| 1. | Notation for monomials is constantly required in fields like partial differential equations.
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| 2. | For the case of Geometric Moments, X would be the monomials.
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| 3. | We may define the set of all " monomials " M recursively as follows:
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| 4. | Often one may think of the space as spanned by all suitable field monomials.
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| 5. | Order the monomials in the variables multi-index notation for monomials in the variables.
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| 6. | Order the monomials in the variables multi-index notation for monomials in the variables.
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| 7. | A prominent example of this circle of ideas is given by the theory of standard monomials.
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| 8. | The choice of a total order on the monomials allows sorting the terms of a polynomial.
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| 9. | The exponents of the monomials of a critical Lagrangian define a hyperplane in an exponent space.
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| 10. | It is enough to check this for monomials in the " e "'s.
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