Generator-offset property: Difference between revisions
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These give exactly three distinct sizes for every interval class. Hence S is SV3. | These give exactly three distinct sizes for every interval class. Hence S is SV3. | ||
In this case S has two chains of Qs, one with floor(n/2) notes and and one with ceil(n/2) notes. Every instance of Q must be a k-step, since Q = αa + βb + γc is the only way to write Q in the basis (a, b, c); so S is well-formed with respect to Q. Thus S also satisfies the generator-offset property with generator Q. | In this case S has two chains of Qs, one with floor(n/2) notes and and one with ceil(n/2) notes. Every instance of Q must be a k-step, since by '''Z'''-linearly independence Q = αa + βb + γc is the only way to write Q in the basis (a, b, c); so S is well-formed with respect to Q. Thus S also satisfies the generator-offset property with generator Q. | ||
End Case 1.] | End Case 1.] | ||