON with a Pictorial View” (Post #1) was recently posted; it gave a general introduction and view of the electron. In this post, a mathematical derivation of such electron is given.
The modeled electron in Figure 2 is equivalent to the cylindrical B-field described by the Biot-Savart law for point charge. (In the Figure: z, h, and θ are the longitudinal axis coordinate, radial coordinate, and angular coordinate, respectively.) However, since there is a gradient in the intensity of Bθ as measured along the z-axis of such cylindrical B-field (∂Bθ/∂z is non-zero), said cylindrical B-field must oscillate inward and outward along its z-axis, as required per Maxwell’s calculus. Thus, the cylindrical B-field of a translating electron translates and oscillates, while such field of an at-rest electron just oscillates. The oscillating cylindrical B-field of an at-rest electron is immeasurable due to the constant reversals of its rotational directions as it oscillates; whereas for a translating electron, there is a net rotational direction of the cylindrical B-field that is attributable to the translation. This part of Bθ is measurable and is given by the Biot-Savart law for point charge.
From this electron model, we show how and why the following electron properties work in "New Physics Framework" (Post #5); these include its magnetic moment, magnetic B-field, electric charge, energy, mass, and gravitational potential.
POST #1 & POST #2 were recently uploaded. Post #1 gave a general introduction and view of the ele... more POST #1 & POST #2 were recently uploaded. Post #1 gave a general introduction and view of the electron. Post #2 gave a mathematical derivation of such electron. In this post, we show what constitutes the electron charge. It should be pointed out that the radial heat fiber, referred to in this article, is a photon, which can be viewed and is described in Post #1 or Post #2.
The modeled electron in Figure 2 is equivalent to the cylindrical B-field described by the Biot-Savart law for point charge. (In the Figure: z, h, and θ are the longitudinal axis coordinate, radial coordinate, and angular coordinate, respectively.) However, since there is a gradient in the intensity of Bθ as measured along the z-axis of such cylindrical B-field (∂Bθ/∂z is non-zero), said cylindrical B-field must oscillate inward and outward along its z-axis, as required per Maxwell’s calculus. Thus, the cylindrical B-field of a translating electron translates and oscillates, while such field of an at-rest electron just oscillates. The oscillating cylindrical B-field of an at-rest electron is immeasurable due to the constant reversals of its rotational directions as it oscillates; whereas for a translating electron, there is a net rotational direction of the cylindrical B-field that is attributable to the translation. This part of Bθ is measurable and is given by the Biot-Savart law for point charge.
From this electron model, we show how and why other electron properties work in "New Physics Framework" (Post #5); these include its magnetic moment, energy, mass, gravitational potential, and radiation.
POST #1, POST #2 & POST #3 were recently uploaded to this site; Post #1 gave a general introducti... more POST #1, POST #2 & POST #3 were recently uploaded to this site; Post #1 gave a general introduction and view of the electron. Post #2 gave a mathematical derivation of such electron. Post #3 explained how the electron charge worked. In this short post, comments are made to clarify what the electron’s electric field is. Related comments on EM waves are also included.
Posts #1 to #4 were recently uploaded to this site. These posts gave an introduction and derivati... more Posts #1 to #4 were recently uploaded to this site. These posts gave an introduction and derivation of the electron. The four posts were excerpted from a book titled "New Physics Framework". Now, the Japanese version of the book is posted here as Post #5J.
Utilizing the electron model (given in Posts #1 to #4) as shown in the book, it now becomes possible to physically understand how and why the following phenomena work: these include the magnetic dipole moment, electromagnetic radiation, electric force, heat, movement of radiation into and out of hydrogen atoms, Pauli's exclusion principle, Lenz's law, the Lamb shift, gravitation, and mass and its increase with velocity. Understanding whether dark matter and energy are relevant is also studied.
Classical logic, in lieu of the very productive quantum logic, was utilized in the book. This was found to be possible because physical models were used to establish mathematical models for particles and forces. Hence, the new framework is presented without the requirement of abstract models described by complex and abstract mathematics. Merging of quantum mechanics with general relativity, which are based on separate unrelated theories, is not required in the new framework, where the four fundamental forces work at the atomic level and gravity works at large scales as well.
Uploads
Papers by Dan S Correnti
https://www.sciencedirect.com/science/article/pii/S2211379717325871
The modeled electron in Figure 2 is equivalent to the cylindrical B-field described by the Biot-Savart law for point charge. (In the Figure: z, h, and θ are the longitudinal axis coordinate, radial coordinate, and angular coordinate, respectively.) However, since there is a gradient in the intensity of Bθ as measured along the z-axis of such cylindrical B-field (∂Bθ/∂z is non-zero), said cylindrical B-field must oscillate inward and outward along its z-axis, as required per Maxwell’s calculus. Thus, the cylindrical B-field of a translating electron translates and oscillates, while such field of an at-rest electron just oscillates. The oscillating cylindrical B-field of an at-rest electron is immeasurable due to the constant reversals of its rotational directions as it oscillates; whereas for a translating electron, there is a net rotational direction of the cylindrical B-field that is attributable to the translation. This part of Bθ is measurable and is given by the Biot-Savart law for point charge.
It should be noted that in this article – “Unveiling of the Electron with a Pictorial View” (Post #1) – the heat fiber in “Figure 1” is a photon as described in “Footnote 1”. You will also notice that the electron only consists of a cylindrical B-field (no electric field) as shown in “Figure 2”.
Please refer to the link below that explains how the electric force is generated.
https://www.sciencedirect.com/science/article/pii/S2211379717325871
The modeled electron in Figure 2 is equivalent to the cylindrical B-field described by the Biot-Savart law for point charge. (In the Figure: z, h, and θ are the longitudinal axis coordinate, radial coordinate, and angular coordinate, respectively.) However, since there is a gradient in the intensity of Bθ as measured along the z-axis of such cylindrical B-field (∂Bθ/∂z is non-zero), said cylindrical B-field must oscillate inward and outward along its z-axis, as required per Maxwell’s calculus. Thus, the cylindrical B-field of a translating electron translates and oscillates, while such field of an at-rest electron just oscillates. The oscillating cylindrical B-field of an at-rest electron is immeasurable due to the constant reversals of its rotational directions as it oscillates; whereas for a translating electron, there is a net rotational direction of the cylindrical B-field that is attributable to the translation. This part of Bθ is measurable and is given by the Biot-Savart law for point charge.
From this electron model, we show how and why the following electron properties work in "New Physics Framework" (Post #5); these include its magnetic moment, magnetic B-field, electric charge, energy, mass, and gravitational potential.
The modeled electron in Figure 2 is equivalent to the cylindrical B-field described by the Biot-Savart law for point charge. (In the Figure: z, h, and θ are the longitudinal axis coordinate, radial coordinate, and angular coordinate, respectively.) However, since there is a gradient in the intensity of Bθ as measured along the z-axis of such cylindrical B-field (∂Bθ/∂z is non-zero), said cylindrical B-field must oscillate inward and outward along its z-axis, as required per Maxwell’s calculus. Thus, the cylindrical B-field of a translating electron translates and oscillates, while such field of an at-rest electron just oscillates. The oscillating cylindrical B-field of an at-rest electron is immeasurable due to the constant reversals of its rotational directions as it oscillates; whereas for a translating electron, there is a net rotational direction of the cylindrical B-field that is attributable to the translation. This part of Bθ is measurable and is given by the Biot-Savart law for point charge.
From this electron model, we show how and why other electron properties work in "New Physics Framework" (Post #5); these include its magnetic moment, energy, mass, gravitational potential, and radiation.
Books by Dan S Correnti
https://www.researchgate.net/publication/271909240_New_Physics_Framework_Post_53
If desired, constructive comments on the book can be made at the following site:
https://www.enago.com/academy/new-physics-framework-dan-s-correnti-book-review/
https://www.researchgate.net/publication/271909240_New_Physics_Framework_Post_53
If desired, constructive comments on the book can be made at the following site:
https://www.enago.com/academy/new-physics-framework-dan-s-correnti-book-review/
https://www.researchgate.net/publication/271909240_New_Physics_Framework_Post_53
If desired, constructive comments on the book can be made at the following site:
https://www.enago.com/academy/new-physics-framework-dan-s-correnti-book-review/
Utilizing the electron model (given in Posts #1 to #4) as shown in the book, it now becomes possible to physically understand how and why the following phenomena work: these include the magnetic dipole moment, electromagnetic radiation, electric force, heat, movement of radiation into and out of hydrogen atoms, Pauli's exclusion principle, Lenz's law, the Lamb shift, gravitation, and mass and its increase with velocity. Understanding whether dark matter and energy are relevant is also studied.
Classical logic, in lieu of the very productive quantum logic, was utilized in the book. This was found to be possible because physical models were used to establish mathematical models for particles and forces. Hence, the new framework is presented without the requirement of abstract models described by complex and abstract mathematics. Merging of quantum mechanics with general relativity, which are based on separate unrelated theories, is not required in the new framework, where the four fundamental forces work at the atomic level and gravity works at large scales as well.
https://www.sciencedirect.com/science/article/pii/S2211379717325871
The modeled electron in Figure 2 is equivalent to the cylindrical B-field described by the Biot-Savart law for point charge. (In the Figure: z, h, and θ are the longitudinal axis coordinate, radial coordinate, and angular coordinate, respectively.) However, since there is a gradient in the intensity of Bθ as measured along the z-axis of such cylindrical B-field (∂Bθ/∂z is non-zero), said cylindrical B-field must oscillate inward and outward along its z-axis, as required per Maxwell’s calculus. Thus, the cylindrical B-field of a translating electron translates and oscillates, while such field of an at-rest electron just oscillates. The oscillating cylindrical B-field of an at-rest electron is immeasurable due to the constant reversals of its rotational directions as it oscillates; whereas for a translating electron, there is a net rotational direction of the cylindrical B-field that is attributable to the translation. This part of Bθ is measurable and is given by the Biot-Savart law for point charge.
It should be noted that in this article – “Unveiling of the Electron with a Pictorial View” (Post #1) – the heat fiber in “Figure 1” is a photon as described in “Footnote 1”. You will also notice that the electron only consists of a cylindrical B-field (no electric field) as shown in “Figure 2”.
Please refer to the link below that explains how the electric force is generated.
https://www.sciencedirect.com/science/article/pii/S2211379717325871
The modeled electron in Figure 2 is equivalent to the cylindrical B-field described by the Biot-Savart law for point charge. (In the Figure: z, h, and θ are the longitudinal axis coordinate, radial coordinate, and angular coordinate, respectively.) However, since there is a gradient in the intensity of Bθ as measured along the z-axis of such cylindrical B-field (∂Bθ/∂z is non-zero), said cylindrical B-field must oscillate inward and outward along its z-axis, as required per Maxwell’s calculus. Thus, the cylindrical B-field of a translating electron translates and oscillates, while such field of an at-rest electron just oscillates. The oscillating cylindrical B-field of an at-rest electron is immeasurable due to the constant reversals of its rotational directions as it oscillates; whereas for a translating electron, there is a net rotational direction of the cylindrical B-field that is attributable to the translation. This part of Bθ is measurable and is given by the Biot-Savart law for point charge.
From this electron model, we show how and why the following electron properties work in "New Physics Framework" (Post #5); these include its magnetic moment, magnetic B-field, electric charge, energy, mass, and gravitational potential.
The modeled electron in Figure 2 is equivalent to the cylindrical B-field described by the Biot-Savart law for point charge. (In the Figure: z, h, and θ are the longitudinal axis coordinate, radial coordinate, and angular coordinate, respectively.) However, since there is a gradient in the intensity of Bθ as measured along the z-axis of such cylindrical B-field (∂Bθ/∂z is non-zero), said cylindrical B-field must oscillate inward and outward along its z-axis, as required per Maxwell’s calculus. Thus, the cylindrical B-field of a translating electron translates and oscillates, while such field of an at-rest electron just oscillates. The oscillating cylindrical B-field of an at-rest electron is immeasurable due to the constant reversals of its rotational directions as it oscillates; whereas for a translating electron, there is a net rotational direction of the cylindrical B-field that is attributable to the translation. This part of Bθ is measurable and is given by the Biot-Savart law for point charge.
From this electron model, we show how and why other electron properties work in "New Physics Framework" (Post #5); these include its magnetic moment, energy, mass, gravitational potential, and radiation.
https://www.researchgate.net/publication/271909240_New_Physics_Framework_Post_53
If desired, constructive comments on the book can be made at the following site:
https://www.enago.com/academy/new-physics-framework-dan-s-correnti-book-review/
https://www.researchgate.net/publication/271909240_New_Physics_Framework_Post_53
If desired, constructive comments on the book can be made at the following site:
https://www.enago.com/academy/new-physics-framework-dan-s-correnti-book-review/
https://www.researchgate.net/publication/271909240_New_Physics_Framework_Post_53
If desired, constructive comments on the book can be made at the following site:
https://www.enago.com/academy/new-physics-framework-dan-s-correnti-book-review/
Utilizing the electron model (given in Posts #1 to #4) as shown in the book, it now becomes possible to physically understand how and why the following phenomena work: these include the magnetic dipole moment, electromagnetic radiation, electric force, heat, movement of radiation into and out of hydrogen atoms, Pauli's exclusion principle, Lenz's law, the Lamb shift, gravitation, and mass and its increase with velocity. Understanding whether dark matter and energy are relevant is also studied.
Classical logic, in lieu of the very productive quantum logic, was utilized in the book. This was found to be possible because physical models were used to establish mathematical models for particles and forces. Hence, the new framework is presented without the requirement of abstract models described by complex and abstract mathematics. Merging of quantum mechanics with general relativity, which are based on separate unrelated theories, is not required in the new framework, where the four fundamental forces work at the atomic level and gravity works at large scales as well.