Difference between revisions of "Geometro-dynamics"
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A variant of unified field theory which reduces all physical objects to geometric objects. Geometro-dynamics is constructed in several stages. | A variant of unified field theory which reduces all physical objects to geometric objects. Geometro-dynamics is constructed in several stages. | ||
− | The first stage consists of the construction of a unified theory of gravitation and electromagnetism on the basis of general relativity theory. The principal problems of geometro-dynamics at this stage may be stated in a simplified manner as follows. Let there be given a metric | + | The first stage consists of the construction of a unified theory of gravitation and electromagnetism on the basis of general relativity theory. The principal problems of geometro-dynamics at this stage may be stated in a simplified manner as follows. Let there be given a metric $ g _ {ij} $ |
+ | of space-time which is a solution of Einstein's equations | ||
− | + | $$ | |
+ | R _ {ik} - { | ||
+ | \frac{1}{2} | ||
+ | } g _ {ik} R = \ | ||
+ | T _ {ik} ( f _ {\mu \sigma } , g), | ||
+ | $$ | ||
− | where | + | where $ R _ {ik} $ |
+ | is the Ricci tensor, $ T _ {ik} $ | ||
+ | is the energy-momentum tensor of the electromagnetic field in vacuum, and $ f _ {\mu \sigma } $ | ||
+ | is the field-strength tensor of the electromagnetic field that satisfies the Maxwell equations. The task is to express $ f _ {\mu \sigma } $ | ||
+ | in terms of $ g _ {ik} $. | ||
+ | When put in this simplified manner, the problem has a solution in principle [[#References|[1]]], but its complete solution presents difficulties (such as allowance for non-electromagnetic fields) which have not yet (1988) been overcome. | ||
The second stage consists of the construction of a theory of elementary particles. The model of a pair of interacting particles is the so-called "handle" , the simplest form of which is one of the topological interpretations [[#References|[2]]] of the maximal analytic extension of the [[Schwarzschild field|Schwarzschild field]]. In this model the characteristics (e.g. the charge) of an elementary particle are given by certain integer invariants of the "handle" . In geometro-dynamics space-time is multiply connected, while its first [[Betti number|Betti number]] is of the same order as the number of particles. The concept of a geon was introduced — a wave packet of some given radiation of a concentration which is sufficient for the corresponding distortion of space to make this wave packet metastable (i.e. existing for a long time). Geometro-dynamics predicts electro-magnetic, neutrino and gravitational geons. The concept of a geon is classical. It is believed that the quantum analogue of the concept of geometro-dynamics is a geometro-dynamic description of the mass of elementary particles (geons have not been experimentally observed). | The second stage consists of the construction of a theory of elementary particles. The model of a pair of interacting particles is the so-called "handle" , the simplest form of which is one of the topological interpretations [[#References|[2]]] of the maximal analytic extension of the [[Schwarzschild field|Schwarzschild field]]. In this model the characteristics (e.g. the charge) of an elementary particle are given by certain integer invariants of the "handle" . In geometro-dynamics space-time is multiply connected, while its first [[Betti number|Betti number]] is of the same order as the number of particles. The concept of a geon was introduced — a wave packet of some given radiation of a concentration which is sufficient for the corresponding distortion of space to make this wave packet metastable (i.e. existing for a long time). Geometro-dynamics predicts electro-magnetic, neutrino and gravitational geons. The concept of a geon is classical. It is believed that the quantum analogue of the concept of geometro-dynamics is a geometro-dynamic description of the mass of elementary particles (geons have not been experimentally observed). | ||
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It is assumed that geometro-dynamics involves a violation of the law of conservation of baryon charge. A concrete example of this is the process of gravitational collapse and subsequent evaporation of black holes. | It is assumed that geometro-dynamics involves a violation of the law of conservation of baryon charge. A concrete example of this is the process of gravitational collapse and subsequent evaporation of black holes. | ||
− | The fourth stage consists of attempts to subsequently construct a quantum geometro-dynamics. Quantum fluctuations of the metric are considered, and it is proved that at a distance of order | + | The fourth stage consists of attempts to subsequently construct a quantum geometro-dynamics. Quantum fluctuations of the metric are considered, and it is proved that at a distance of order $ ( \hbar \kappa /c ^ {3} ) ^ {1/2} \approx 10 ^ {- 33 } \mathop{\rm cm} $( |
+ | where $ \hbar $ | ||
+ | is the Planck constant, $ \kappa $ | ||
+ | is Einstein's gravitational constant and $ c $ | ||
+ | is the velocity of light) such fluctuations can substantially alter the topology of space-time and must correspond to elementary quantum particles. | ||
At the time of writing (1970s) geometro-dynamics is not yet a fully developed theory. The interpretation of spin fields (as distinct from tensor fields), in particular of neutrino fields, is especially difficult. Many features of geometro-dynamics have no adequate mathematical foundation. The theory of superspace [[#References|[4]]] is one attempt to provide such a foundation. | At the time of writing (1970s) geometro-dynamics is not yet a fully developed theory. The interpretation of spin fields (as distinct from tensor fields), in particular of neutrino fields, is especially difficult. Many features of geometro-dynamics have no adequate mathematical foundation. The theory of superspace [[#References|[4]]] is one attempt to provide such a foundation. | ||
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====References==== | ====References==== | ||
<table><TR><TD valign="top">[1]</TD> <TD valign="top"> G.Y. Rainich, "Electrodynamics in general relativity theory" ''Trans. Amer. Math. Soc.'' , '''27''' (1925) pp. 106–136</TD></TR><TR><TD valign="top">[2]</TD> <TD valign="top"> J.A. Wheeler, "Geometrodynamics" , Acad. Press (1962)</TD></TR><TR><TD valign="top">[3]</TD> <TD valign="top"> B.K. Harrison, K.S. Thorne, M. Wakano, J.A. Wheeler, "Gravitational theory and gravitational collapse" , Univ. Chicago Press (1965)</TD></TR><TR><TD valign="top">[4]</TD> <TD valign="top"> Ya.B. Zel'dovich, I.D. Novikov, "Relativistic astrophysics" , '''2. Structure and evolution of the universe''' , Chicago (1983) (Translated from Russian)</TD></TR></table> | <table><TR><TD valign="top">[1]</TD> <TD valign="top"> G.Y. Rainich, "Electrodynamics in general relativity theory" ''Trans. Amer. Math. Soc.'' , '''27''' (1925) pp. 106–136</TD></TR><TR><TD valign="top">[2]</TD> <TD valign="top"> J.A. Wheeler, "Geometrodynamics" , Acad. Press (1962)</TD></TR><TR><TD valign="top">[3]</TD> <TD valign="top"> B.K. Harrison, K.S. Thorne, M. Wakano, J.A. Wheeler, "Gravitational theory and gravitational collapse" , Univ. Chicago Press (1965)</TD></TR><TR><TD valign="top">[4]</TD> <TD valign="top"> Ya.B. Zel'dovich, I.D. Novikov, "Relativistic astrophysics" , '''2. Structure and evolution of the universe''' , Chicago (1983) (Translated from Russian)</TD></TR></table> | ||
− | |||
− | |||
====Comments==== | ====Comments==== | ||
− | |||
====References==== | ====References==== | ||
<table><TR><TD valign="top">[a1]</TD> <TD valign="top"> J.A. Wheeler, "Some implications of general relativity for the structure and evolution of the universe" , ''XI Conseil de Physique Solvay. Bruxelles'' (1958) pp. 97–148</TD></TR></table> | <table><TR><TD valign="top">[a1]</TD> <TD valign="top"> J.A. Wheeler, "Some implications of general relativity for the structure and evolution of the universe" , ''XI Conseil de Physique Solvay. Bruxelles'' (1958) pp. 97–148</TD></TR></table> |
Latest revision as of 19:41, 5 June 2020
A variant of unified field theory which reduces all physical objects to geometric objects. Geometro-dynamics is constructed in several stages.
The first stage consists of the construction of a unified theory of gravitation and electromagnetism on the basis of general relativity theory. The principal problems of geometro-dynamics at this stage may be stated in a simplified manner as follows. Let there be given a metric $ g _ {ij} $ of space-time which is a solution of Einstein's equations
$$ R _ {ik} - { \frac{1}{2} } g _ {ik} R = \ T _ {ik} ( f _ {\mu \sigma } , g), $$
where $ R _ {ik} $ is the Ricci tensor, $ T _ {ik} $ is the energy-momentum tensor of the electromagnetic field in vacuum, and $ f _ {\mu \sigma } $ is the field-strength tensor of the electromagnetic field that satisfies the Maxwell equations. The task is to express $ f _ {\mu \sigma } $ in terms of $ g _ {ik} $. When put in this simplified manner, the problem has a solution in principle [1], but its complete solution presents difficulties (such as allowance for non-electromagnetic fields) which have not yet (1988) been overcome.
The second stage consists of the construction of a theory of elementary particles. The model of a pair of interacting particles is the so-called "handle" , the simplest form of which is one of the topological interpretations [2] of the maximal analytic extension of the Schwarzschild field. In this model the characteristics (e.g. the charge) of an elementary particle are given by certain integer invariants of the "handle" . In geometro-dynamics space-time is multiply connected, while its first Betti number is of the same order as the number of particles. The concept of a geon was introduced — a wave packet of some given radiation of a concentration which is sufficient for the corresponding distortion of space to make this wave packet metastable (i.e. existing for a long time). Geometro-dynamics predicts electro-magnetic, neutrino and gravitational geons. The concept of a geon is classical. It is believed that the quantum analogue of the concept of geometro-dynamics is a geometro-dynamic description of the mass of elementary particles (geons have not been experimentally observed).
The third stage consists in the construction of a theory of continuous media which yields, broadly speaking, the same results as does the general theory of relativity.
It is assumed that geometro-dynamics involves a violation of the law of conservation of baryon charge. A concrete example of this is the process of gravitational collapse and subsequent evaporation of black holes.
The fourth stage consists of attempts to subsequently construct a quantum geometro-dynamics. Quantum fluctuations of the metric are considered, and it is proved that at a distance of order $ ( \hbar \kappa /c ^ {3} ) ^ {1/2} \approx 10 ^ {- 33 } \mathop{\rm cm} $( where $ \hbar $ is the Planck constant, $ \kappa $ is Einstein's gravitational constant and $ c $ is the velocity of light) such fluctuations can substantially alter the topology of space-time and must correspond to elementary quantum particles.
At the time of writing (1970s) geometro-dynamics is not yet a fully developed theory. The interpretation of spin fields (as distinct from tensor fields), in particular of neutrino fields, is especially difficult. Many features of geometro-dynamics have no adequate mathematical foundation. The theory of superspace [4] is one attempt to provide such a foundation.
References
[1] | G.Y. Rainich, "Electrodynamics in general relativity theory" Trans. Amer. Math. Soc. , 27 (1925) pp. 106–136 |
[2] | J.A. Wheeler, "Geometrodynamics" , Acad. Press (1962) |
[3] | B.K. Harrison, K.S. Thorne, M. Wakano, J.A. Wheeler, "Gravitational theory and gravitational collapse" , Univ. Chicago Press (1965) |
[4] | Ya.B. Zel'dovich, I.D. Novikov, "Relativistic astrophysics" , 2. Structure and evolution of the universe , Chicago (1983) (Translated from Russian) |
Comments
References
[a1] | J.A. Wheeler, "Some implications of general relativity for the structure and evolution of the universe" , XI Conseil de Physique Solvay. Bruxelles (1958) pp. 97–148 |
Geometro-dynamics. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Geometro-dynamics&oldid=14849