20 resultados para Legendre polynomial
em Bulgarian Digital Mathematics Library at IMI-BAS
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∗ Partially supported by INTAS grant 97-1644
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* Partially supported by Universita` di Bari: progetto “Strutture algebriche, geometriche e descrizione degli invarianti ad esse associate”.
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It is shown that the invertible polynomial maps over a finite field Fq , if looked at as bijections Fn,q −→ Fn,q , give all possible bijections in the case q = 2, or q = p^r where p > 2. In the case q = 2^r where r > 1 it is shown that the tame subgroup of the invertible polynomial maps gives only the even bijections, i.e. only half the bijections. As a consequence it is shown that a set S ⊂ Fn,q can be a zero set of a coordinate if and only if #S = q^(n−1).
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Dubrovin type equations for the N -gap solution of a completely integrable system associated with a polynomial pencil is constructed and then integrated to a system of functional equations. The approach used to derive those results is a generalization of the familiar process of finding the 1-soliton (1-gap) solution by integrating the ODE obtained from the soliton equation via the substitution u = u(x + λt).
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* Dedicated to the memory of Prof. N. Obreshkoff
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Mathematics Subject Class.: 33C10,33D60,26D15,33D05,33D15,33D90
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Mathematics Subject Classification: 33C60, 33C20, 44A15
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The eccentric connectivity index of a graph G, ξ^C, was proposed by Sharma, Goswami and Madan. It is defined as ξ^C(G) = ∑ u ∈ V(G) degG(u)εG(u), where degG(u) denotes the degree of the vertex x in G and εG(u) = Max{d(u, x) | x ∈ V (G)}. The eccentric connectivity polynomial is a polynomial version of this topological index. In this paper, exact formulas for the eccentric connectivity polynomial of Cartesian product, symmetric difference, disjunction and join of graphs are presented.
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2000 Mathematics Subject Classification: 12D10.
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000 Mathematics Subject Classification: Primary 16R50, Secondary 16W55.
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2000 Mathematics Subject Classification: 13P05, 14M15, 14M17, 14L30.
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2000 Mathematics Subject Classification: Primary 81R50, 16W50, 16S36, 16S37.
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2000 Mathematics Subject Classification: 12D10.
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2000 Mathematics Subject Classification: Primary 20F55, 13F20; Secondary 14L30.
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2010 Mathematics Subject Classification: Primary 35S05, 35J60; Secondary 35A20, 35B08, 35B40.