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| ===Commentary Note 11.9=== | | ===Commentary Note 11.9=== |
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− | Among the vast variety of conceivable regularities affecting 2-adic relations, we pay special attention to the ''c''-regularity conditions where ''c'' is equal to 1. | + | Among the vast variety of conceivable regularities affecting 2-adic relations, we pay special attention to the <math>c\!</math>-regularity conditions where <math>c\!</math> is equal to 1. |
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− | {| align="center" cellspacing="6" width="90%" <!--QUOTE--> | + | Let <math>P \subseteq X \times Y</math> be an arbitrary 2-adic relation. The following properties of <math>~P~</math> can be defined: |
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| + | {| align="center" cellspacing="6" width="90%" |
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− | <p>Let ''P'' ⊆ ''X'' × ''Y'' be an arbitrary 2-adic relation. The following properties of P can be defined:</p> | + | <math>\begin{array}{lll} |
− | | + | P ~\text{is total at}~ X |
− | {| cellpadding="4" | + | & \iff & |
− | | ''P'' is "total" at ''X''
| + | P ~\text{is}~ (\ge 1)\text{-regular}~ \text{at}~ X. |
− | | iff
| + | \\[6pt] |
− | | ''P'' is (≥1)-regular at ''X''.
| + | P ~\text{is total at}~ Y |
− | |-
| + | & \iff & |
− | | ''P'' is "total" at ''Y''
| + | P ~\text{is}~ (\ge 1)\text{-regular}~ \text{at}~ Y. |
− | | iff
| + | \\[6pt] |
− | | ''P'' is (≥1)-regular at ''Y''.
| + | P ~\text{is tubular at}~ X |
− | |-
| + | & \iff & |
− | | ''P'' is "tubular" at ''X''
| + | P ~\text{is}~ (\le 1)\text{-regular}~ \text{at}~ X. |
− | | iff
| + | \\[6pt] |
− | | ''P'' is (≤1)-regular at ''X''.
| + | P ~\text{is tubular at}~ Y |
− | |-
| + | & \iff & |
− | | ''P'' is "tubular" at ''Y''
| + | P ~\text{is}~ (\le 1)\text{-regular}~ \text{at}~ Y. |
− | | iff
| + | \end{array}</math> |
− | | ''P'' is (≤1)-regular at ''Y''.
| |
− | |}
| |
| |} | | |} |
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