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Weierstrass P-function

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1: 23.2 Definitions and Periodic Properties
23.2.4 ( z ) = 1 z 2 + w 𝕃 { 0 } ( 1 ( z - w ) 2 - 1 w 2 ) ,
2: 23.10 Addition Theorems and Other Identities
23.10.5 | 1 ( u ) ( u ) 1 ( v ) ( v ) 1 ( w ) ( w ) | = 0 ,
3: 23.21 Physical Applications
§23.21 Physical Applications
The Weierstrass function plays a similar role for cubic potentials in canonical form g 3 + g 2 x - 4 x 3 . …
§23.21(ii) Nonlinear Evolution Equations
Airault et al. (1977) applies the function to an integrable classical many-body problem, and relates the solutions to nonlinear partial differential equations. …
§23.21(iii) Ellipsoidal Coordinates