Perfect Anomalous Reflection with an Aggressively Discretized Huygens' Metasurface
Alex M. H. Wong, George V. Eleftheriades

TL;DR
This paper demonstrates that aggressive discretization of a Huygens' metasurface, with only two cells per period, can achieve near-perfect anomalous reflection and outperform continuous designs in efficiency.
Contribution
It introduces a method of aggressive discretization for metasurfaces, simplifying design and improving performance over traditional continuous approaches.
Findings
Achieves 99.1% power efficiency in anomalous reflection
Discretization with only two cells per period is effective
Surpasses continuous metasurface performance in efficiency
Abstract
This paper investigates the discretization of a periodic metasurface and demonstrates how such a surface can achieve perfect anomalous reflection. Whilst most contemporary theoretical works on metasurfaces deal with continuous current or impedance distributions, we examine how discretization affects a metasurface, and show that in some cases one can discretize a metasurface aggressively --- to the extent of having only two cells per spatial period. Such aggressive discretization can lead to great simplifications in metasurface design, and perhaps more surprisingly, a possible performance improvement from continuous metasurfaces. Using this aggressive discretization technique, we report the design of a binary Huygens' metasurface which reflects an incident plane wave at 50 into a reflected direction of -22.5. Full-wave electromagnetic simulation shows the achievement of…
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