The continuum limit of k-space cavity angular momentum
A wavepacket (electromagnetic or otherwise) within an isotropic and homogeneous space can be quantized on a regular lattice of discrete k-vectors. Each k-vector is associated with a temporal frequency ω; together, k and ω represent a propagating plane wave. While the total energy and total linear mo...
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AIP Publishing LLC
2025-05-01
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| Series: | AIP Advances |
| Online Access: | http://dx.doi.org/10.1063/5.0260162 |
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| author | Per Kristen Jakobsen Masud Mansuripur |
| author_facet | Per Kristen Jakobsen Masud Mansuripur |
| author_sort | Per Kristen Jakobsen |
| collection | DOAJ |
| description | A wavepacket (electromagnetic or otherwise) within an isotropic and homogeneous space can be quantized on a regular lattice of discrete k-vectors. Each k-vector is associated with a temporal frequency ω; together, k and ω represent a propagating plane wave. While the total energy and total linear momentum of the packet can be readily apportioned among its individual plane wave constituents, the same cannot be said about the packet’s total angular momentum. One can show, in the case of a reasonably smooth (i.e., continuous and differentiable) wavepacket, that the overall angular momentum is expressible as an integral over the k-space continuum involving only the Fourier transform of the field and its k-space gradients. In this sense, the angular momentum is a property not of individual plane waves, but of plane wave pairs that are adjacent neighbors in the space inhabited by the k-vectors and it can be said to be localized in the k-space. Strange as it might seem, this hallmark property of angular momentum does not automatically emerge from an analysis of a discretized k-space. In fact, the discrete analysis shows the angular momentum to be distributed among k-vectors that pair not only with nearby k-vectors but also with those that are far away. The goal of the present paper is to resolve the discrepancy between the discrete calculations and those performed on the continuum, by establishing the conditions under which the highly nonlocal sum over plane wave pairs in the discrete k-space approaches the localized distribution of angular momentum in continuum k-space. |
| format | Article |
| id | doaj-art-e40ce0beb84b4632b879ca4e76574c3c |
| institution | DOAJ |
| issn | 2158-3226 |
| language | English |
| publishDate | 2025-05-01 |
| publisher | AIP Publishing LLC |
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| series | AIP Advances |
| spelling | doaj-art-e40ce0beb84b4632b879ca4e76574c3c2025-08-20T03:19:43ZengAIP Publishing LLCAIP Advances2158-32262025-05-01155055208055208-710.1063/5.0260162The continuum limit of k-space cavity angular momentumPer Kristen Jakobsen0Masud Mansuripur1Department of Mathematics and Statistics, The Arctic University of Norway, Tromsø, NorwayWyant College of Optical Sciences, The University of Arizona, Tucson, Arizona 85721, USAA wavepacket (electromagnetic or otherwise) within an isotropic and homogeneous space can be quantized on a regular lattice of discrete k-vectors. Each k-vector is associated with a temporal frequency ω; together, k and ω represent a propagating plane wave. While the total energy and total linear momentum of the packet can be readily apportioned among its individual plane wave constituents, the same cannot be said about the packet’s total angular momentum. One can show, in the case of a reasonably smooth (i.e., continuous and differentiable) wavepacket, that the overall angular momentum is expressible as an integral over the k-space continuum involving only the Fourier transform of the field and its k-space gradients. In this sense, the angular momentum is a property not of individual plane waves, but of plane wave pairs that are adjacent neighbors in the space inhabited by the k-vectors and it can be said to be localized in the k-space. Strange as it might seem, this hallmark property of angular momentum does not automatically emerge from an analysis of a discretized k-space. In fact, the discrete analysis shows the angular momentum to be distributed among k-vectors that pair not only with nearby k-vectors but also with those that are far away. The goal of the present paper is to resolve the discrepancy between the discrete calculations and those performed on the continuum, by establishing the conditions under which the highly nonlocal sum over plane wave pairs in the discrete k-space approaches the localized distribution of angular momentum in continuum k-space.http://dx.doi.org/10.1063/5.0260162 |
| spellingShingle | Per Kristen Jakobsen Masud Mansuripur The continuum limit of k-space cavity angular momentum AIP Advances |
| title | The continuum limit of k-space cavity angular momentum |
| title_full | The continuum limit of k-space cavity angular momentum |
| title_fullStr | The continuum limit of k-space cavity angular momentum |
| title_full_unstemmed | The continuum limit of k-space cavity angular momentum |
| title_short | The continuum limit of k-space cavity angular momentum |
| title_sort | continuum limit of k space cavity angular momentum |
| url | http://dx.doi.org/10.1063/5.0260162 |
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