Oblique incidence of plane waves upon an infinite array of in-line per
iodic screens or breakwaters in finite water depth is considered using
linear water-wave theory. The number of reflected or transmitted wave
s is a function of the angle of incidence and the ratio of wavelength
to array periodicity. A simple matrix formulation is provided for all
the reflection and transmission coefficients arising from a particular
set of parameters, using a formulation based either on the unknown ve
locity through a gap or on the unknown pressure difference across a br
eakwater screen. Integral properties of functions related to these unk
nowns form the basis of the matrix structure, the functions themselves
satisfying a set of integral equations which are solved using a Galer
kin approximation that gives highly accurate approximations with very
few terms in the expansion. The problem is extended to consider two id
entical parallel arrays and it is shown that there exists zeros of bot
h reflection and transmission. Finally, a wide-spacing approximation i
s derived for two arrays based on the accurate results found from the
single array problem, where the two arrays do not have to be identical
, but must have the same periodicity.