Frobenius stable pluricanonical systems on threefolds of general type in positive characteristic
Abstract
This paper aims to investigate effectivity problems of pluricanonical systems on varieties of general type in positive characteristic. In practice, we will consider a sub-linear system |S0-(X, KX + nKX)| ⊂eq |H0(X, KX +nKX)| generated by certain Frobenius stable sections, and prove that for a minimal terminal threefold X of general type with either q(X)>0 or Gorenstein singularities, if n≥ 28 then |S0-(X, KX + nKX)| ≠ ; if n≥ 42 then the linear system |S0-(X, KX + nKX)| defines a birational map.
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