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<Paper uid="E89-1020">
  <Title>It Would Be Much Easier If WENT Were GOED</Title>
  <Section position="3" start_page="0" end_page="0" type="intro">
    <SectionTitle>
2. DEFINITIONS
2.1 MORPHOLOGICAL MODEL
</SectionTitle>
    <Paragraph position="0"> We call a morphological model the tuple: MM = (C,SC,M,V, F1,F2,F3,P) where C is a set of categories: C = {cl ..... c*}; SC Is a set of sub-categories of the categories in C: SC = {scl ..... scJ};  - 145 M is a set of features of the sub-categories in SC: M = { m l ..... n~ }; V is a set of values which features can take: V = {vl ..... vm}; Ft Is a function defined on C, taking values in the power set of SC: Ft: C--- &gt; PS(SC); F2 is a function defined on SC, taking values in the power set of M: F2: SC--- &gt; PS(M); F3 is a function defined on M, taking values in the power set of V: F3:</Paragraph>
    <Paragraph position="2"> viq~ F3(miq) P is called the paradigmatic ftexioning space of the morphological model MM. For instance a point of P in a certain MM might be: (noun common-noun (gender number case articulation) (masculine plural genitive definite))</Paragraph>
  </Section>
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