We derive an equation for a single-plaquette Josephson-junction array
for an arbitrary number of flux quanta per unit cell f. We show that f
or f=1/2 this equation is equivalent to that derived by Rzchowski et a
l. for a 2x2 array in the f=1/2 ground state. We find that in the pres
ence of an rf drive the system exhibits both integer and fractional Gi
ant Shapiro steps at [V]=nhv/4e, where nu is the rf frequency and n=1,
2,3,..., for all values of the flux quantum f. In addition, very small
subharmonic steps at [V]=nhnu/2em, where m=1,2,3,... and not equal to
n, are also observed for all f; however, these steps are found to be
consistently smaller than the integer and half-integer fractional step
s concurrently present in the I-V characteristics. We discuss these re
sults and the array dynamics which lead to the described behavior.