%0 Generic %1 citeulike:233111 %A Orthuber, Wolfgang %D 2003 %K math0001 %T A discrete approach to the vacuum Maxwell equations and the fine structure constant %U http://arxiv.org/abs/quant-ph/0312188 %X We recommended consequent discrete combinatorial research in mathematical physics. Here we show an example how discretization of partial differential equations can be done and that quickly unexpected new findings can result from research in this up to now unexplored area. We transformed the vacuum Maxwell equations into finite-difference equations, provided simple initial conditions and studied the development of the electromagnetic fields using special software (see <A HREF="http://www.orthuber.com">this http URL</A>). The development is wave-like as expected. But it is not trivial, the wave maxima have different heights. If all (by definition minimal) finite differences of the location coordinates are multiplied by numbers (coupling factors) whose squares are equal to the fine structure constant, we noticed: 1. The first two wave maxima have nearly the same height. Of course this can be also coincidental. 2. The following maxima are at first slightly decreasing and then, beginning with the 6th maximum, exponentially increasing.

@misc{citeulike:233111, abstract = {We recommended consequent discrete combinatorial research in mathematical physics. Here we show an example how discretization of partial differential equations can be done and that quickly unexpected new findings can result from research in this up to now unexplored area. We transformed the vacuum Maxwell equations into finite-difference equations, provided simple initial conditions and studied the development of the electromagnetic fields using special software (see <A HREF="http://www.orthuber.com">this http URL</A>). The development is wave-like as expected. But it is not trivial, the wave maxima have different heights. If all (by definition minimal) finite differences of the location coordinates are multiplied by numbers (coupling factors) whose squares are equal to the fine structure constant, we noticed: 1. The first two wave maxima have nearly the same height. Of course this can be also coincidental. 2. The following maxima are at first slightly decreasing and then, beginning with the 6th maximum, exponentially increasing.}, added-at = {2007-08-20T17:31:09.000+0200}, author = {Orthuber, Wolfgang}, biburl = {https://www.bibsonomy.org/bibtex/2116f42881a275293eb62f6a574cd8d89/libwpj}, citeulike-article-id = {233111}, description = {citeulike}, eprint = {quant-ph/0312188}, interhash = {07015317b55c13da38bfc3ead2d8a72f}, intrahash = {116f42881a275293eb62f6a574cd8d89}, keywords = {math0001}, month = {December}, priority = {2}, timestamp = {2007-08-20T17:31:09.000+0200}, title = {A discrete approach to the vacuum Maxwell equations and the fine structure constant}, url = {http://arxiv.org/abs/quant-ph/0312188}, year = 2003 }