|dc.description||For all integers a, b > 0 we establish explicitly the existence of
monads on a multiprojective Space Pa×Pb following the conditions established
by Floystad. That is for all positive integers α, β, γ there exists a monad on
the multiprojective space X = Pa × Pb whose maps A and B have entries
being linear in two sets of homogeneous coordinates x0 : ... : xa and y0 : ... : yb
and it takes the form:
X(1, 1) 0
where the maps A and B are matrices with B ·A = 0 and they are of maximal
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