Conformal structure of quantum wave mechanics

被引:0
作者
Petti, Richard James [1 ]
机构
[1] 146 Gray St, Arlington, MA 02476 USA
关键词
Conformal dilation; conformal metric; Klein-Gordon field; metricity; non-metricity; Macsyma; SUGGESTED INTERPRETATION; TERMS;
D O I
10.1142/S0219887822501742
中图分类号
O4 [物理学];
学科分类号
0702 ;
摘要
This work interprets the quantum terms in a Lagrangian, and consequently of the wave equation and momentum tensor, in terms of a modified spacetime metric. Part I interprets the quantum terms in the Lagrangian of a Klein-Gordon field as scalar curvature of conformal dilation covector nm that is proportional to h times the gradient of wave amplitude R. Part II replaces conformal dilation with a conformal factor rho that defines a modified spacetime metric g' = exp(rho)g, where g is the gravitational metric. Quantum terms appear only in metric g' and its metric connection coefficients. Metric g' preserves lengths and angles in classical physics and in the domain of the quantum field itself. g' combines concepts of quantum theory and spacetime geometry in one structure. The conformal factor can be interpreted as the limit of a distribution of inclusions and voids in a lattice that cause the metric to bulge or contract. All components of all free quantum fields satisfy the Klein-Gordon equation, so this interpretation extends to all quantum fields. Measurement operations, and elements of quantum field theory are not considered.
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页数:24
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